!(punc) . E, k s . kh l & . m ei' . S n= . ph >i, n t .
"(punc) . E' n . d & v . kh w oU' t .
"(punc) . E' n d . kh w oU' t .
"(punc) . I' n . kh w oU' t s .
"(punc) . ^' n . kh w oU' t .
"(punc) . d ^' . b l= . kh w oU' t .
"(punc) . kh l oU' z . kh w oU' t .
"(punc) . kh w oU' t .
%(jj,nn) . ph &r . s E' n t .
&(cc,sym) . @' m . ph &r . s @, n d .
'(pos,punc) . E' n . d I' . n &r k . w oU' t .
'(pos,punc) . E' n d . kh w oU' t .
'(pos,punc) . I' . n &r k . w oU' t .
'(pos,punc) . kh w oU' t .
'(pos,punc) . s I' N . g l= . kh w oU' t .
'cause(cc,in,rb) . kh & z .
'course(uh) . kh >' 9r s .
'em(prp) . & m .
'm(vb,vbp) . & m .
'n(cc,nnp) . & n .
's(nnp,nns,pos,prp,vbz) . z .
'til(in,rb) . th I' l .
'tis(prp) . th I' z .
'twas(prp) . th w ^' z .
,(punc) . kh A:' . m & .
-(punc) . d @' S .
-(punc) . h aI' . f n= .
-[40]1k(nnp_product) . w ^, n . kh ei, .
-[a]b[out]-(in,jj,rb,rbr,rp) . b .
-[a]bout(in,jj,rb,rbr,rp) . b aU, t .
-[a]cross(in,rb,rp) . kh 9r >, s .
-[a]fraid(jj) . f 9r ei, d .
-[a]gree(vb,vbp) . g 9r i:, .
-[a]head(rb) . h E, d .
-[a]mongst(in,rp) . m ^, N s t .
-[a]mount(nn,vb,vbp) . m aU, n t .
-[a]nd(cc,in,jj,nn,nnp,vbp) . n d .
-[a]noth[er]-(dt,nn,prp) . n ^, D .
-[a]nother(dt,nn,prp) . n ^, . D 3r, .
-[a]round(in,rb,rp) . 9r aU, n d .
-[a]t(in,nn,rp) . t .
-[a]way(rb,rp) . w ei, .
-[ab]ou[t]-(in,jj,rb,rbr,rp) . b aU, .
-[ad]van[tage]-(nn,vb) . v @, n .
-[aff]ord(vb) . oU, 9r d .
-[al]way[s]-(rb) . w ei, .
-[an]y(dt,rb) . i:, .
-[any]where(rb) . w ei, 9r .
-[b]ee(nn,nnp,nnp_boyname_0.000,nnp_girlname_0.001,nnp_surname_0.001) . i:, .
-[b]een(nnp_surname_0.000,vbn,vbp) . i:, n .
-[be]cau[se]-(cc,in,rb) . kh ^, .
-[be]come(vb,vbd,vbn,vbp) . kh ^, m .
-[be]fore(cc,in,rb,rp) . f oU, 9r .
-[bear]able(+bear+able,jj) . & . b l= .
-[bec]ause(cc,in,rb) . ^, z .
-[becau]se(cc,in,rb) . z .
-[bene]fit(nn,nnp,vb,vbp) . f I, t .
-[c]an(md,nn,nnp_surname_0.000,vb) . @, n .
-[c]ourse(nn,nnp,nnp_surname_0.000,vb) . oU, 9r s .
-[ca]re(nn,nnp,nnp_surname_0.000,vb,vbp) . 9r .
-[chloro]fluorocarbons(nns) . f l oU, . 9r oU, . kh A:, 9r . b n= .
-[com]puter(+compute+er,nn,nnp) . ph j u:, . th 3r, .
-[company]'s(nn,nnp,pos) . z .
-[con]temporary(jj,nn,nnp) . th E, m . ph & . 9r E, . 9r i:, .
-[con]tro[l]-(jj,nn,nnp,vb,vbp) . th 9r oU, .
-[con]verting(+convert+ing,vbg) . v 3r, . th I, N .
-[d]idn't(vbd) . I, . d_( n= t .
-[d]o(nnp_surname_0.004,vb,vbp) . u:, .
-[d]oes(+doe+s,nnp,nns,vbz) . ^, z .
-[d]on't(vb) . oU, n t .
-[de]partment(+depart+ment,nn,nnp) . ph A:, 9r t . m I, n t .
-[de]pending(+depend+ing,vbg) . ph E, n . d I, N .
-[de]pends(+depend+s,vbz) . ph E, n d z .
-[de]tailed(+detail+ed,jj,vbd,vbn) . th ei, l d .
-[de]tective(+detect+ive,jj,nn) . th E, k . th I, v .
-[de]troit's(nn,nnp,nnp_city,pos) . th 9r >i, t s .
-[de]veloping(+develop+ing,jj,vbg) . v E, . l & . ph I, N .
-[di]fferent(+differ+ent,jj) . f & . 9r I, n t .
-[dis]satisfied(+dis+satisfy+ed,jj,vbd,vbn) . s @, . th I, s . f aI, d .
-[do]n't(vb) . n t .
-[doct]ors(+doctor+s,nns,vbz) . 3r, z .
-[doe]s(+doe+s,nnp,nns,vbz) . z .
-[e]mer[gency]-(+emerge+ency,nn,nnp) . m 3r, .
-[e]mergency(+emerge+ency,nn,nnp) . m 3r, . dZ I, n . s i:, .
-[ear]hart(nnp_surname_0.001) . h A:, 9r t .
-[effective]ness(+effect+ive+ness,nn) . n I, s .
-[em]ployed(+employ+ed,vbd,vbn) . ph l >i, d .
-[en]joy(+en+joy,vb,vbp) . dZ >i, .
-[en]joyed(+en+joy+ed,vbd,vbn) . dZ >i, d .
-[enthusi]asm(nn) . @, . z & m .
-[es]pecially(+especial+ly,rb) . ph E, . S & . l i:, .
-[evalu]ate(vb,vbp) . ei, t .
-[every]body(nn,prp) . b A:, . d i:, .
-[ex]cuse(nn,vb) . kh j u:, s .
-[ex]perience(nn,vb,vbp) . ph I, . 9r i:, . I, n s .
-[exclusive]ly(+exclusive+ly,rb) . l i:, .
-[exer]cise(nn,vb,vbp) . s aI, z .
-[extensi]vely(+extensive+ly,rb) . v l i:, .
-[fo]r(cc,in,rb,rp) . 9r .
-[g]et(vb,vbp) . g E, t .
-[g]o(nn,nnp,nnp_surname_0.001,vb,vbp) . oU, .
-[g]onna(vbp) . ^, . n & .
-[h]as(nnp_surname_0.000,vbn,vbz) . @, z .
-[h]e(nnp_surname_0.001,prp) . i:, .
-[h]ello(uh) . & . l oU, .
-[h]ey(nnp_surname_0.001,uh) . ei, .
-[ha]s(nnp_surname_0.000,vbn,vbz) . z .
-[ha]ve(vb,vbd,vbn,vbp) . v .
-[he]llo(uh) . l oU, .
-[hell]o(uh) . oU, .
-[i]f(cc,in,jj) . f .
-[i]magine(vb) . m @, . dZ I, n .
-[i]s(nnp,vbz) . z .
-[i]t(nnp,prp) . t .
-[i]t's(nnp,pos,prp) . t s .
-[im]portant(+import+ant,jj,nn) . ph oU, 9r . th I, n t .
-[im]posed(+impose+ed,jj,vbd,vbn) . ph oU, z d .
-[in]con[venience]-(+in+convenience,nn) . kh n= .
-[in]credible(+in+credible,jj) . kh 9r E, . d I, . b l= .
-[in]ducted(+induct+ed,vbd,vbn) . d ^, k . th I, d .
-[in]sane(+in+sane,jj) . s ei, n .
-[in]su[rance]-(+insure+ance,nn,nnp) . S U, .
-[in]vestment(+invest+ment,nn,nnp) . v E, s t . m I, n t .
-[it']s(nnp,prp) . s .
-[it]'s(nnp,pos,prp) . s .
-[j]erry(nnp,nnp_boyname_0.432,nnp_girlname_0.011,nnp_surname_0.001) . E, . 9r i:, .
-[j]ust(jj,nnp_surname_0.002,rb) . ^, s t .
-[ju]st(jj,nnp_surname_0.002,rb) . s t .
-[judi]ciary(nn,nnp) . S & . 9r i:, .
-[kn]ow(nnp,vb,vbp) . oU, .
-[l]earned(+learn+ed,nnp_surname_0.001,vbd,vbn) . 3r, n d .
-[l]ike(cc,in,jj,nn,nnp_surname_0.000,rb,rp,vb,vbp) . aI, k .
-[leader]ship(+lead+er+ship,nn,nnp) . S I, p .
-[li]ke(cc,in,jj,nn,nnp_surname_0.000,rb,rp,vb,vbp) . k .
-[m]y(jj,nnp,nnp_girlname_0.003,prp) . aI, .
-[manda]tory(+mandate+ory,jj) . th oU, . 9r i:, .
-[medi]cal(+medic+al,jj,nnp) . kh l= .
-[mo]squitoes(+mosquito+s,nns) . s kh i:, . th oU, z .
-[mount]ains(+mountain+s,nnps,nns) . th I, n .
-[my]self(prp) . s E, l f .
-[n]ot(dt,rb) . A:, t .
-[non]renewable(+non+renew+able,jj) . 9r I, . n u:, . & . b l= z .
-[o]kay(jj,nn,rb,uh,vb) . kh ei, .
-[o]n(in,nnp,nnp_surname_0.000,rb,rp) . n .
-[o]pinion(+opine+ion,nn,nnp) . ph I, n . j I, n .
-[ok]ay(jj,nn,rb,uh,vb) . ei, .
-[or]chestra(nn) . kh I, . s t 9r & .
-[out]side(+out+side,in,jj,nn,rb,rp,vb) . s aI, d .
-[pr]obably(+probe+ably,rb) . A:, . b & b . l i:, .
-[pro-]choice(+pro+choice,jj,nn) . tS >i, s .
-[pro]duce(nn,vb,vbp) . d u:, s .
-[prose]cutor(+prosecute+or,nn) . kh j u:, . th 3r, .
-[r]ight(jj,nn,nnp,nnp_surname_0.000,rb,vb) . aI, t .
-[re]fr[igerator]-(+refrigerate+or,nn) . f 9r .
-[re]laxed(+relax+ed,vbd,vbn) . l @, k s t .
-[re]member(vb,vbp) . m E, m . b 3r, .
-[re]membered(+remember+ed,vbd,vbn) . m E, m . b 3r, d .
-[re]moves(+remove+s,vbz) . m u:, v z .
-[re]quires(+require+s,vbz) . kh w aI, 9r z .
-[re]sign(+re+sign,vb) . z aI, n .
-[re]tu[rned]-(+re+turn+ed,vbd,vbn) . th 3r, .
-[respectful]ness(+respect+ful+ness,nn) . n I, s .
-[s]chool(nn,nnp,nnp_surname_0.000,vb) . kh u:, l .
-[s]o(cc,in,nnp_girlname_0.002,nnp_surname_0.001,rb) . oU, .
-[s]ociety(nn,nnp) . & . s aI, . I, . th i:, .
-[s]ure(jj,nnp,rb) . U, 9r .
-[semes]ter(nn) . s th 3r, .
-[so]lution(nn) . l u:, . S I, n .
-[some]body's(nn,pos,prp) . b ^, . d i:, z .
-[some]one(nn,prp) . w ^, n .
-[some]thing(nn,prp) . T I, N .
-[some]times(rb) . th aI, m z .
-[southwestern]ly(+southwestern+ly,rb) . l i:, .
-[spokes]person(nn) . ph 3r, . s I, n .
-[su]pposed(+suppose+ed,jj,vbd,vbn) . ph oU, z d .
-[substi]tute(jj,nn,vb) . th u:, t .
-[sup]posed(+suppose+ed,jj,vbd,vbn) . ph oU, z d .
-[sur]prised(+surprise+ed,jj,vbd,vbn) . ph 9r aI, z d .
-[t]v(+abbreviation,nn,nnp,nnp_product) . v i:, .
-[ta]ken(vbn) . kh n= .
-[th]an(in,nnp_surname_0.000,rb,rbr,rp) . @, n .
-[th]at(cc,dt,in,nn,prp,rb,vbp,wdt) . @, t .
-[th]at's(cc,dt,in,nn,pos,prp,rb,vbp,wdt) . @, t s .
-[th]ere's(ex_0.000,pos,prp,rb) . ei, 9r z .
-[th]ey(prp) . ei, .
-[th]is(dt,nnp,prp,rb) . I, s .
-[tha]t's(cc,dt,in,nn,pos,prp,rb,vbp,wdt) . t s .
-[that]'s(cc,dt,in,nn,pos,prp,rb,vbp,wdt) . s .
-[the]re's(ex_0.000,pos,prp,rb) . D ei, 9r z .
-[there]'s(ex_0.000,pos,prp,rb) . z .
-[tho]se(dt,prp) . z .
-[to]ma[toes]-(+tomato+s,nns) . m A:, .
-[to]night(nn,rb) . n aI, t .
-[tod]ay(nn,nnp,rb) . ei, .
-[toge]ther(rb) . D 3r, .
-[trans]fusions(+transfuse+ion+s,nns) . f j u:, . Z I, n z .
-[u]sually(+use+ual+ly,rb) . Z & . l i:, .
-[un]fortunately(+un+fortunate+ly,rb) . f oU, 9r . tS I, . n I, t . l i:, .
-[un]less(cc,in) . l E, s .
-[un]til(cc,in,nnp,rp) . th I, l .
-[uni]versity(nn,nnp) . v 3r, . s I, . th i:, .
-[us]sr(+abbreviation,nn,nnp_country) . E, . s A:, 9r .
-[v]arious(jj) . @, . 9r i:, . I, s .
-[w]as(vbd) . ^, z .
-[w]ell(jj,nn,nnp,nnp_surname_0.001,rb,uh,vb) . E, l .
-[w]ill(md,nn,nnp,nnp_boyname_0.018,nnp_surname_0.003,vb) . I, l .
-[w]ith(in,nnp,rp) . I, D .
-[w]omen(nnp,nnp_surname_0.000,nns) . I, . m I, n .
-[wa]s(vbd) . z .
-[we]ll(jj,nn,nnp,nnp_surname_0.001,rb,uh,vb) . l .
-[wh]at(dt,prp,wdt,wp) . A:, t .
-[whi]z(nn,nnp,vb) . z .
-[wi]ll(md,nn,nnp,nnp_boyname_0.018,nnp_surname_0.003,vb) . l .
-[with]out(in,rb,rp) . aU, t .
-[y]eah(nnp_surname_0.000,uh) . @, .
-[y]ou(nnp_surname_0.001,prp) . u:, .
.(punc) . d A:' t .
.(punc) . d E' . s & . m l= .
.(punc) . f U' l . s th A:' p .
.(punc) . ph >i' n t .
.(punc) . ph I' . 9r i . & d .
...(punc) . Ix . l I' p . s Ix s .
/(punc) . s l @' S .
007(+abbreviation,nnp_person) . d ^, . b & . l oU, . s E, . v I, n .
1(cd) . w ^, n .
100(cd) . h ^, n . d 9r I, d .
101(cd) . w ^, . n oU, . w ^, n .
10a(nn) . th E, . n ei, .
1200(cd) . th w E, l v . h ^, n . d 9r I, d .
125k(nn) . w ^, n . h ^, n . d 9r I, . d_( n= . th w E, n . th i:, . f aI, v . kh ei, .
128(cd) . w ^, n . th u:, . ei, t .
13th(cd,jj) . T 3r, . th i:, n T .
13ths(nns) . T 3r, . th i:, n T z .
150(cd) . w ^, n . f I, f . th i:, .
1500(cd) . f I, f . th i:, n T . h ^, n . d 9r I, d .
2(cd) . th u:, .
20/20(jj) . th w E, n . th i:, t . w E, n . th i:, .
2000(cd) . th u:, . T aU, . z I, n d .
21(cd) . th w E, n . th i:, . w ^, n .
260(cd) . th u:, . s I, k . s th i:, .
286(cd) . th u:, . ei, . th i:, . s I, k s .
287(cd) . th u:, . ei, . th i:, . s E, . v n= .
2ci(+abbreviation,nnp_product) . th u:, . s i:, . aI, .
3-d() . T 9r i:' . d i .
302(cd) . T 9r i:, . oU, . th u:, .
365(cd) . T 9r i:, . s I, k . s th i:, . f aI, v .
380(cd) . T 9r i:, . ei, . th i:, .
386(cd) . T 9r i:, . ei, . th i:, . s I, k s .
4-runner(nn,nnp_product) . f oU, 9r . 9r ^, . n 3r, .
401[k]-(nnp_product) . f oU, . 9r oU, . w ^, n .
401k(nnp_product) . f oU, . 9r oU, . w ^, n . kh ei, .
401k's(nnp_product,pos) . f oU, . 9r oU, . w ^, n . kh ei, z .
40[1k]-(nnp_product) . f oU, . 9r oU, .
48(cd) . f oU, 9r . th i:, . ei, t .
486(cd) . f oU, . 9r ei, . th i:, . s I, k s .
49er(nn) . f oU, 9r . th i:, . n aI, . n 3r, .
49ers(nn) . f oU, 9r . th i:, . n aI, . n 3r, z .
4h(+abbreviation,nnp_organization) . f oU, . 9r ei, tS .
4o[1k]-(nn) . f oU, . 9r oU, .
5(cd) . f aI, v .
500(cd) . f aI, v . h ^, n . d 9r I, d .
60(cd) . s I, k . s th i:, .
635(cd) . s I, k s . T 3r, . th i:, . f aI, v .
635's(cd,pos) . I, k s . T 3r, . th i:, . f aI, v .
69(cd) . s I, k . s th i:, . n aI, n .
6s(nn) . s I, k . s I, z .
7-eleven(nn,nnp_company) . s E, . v I, . n I, . l E, . v I, n .
7-up(nn,nnp_product) . s E, . v I, . n ^, p .
7094(cd) . s E, . v E, . n oU, . n aI, n . f oU, 9r .
747(cd) . s E, . v I, n . f oU, 9r . s E, . v I, n .
8088(cd) . ei, . th i:, . ei, . th i:, . ei, t .
90210(cd) . n aI, . n oU, . th u:, . w ^, . n oU, .
9050(cd) . n aI, n . T aU, . z I, n d . f I, f . th i:, .
911(cd) . n aI, n . w ^, n . w ^, n .
990(cd) . n aI, n . n aI, n . th i:, .
:(punc) . kh oU' . l n= .
;(punc) . s E' . m Ix . kh oU, . l n= .
;(punc) . s E' . m i . kh oU' . l n= .
?(punc) . kh w E' s . tS n= . m A:' 9r k .
[-[can]sego/canseco](nnp_surname_0.000) . s E, . g oU, .
[abrode/abroad](jj,rb) . & b . 9r oU, d .
[adamnet/adapted](+adapt+ed,vbd,vbn) . @, . d_( & m . n E, t .
[along/lawn](nn,nnp_surname_0.000) . & . l >, N .
[anani[mous]-/unanimous](jj) . & . n @, . n I, .
[ananimous/unanimous](jj) . & . n @, . n I, . m & s .
[ancle/uncle](nn,nnp) . @, N . kh l= .
[anheimer/alzheimer](nnp) . @, n . h aI, . m 3r, .
[annuitity/annuity](nn,nnp) . & . n u:, . I, . th I, . th i:, .
[ap/operate](vb,vbp) . & p .
[apliplations/applications](+apply+cation+s,nns) . @, p . l I, p . l ei, . S I, n z .
[ar[f]-/off](in,jj,nnp_surname_0.000,rb,rp) . A:, 9r .
[arear/area](nn,nnp,nnp_surname_0.000) . ei, . 9r i:, 9r .
[assumingly/assumably](rb) . & . s u:, . m I, N . l I, .
[atteck/attend](vb,vbp) . & . th E, k .
[attence/attempt](nn,vb,vbp) . & . th E, n s .
[aware/away](rb,rp) . & . w ei, 9r .
[bacally/basically](+base+ic+al+ly,rb) . b ei, k . l i:, .
[bamorghini/lamborghini](nnp_product) . b @, . m 3r, . g i:, . n i:, .
[banding/banning](+ban+ing,nn,nnp_surname_0.001,vbg) . b @, n . d I, N .
[bestes[t]-/best](jjs,nnp_surname_0.016,rb,rbs) . b E, s . th E, s .
[bettle/better](+bet+er,jj,jjr,nn,nnp,nnp_surname_0.000,rb,rbr,vb) . b E, . t_( l= .
[bidness/business](+busy+ness,nn,nnp) . b I, d . n I, s .
[bifocers/bifocals](+bifocal+s,nns) . b aI, . f oU, . kh 3r, z .
[biness/business](+busy+ness,nn,nnp) . b I, . n I, s .
[binesses/businesses](+busy+ness+s,nns) . b I, . n I, . s I, z .
[bocket/bucket](nn) . b >, . kh E, t .
[booth/both](cc,cd,dt,nnp_surname_0.000,pdt) . b u:, D .
[boughten/bought](vbd,vbn) . b >, . th E, n .
[brand/grand](jj,nnp,nnp_surname_0.001) . b 9r @, n d .
[bright/right](jj,nn,nnp,nnp_surname_0.000,rb,vb) . b 9r aI, t .
[bulch/mulch](nn,nnp_surname_0.000,vb) . b ^, l tS .
[burgalies/burglaries](+burglary+s,nns) . b 3r, . g & . l i:, z .
[burgurlaries/burglaries](+burglary+s,nns) . b 3r, . g 3r, . l & . 9r i:, z .
[bystandard/bystander](nn) . b aI, s . th @, n . d 3r, d .
[ca/class](nn,nnp,nnp_surname_0.001,vb) . kh @, .
[cam[pany]-/company](nn,nnp) . kh @, m .
[campsise/campsite](nn) . kh @, m p . s aI, z .
[carrer/carrier](+carry+er,nn,nnp_surname_0.006) . kh @, . 9r 3r, .
[cate/state](nn,nnp,nnp_surname_0.000,vb,vbp) . kh ei, t .
[cha[pe]-/shape](nn,nnp_surname_0.000,vb,vbp) . tS ei, .
[chicer[tos]-/concertos](+concerto+s,nns) . tS I, . kh ei, 9r .
[chlorofar/chlorofluorocarbons](nns) . kh l oU, . 9r oU, . f A:, 9r .
[cima[tography]-/cinematography](nn) . s I, . m & .
[civinal/civil](jj,nnp,nnp_surname_0.000) . s I, . v I, . n l= .
[client/climate](nn) . kh l aI, . I, n t .
[clo/countries](+country+s,nnps,nns) . kh l oU, .
[clo[ss]-/cross](jj,nn,nnp,nnp_surname_0.031,vb,vbp) . kh l >, .
[cnnn/cnn](+abbreviation,nnp,nnp_company) . s i:, . E, . n E, . n E, n .
[committed/convicted](+convict+ed,vbd,vbn) . kh & . m I, . th I, d .
[communercation/communication](+communicate+ion,nn,nnp) . kh & m . j u:, . n 3r, . kh ei, . S I, n .
[communiky/community](nn,nnp) . kh & m . j u:, . n I, . kh i:, .
[commutiv/computerized](+compute+er+ize+ed,jj,nn,vbd,vbn) . kh & m . j u:, . th I, v .
[comp/container](+contain+er,nn,nnp) . kh A:, m p .
[compi/campaign](nn,nnp,vb) . kh A:, m . ph i:, .
[compooter/computer](+compute+er,nn,nnp) . kh & m . ph u:, . th 3r, .
[cr[osby]-/cosby](nnp,nnp_surname_0.004) . k 9r .
[crain/training](+train+ing,nn,vbg) . kh 9r ei, n .
[craning/training](+train+ing,nn,vbg) . kh 9r ei, . n I, N .
[cre/committing](+commit+ing,vbg) . kh 9r i:, .
[crite/quite](pdt,rb) . kh 9r aI, t .
[cros/cosby](nnp,nnp_surname_0.004) . kh 9r >, s .
[cu/punishment](+punish+ment,nn) . kh ^, .
[darc/document](nn,vb) . d A:, 9r k .
[daur/daughter's](nn) . d >, 9r .
[decifit/deficit](nn) . d E, . s i:, . f i:, t .
[decrimi/incrimination](+incriminate+ion,nn) . d ei, k . 9r I, . m I, .
[destabulation/destabilization](+de+stabilize+ation,nn) . d i:, s . th ei, b . j u:, . l ei, . S I, n .
[determent/deterrent](+deter+ent,jj,nn) . d I, . th 3r, . m I, n t .
[deterrment/deterrent](+deter+ent,jj,nn) . d I, . th 3r, . m I, n t .
[dib/bit](jj,nn,rb,vbd,vbn) . d I, b .
[directle/directed](+direct+ed,vbd,vbn) . d I, . 9r E, k . th l= .
[discover/discovery](+dis+cover+y,jj,nn,nnp) . d I, s . kh ^, . v 3r, .
[disea[l]-/diesel](jj,nn,nnp,nnp_surname_0.000) . d I, . z i:, .
[disevered/discovered](+discover+ed,jj,vbd,vbn) . d I, . s E, . v 3r, d .
[disfie[d]-/dissatisfied](+dis+satisfy+ed,jj,vbd,vbn) . d I, s . f aI, .
[distrupt/disrupt](vb) . d I, . s t 9r ^, p t .
[divantages/disadvantages](+disadvantage+s,nns) . d I, . v @, n . th I, . dZ I, z .
[doen't/doesn't](vb) . d ^, . n= t .
[dollmeyer/dahmer](nnp_surname_0.000) . d >, l . m aI, . 3r, .
[dono/donating](+donate+ing,vbg) . d oU, . n oU, .
[dos/do](nnp_surname_0.004,vb,vbp) . d u:, z .
[dour/your](prp) . d oU, 9r .
[dow/know](nnp,vb,vbp) . d oU, .
[drawed/drew](nnp,nnp_boyname_0.024,nnp_girlname_0.001,nnp_surname_0.009,vbd) . d 9r >, d .
[dre/testing](+test+ing,nn,vbg) . d 9r E, .
[dust/just](jj,nnp_surname_0.002,rb) . d ^, s t .
[eagle/eager](jj,nnp_surname_0.001) . i:, . g l= .
[earhout/earhart](nnp_surname_0.001) . E, 9r . h aU, t .
[ec/ethic](nn) . E, k .
[eightch/eight](cd,jj,nn) . ei, tS .
[emancimation/emancipation](+emancipate+ion,nn,nnp) . I, . m @, n . s I, . m ei, . S I, n .
[emjoy/enjoy](+en+joy,vb,vbp) . E, m . dZ >i, .
[es/extinct](jj) . E, s .
[escavators/excavators](+excavate+or+s,nns) . E, s . kh & . v ei, . th 3r, z .
[evalu/evaluate](vb,vbp) . E, . v @, . l U, .
[ex[specially]-/especially](+especial+ly,rb) . E, k s .
[extansion/extension](+ex+tense+ion,nn,nnp) . E, k . s th @, n . S I, n .
[extensly/extensively](+extensive+ly,rb) . E, k . s th E, n . s l i:, .
[extremey/extreme](jj,nn) . E, k . s t 9r i:, . m i:, .
[fa/for](cc,in,rb,rp) . f & .
[face/place](nn,nnp,nnp_surname_0.003,vb,vbp) . f ei, s .
[fam/funniest](+funny+est,jjs) . f @, m .
[fam[ous]-/funniest](+funny+est,jjs) . f @, m .
[famuel/family](nn,nnp) . f @, m . j u:, . E, l .
[feazure/feature](nn,vb,vbp) . f i:, . z 3r, .
[feelt/feel](nn,vb,vbp) . f i:, l t .
[feministus/feminists](+feminist+s,nns) . f E, . m I, . n I, s . th U, s .
[fies/flies](+fly+s,nnp_surname_0.000,nns,vbz) . f aI, z .
[fight/fact](nn) . f aI, t .
[flage/fade]-(vb) . f l ei, dZ .
[flang/flamingo](nn,nnp) . f l @, N .
[flap/slap](nn,vb) . f l @, p .
[flow/blow](nn,nnp_surname_0.002,vb) . f l oU, .
[flus[tration]-/frustration](+frustrate+ion,nn) . f l & s .
[fo/home](nn,nnp,nnp_surname_0.000,rb) . f oU, .
[fo[me]-/home](nn,nnp,nnp_surname_0.000,rb) . f oU, .
[forfilling/fulfilling](+fulfill+ing,vbg) . f >, 9r . f I, . l I, N .
[fudgy/fuzzy](+fuzz+y,jj) . f ^, . dZ i:, .
[ga/bag](nn,vb) . g @, .
[gaven/given](jj,nnp_surname_0.001,vbn) . g ei, . v n= .
[geing/going](+go+ing,jj,nn,nnp_surname_0.000,vbg) . g i:, . I, N .
[gisland/island](nn,nnp,nnp_surname_0.000) . dZ I, . l n= d .
[grest/greatest](+great+est,jjs) . g 9r E, s t .
[griedous/grievous](jj) . g 9r i:, . d_( & s .
[grug/drug](nn,nnp,vb) . g 9r ^, g .
[grulf/gulf](nn,nnp) . g 9r ^, l f .
[gust/just](jj,nnp_surname_0.002,rb) . g ^, s t .
[ha/family](nn,nnp) . h @, .
[hank[ing]-/hiking](+hike+ing,nn,vbg) . h @, N k .
[hanters/hand](nn,nnp_surname_0.008,rb,vb) . h @, n . th 3r, z .
[har[bits]-/habits](+habit+s,nns) . h A:, 9r .
[hardy/harder](+hard+er,jjr,nnp_surname_0.005,rb,rbr) . h A:, 9r . d i:, .
[hay/horse](nn,nnp,nnp_surname_0.000) . h ei, .
[hem/hormones](+hormone+s,nns) . h E, m .
[hexpired/expired](+expire+ed,jj,vbd,vbn) . h E, k . s ph aI, 9r d .
[hi-sci/hi-fi](jj,nn) . h aI, . s aI, .
[himsnelf/himself](prp) . h I, m . s n E, l f .
[hippocratic/hippocrates](nnp_surname_0.000) . h I, . ph A:, k . 9r & . th i:, k .
[hitchclock/hitchcock](nnp_surname_0.005) . h I, tS . kh l A:, k .
[howsner/howser](nnp_surname_0.001) . h aU, s . n 3r, .
[hunniest/funniest](+funny+est,jjs) . h ^, . n i:, . I, s t .
[hur/hose](nn,nnp_surname_0.001) . h 3r, .
[impeme/implemented](+implement+ed,vbd,vbn) . I, m . ph i:, . m E, .
[in't/isn't](vbz) . I, n t .
[inaerobic/anaerobic](jj) . I, . n & . 9r oU, . b I, k .
[incentitive/incentive](nn) . I, n . s E, n . th I, . th I, v .
[indivigal/individual](jj,nn,nnp) . I, n . d I, . v I, . g l= .
[inedeas/ideas](+idea+s,nns) . aI, . n & . d i:, . & z .
[ins/winds](+wind+s,nns,vbz) . I, n s .
[intendo/nintendo](nnp,nnp_company) . I, n . th E, n . d oU, .
[israels/israelis](+israel+i+s,nnps,nns) . I, z . 9r ei, . l= z .
[it'n/isn't](vbz) . I, . t_( n= .
[jere's/there's](ex_0.000,prp,rb) . dZ ei, 9r z .
[jog/job](nn,nnp,nnp_surname_0.001) . dZ A:, g .
[judo-christian/judeo-christian](jj) . dZ u:, . d oU, k . 9r I, s . tS I, n .
[jype/type](nn,vb) . dZ aI, p .
[keech/keep](nnp_surname_0.000,vb,vbp) . kh i:, tS .
[key/he](nnp_surname_0.001,prp) . kh i:, .
[kidzees/kids](+kid+s,nnp,nnps,nns,vbz) . kh I, d . z i:, z .
[kleeping/keeping](+keep+ing,nnp,vbg) . kh l i:, . ph I, N .
[konestan/kazhakstan](fw_misspelling:kazakhstan) . kh oU, . n ei, s . th @, n .
[kype/type](nn,vb) . kh aI, p .
[lan/lambs](+lamb+s,nns) . l @, n .
[laniers/lanier](nnp,nnp_surname_0.007) . l ei, . n i:, . 3r, z .
[lard/yard](nn,nnp_surname_0.001) . l A:, 9r d .
[lawful/awful](jj,rb) . l >, . f l= .
[lazy/laser](+lase+er,nn,nnp,nnp_surname_0.000) . l ei, . z i:, .
[leases/releases](+release+s,nns,vbz) . l i:, . s I, z .
[leers/years](+year+s,nns) . l i:, 9r z .
[lem[guini]-/linguini](nn) . l E, m .
[ler/word](nn,nnp_surname_0.003,vb) . l 3r, .
[let/less](cc,dt,jjr,jjs,nnp,nnp_surname_0.000,rb,rbr,rp) . l E, t .
[lil/little](dt,jj,nnp,nnp_boyname_0.000,nnp_surname_0.046,rb) . l I, l .
[linking/lincoln](nn,nnp,nnp_boyname_0.008,nnp_city,nnp_surname_0.006) . l I, N . kh I, N .
[linteresting/interesting](+interest+ing,jj,vbg) . l I, n . th & . 9r E, s . th I, N .
[low/know](nnp,vb,vbp) . l oU, .
[lucratim/lucrative](jj) . l u:, k . 9r & . th I, m .
[maceboast/mostly](rb) . m ei, s . b oU, s t .
[mada/mazdas](nnps_product) . m A:, . d_( & .
[magerick/maverick](nn,nnp_boyname_0.000) . m @, . dZ & . 9r I, k .
[malestation/molestation](+molest+ation,nn) . m @, . l E, s . th ei, . S I, n .
[man[tana]-/montana](nn,nnp,nnp_boyname_0.000,nnp_girlname_0.000,nnp_state,nnp_surname_0.002) . m @, n .
[meach/much](dt,jj,nnp_surname_0.000,rb) . m i:, tS .
[meniar/menial](jj) . m i:, . n i:, . & 9r .
[militory/military](jj,nn,nnp,nns) . m I, . l I, . th oU, . 9r i:, .
[mirv/mir](nnp_surname_0.000) . m 3r, v .
[monteplier/montpelier](nn,nnp,nnp_city) . m A:, . n & p . l aI, . 3r, .
[mot/lot](dt,nn,nnp,nnp_surname_0.000,rb) . m >, t .
[mought/bought](vbd,vbn) . m >, t .
[mykelf/myself](prp) . m aI, . kh E, l f .
[ne'er/never](nnp,nnp_surname_0.000,rb,rbr) . n E, . 3r, .
[never/ever](rb) . n E, . v 3r, .
[no/oh](nnp_surname_0.003,uh) . n oU, .
[non't/don't](vb) . n oU, n t .
[norman/normal](+norm+al,jj) . n oU, 9r . m n= .
[nose/noise](nn) . n oU, s .
[nursings/nursing](+nurse+ing,nn,vbg) . n 3r, . s I, N z .
[o'near/o'neil](nnp_surname_0.000) . oU, . n i:, 9r .
[ofend/often](rb) . & . f E, n d .
[ogen/oven](nn,nnp_surname_0.000) . ^, . g n= .
[omniscious/omniscent](fw_misspelling:omniscient) . A:, m . n I, . S I, . & s .
[omniscipotent/omnipotent](+omni+potent,jj) . A:, m . n I, . S I, . ph & . th I, n t .
[oop/oops](uh) . u:, p .
[orkid/orkin](nnp_surname_0.000) . oU, 9r . kh I, d .
[outsor/outside](+out+side,in,jj,nn,rb,rp,vb) . aU, t . s oU, 9r .
[over/other](dt,jj,nn,nnp,nnp_surname_0.000,prp) . oU, . v 3r, .
[overnighter/overnight](jj,nn,rb) . oU, . v 3r, . n aI, . th 3r, .
[pacifits/specifics](+specific+s,nn,nns) . ph & . s I, . f I, t s .
[paetha/paella](nn) . ph ei, . E, . T & .
[pan/plan](nn,nnp,nnp_surname_0.000,vb,vbp) . ph @, n .
[par[t]-/point](jj,nn,nnp,nnp_surname_0.000,vb,vbp) . ph A:, 9r .
[parakreet/parakeet](nn) . ph @, . 9r & k . 9r i:, t .
[patr/parole](nn,vb) . ph @, t 9r .
[pay/playing](+play+ing,jj,nn,vbg) . ph ei, .
[pentalty/penalty](nn) . ph E, n . th l= . th i:, .
[per/pension](nn,nnp,vb) . ph 3r, .
[pervilion/pavilion](nn,vb) . ph 3r, . v I, . l i:, . n= .
[pi/fit](jj,nn,vb,vbd,vbn,vbp) . ph I, .
[piot/pilot](jj,nn,nnp_surname_0.000,vb) . ph aI, . & t .
[plaint/paint](nn,vb,vbp) . ph l ei, n t .
[po/couch](nn,nnp_surname_0.010,vb) . ph oU, .
[pob/problem](nn,nnp) . ph A:, b .
[poistroi[ka]-/perestroika](fw,nn) . ph >i, . s t 9r A:, .
[polly/party](+part+y,jj,nn,nnp,nnp_surname_0.000,vb) . ph >, . l i:, .
[porce/force](nn,nnp,nnp_surname_0.001,vb,vbp) . ph oU, 9r s .
[port/part](jj,nn,nnp,nnp_surname_0.000,vb) . ph oU, 9r t .
[portay/portray](vb,vbp) . ph oU, 9r . th ei, .
[pott[ed]-/patted](+pat+ed,vbd,vbn) . ph A:, t .
[potted/patted](+pat+ed,vbd,vbn) . ph A:, . th I, d .
[pra/platform](nn) . ph 9r @, .
[prats/parts](+part+s,nnp,nns,vbz) . ph 9r @, t s .
[pratted/planted](+plant+ed,vbd,vbn) . ph 9r @, . th I, d .
[preca[re]-/preschool](+pre+school,nn,vb) . ph 9r I, . kh ei, .
[precru/preclude](vb) . ph 9r I, k . 9r u:, .
[prejitice/prejudiced](+prejudice+ed,jj,vbd,vbn) . ph 9r E, . dZ I, . th I, s .
[prentative/preventative](jj,nn) . ph 9r n= . th & . th I, v .
[pri/strictly](+strict+ly,rb) . ph 9r i:, .
[proceum/processing](+process+ing,nn,nnp,vbg) . ph 9r A:, . s E, . U, m .
[propular/popular](jj) . ph 9r A:, p . j & . l 3r, .
[proy-ch[oice]-/pro-choice](+pro+choice,jj,nn) . ph 9r >i, tS .
[rebi/rehabilitate](vb) . 9r i:, . b I, .
[rebil/rehabilitate](vb) . 9r i:, . b I, l . .
[rebilihatate/rehabilitate](vb) . 9r i:, . b I, . l I, . h & . th ei, t .
[rebilitate/rehabilitate](vb) . 9r i:, . b I, . l I, . th ei, t .
[rec[oncentrated]-/concentrated](+concentrate+ed,jj,vbd,vbn) . 9r I, k .
[recor/exercise](nn,vb,vbp) . 9r E, . kh oU, 9r .
[recor/regular](jj,nn) . 9r E, . kh oU, 9r .
[recrela/recreationally](+re+create+ion+al+ly,rb) . 9r E, k . 9r i:, . l & .
[rector/records](+record+s,nnp,nnp_surname_0.000,nnps,nns,vbz) . 9r E, k . th 3r, .
[regwet/regret](nn,vb) . 9r I, g . w E, t .
[reight/weight](nn,nnp,nnp_surname_0.001,vb) . 9r ei, t .
[rela/rehabilitation](+rehabilitate+ion,nn) . 9r i:, . l @, .
[relly/ready](jj,nnp,nnp_surname_0.002,rb,vb) . 9r E, . l i:, .
[remelded/remolded](+re+mold+ed,vbd,vbn) . 9r i:, . m E, l . d E, d .
[renar/renewal](+renew+al,nn) . 9r I, . n A:, 9r .
[rerate/relate](vb,vbp) . 9r I, . 9r ei, t .
[restrictly/strictly](+strict+ly,rb) . 9r I, . s t 9r I, k t . l i:, .
[rev[iew]-/reunion](nn) . 9r i:, v .
[reverked/revoked](+revoke+ed,vbd,vbn) . 9r I, . v 3r, k t .
[ri[ggle]-/wiggle](nn,vb,vbp) . 9r I, .
[rise/right](jj,nn,nnp,nnp_surname_0.000,rb,vb) . 9r aI, z .
[rogo/roger](nnp,nnp_boyname_0.322,nnp_surname_0.003) . 9r A:, . dZ oU, .
[rotocop/robocop](nnp_product) . 9r oU, . th oU, . kh A:, p .
[rotortiller/rototiller](+rototill+er,nn) . 9r oU, . th 3r, . th I, . l 3r, .
[rout/out](in,jj,nn,nnp,rb,rp) . 9r aU, t .
[row/wow](uh,vb) . 9r aU, .
[ruf/riffraff](nn) . 9r & f .
[ruther/rather](nnp,nnp_surname_0.001,rb) . 9r ^, . D 3r, .
[saly/salary](nn) . s @, . l i:, .
[samp[les]-/examples](+example+s,nns,vbz) . s @, m p .
[sandmiches/sandwiches](+sandwich+s,nns,vbz) . s @, n d . m I, . tS I, z .
[sark/sock](nn,vb) . s A:, 9r k .
[satistics/statistics](+statistic+s,nn,nnp,nnps,nns) . s & . th I, s . th I, k s .
[schmor[koff]-/schwar[zkoff]-](nnp_surname_0.000) . S m oU, 9r .
[scrapses/scraps](+scrap+s,nns,vbz) . s k 9r @, p . s E, s .
[sensings/sentencings](+sentence+ing+s,nns) . s E, n . s I, N z .
[shirt/short](jj,nnp,nnp_surname_0.021,rb,vb) . S 3r, t .
[shock/shop](nn,nnp,vb) . S A:, k .
[shore/show](nn,nnp,nnp_surname_0.000,vb,vbp) . S oU, 9r .
[shrip/shrimp](nn,nns) . S 9r I, p .
[simular/simulator](+simulate+or,nn,nnp) . s I, m . j & . l 3r, .
[spla[ce]-/space](nn,nnp,nnp_surname_0.000,vb) . s ph l ei, .
[splace/space](nn,nnp,nnp_surname_0.000,vb) . s ph l ei, s .
[spo/so](cc,in,nnp_girlname_0.002,nnp_surname_0.001,rb) . s ph oU, .
[spoilt/spoiled](+spoil+ed,vbd,vbn) . s ph >i, l t .
[springer/splinter](+splint+er,nn,nnp_surname_0.000,vb) . s ph 9r I, N . 3r, .
[st/score](nn,nnp_surname_0.000,vb,vbp) . s t .
[stale/sale](nn,nnp_surname_0.002) . s th ei, l .
[staling/stalin](nnp_surname_0.000) . s th >, . l I, N .
[storly/story](nn,nnp,nnp_surname_0.008) . s th oU, 9r . l i:, .
[strase/stress](nn,vb,vbp) . s t 9r ei, s .
[strate/state](nn,nnp,nnp_surname_0.000,vb,vbp) . s t 9r ei, t .
[strean/stream](nn,nnp,nnp_surname_0.000,vb) . s t 9r i:, n .
[stricker/stricter](+strict+er,jjr) . s t 9r I, . kh 3r, .
[sup/stupid](jj) . s u:, .
[surv/supervisor](+supervise+or,nn,nnp) . s u:, 9r v .
[swind/swing](nn,nnp_surname_0.001,vb,vbp) . s w I, n d .
[synsi/synthesizers](+synthesize+er+s,nns) . s I, n . s I, .
[tack/talking]-(+talk+ing,nn,vbg) . th @, k .
[tela[s]-/texas](nn,nnp,nnp_girlname_0.000,nnp_state) . th E, . l @, .
[telecreder/telecredit](nn) . th E, . l I, k . 9r E, . d_( & 9r .
[ter/tore](vbd) . th 3r, .
[testses/tests](+test+s,nns,vbz) . th E, s t . s E, s .
[thisselves/themselves](prp) . D I, s . s E, l v z .
[thown/down](in,jj,nn,nnp,nnp_surname_0.000,rb,rbr,rp,vb,vbp) . T aU, n .
[thrugs/drugs](+drug+s,nnp,nnps,nns,vbz) . T 9r ^, g z .
[toc/soccer](nn) . th A:, k .
[tole/whole](jj,nn) . th oU, l .
[toof/two]-(cd,jj,nn) . th u:, f .
[tortula/tortola](nn) . th oU, 9r . th u:, . l & .
[tranged/changed](+change+ed,jj,vbd,vbn) . th 9r ei, n dZ d .
[trax/tax](nn,nnp,vb) . th 9r @, k s .
[trelve/twelve](cd,jj,nn,nnp) . th 9r E, l v .
[trest/test](nn,nnp,nnp_surname_0.000,vb,vbp) . th 9r E, s t .
[tresting/testing](+test+ing,nn,vbg) . th 9r E, s . th I, N .
[trests/tests](+test+s,nns,vbz) . th 9r E, s t s .
[trew/grew](nnp_surname_0.000,vbd,vbn) . th 9r u:, .
[tried/tied](+tie+ed,vbd,vbn) . th 9r aI, d .
[twainese/twangy](jj) . th w ei, . n i:, z .
[un/uh](nnp,uh) . & n .
[unconvenient/inconvenient](+in+convenient,jj) . & n . kh n= . v i:, n . j I, n t .
[unequality/inequality](+in+equal+ity,nn) . & . n i:, k . w & . l I, . th i:, .
[univerty/university](nn,nnp) . j u:, . n I, . v 3r, . th i:, .
[usr/ussr](+abbreviation,nn,nnp_country) . j u:, . E, . s A:, 9r .
[vate/vote](nn,nnp_surname_0.000,vb,vbp) . v ei, t .
[wan't/wasn't](vbd) . w ^, n t .
[warshin/washington](nn,nnp,nnp_boyname_0.000,nnp_city,nnp_state,nnp_surname_0.092) . w >, 9r . S I, n .
[wea[sonable]-/reasonable](+reason+able,jj) . w i:, .
[weived/woven](vbn) . w ei, v d .
[welfor/welfare](nn) . w E, l . f oU, 9r .
[what'n/wasn't](vbd) . w A:, t n .
[wi[fe]-/life](nn,nnp,nnp_surname_0.000) . w aI, .
[wid/midwest](+mid+west,jj,jjs,nn,nnp) . w I, d .
[wight/right](jj,nn,nnp,nnp_surname_0.000,rb,vb) . w aI, t .
[winey/ivory](jj,nn,nnp,nnp_boyname_0.006,nnp_girlname_0.005,nnp_surname_0.004) . w aI, . n i:, .
[wist/witness](nn,nnp,vb) . w I, s t .
[womens/women](nnp,nnp_surname_0.000,nns) . w I, . m I, n z .
[worths/works](+work+s,nn,nnp,nnp_surname_0.001,nnps,nns,vbz) . w 3r, T s .
[woved/woven](vbn) . w oU, v d .
[yack/yeah](nnp_surname_0.000,uh) . j @, k .
[yeam/yeah](nnp_surname_0.000,uh) . j @, m .
[yous/you](nnp_surname_0.001,prp) . j u:, s .
a(dt) . & .
a(dt) . ei .
a(dt,fw,in,jj,ls,nn,nnp,sym) . ei .
a&e(+abbreviation,nnp,nnp_company) . ei, . @, n . d i:, .
a&m(+abbreviation,nnp,nnp_organization) . ei, . @, n . d E, m .
a'() . A .
a's(dt,fw,in,jj,ls,nn,nnp,pos,sym) . ei' z .
a-be() . ei # b i .
a-bomb() . ei' . b A:, m .
a-c() . ei # s i .
a-sea() . ei # s i .
a-tiptoe() . ei # th I' p . th oU, .
a.(jj,nn,nnp) . ei' .
a.'s(jj,nn,nnp,pos) . ei' z .
a.s(nn) . ei' z .
a1(nnp_product) . ei, . w ^, n .
a42128(nn) . ei' . f >' 9r . th u:' . w ^' n . th u:' . ei' t .
a[bandoned]-(+abandon+ed,vbd,vbn) . & .
a[bility]-(nn) . & .
a[ble]-(jj,nnp,nnp_surname_0.001) . ei, .
a[bout]-(in,jj,rb,rbr,rp) . & .
a[bove]-(in,jj,rb,rp) . & .
a[bsolutely]-(+absolute+ly,rb) . @, .
a[bused]-(+abuse+ed,jj,vbd,vbn) . & .
a[ccent]-(nn,vb) . @, .
a[ccept]-(vb,vbp) . E, .
a[ccidents]-(+accident+s,nns) . @, .
a[ccording]-(+accord+ing,vbg) . & .
a[ccount]-(nn,nnp,vb,vbp) . & .
a[ccumulate]-(vb,vbp) . & .
a[ccurate]-(jj) . @, .
a[cre]-(nn,nnp_surname_0.000) . ei, .
a[cross]-(in,rb,rp) . & .
a[ct]-(nn,nnp,vb,vbp) . @, .
a[ctive]-(+act+ive,jj) . @, .
a[ctually]-(+act+ual+ly,rb) . @, .
a[dd]-(vb,vbp) . @, .
a[ddictive]-(+addict+ive,jj) . & .
a[dding]-(+add+ing,vbg) . @, .
a[delaide]-(nnp_city,nnp_girlname_0.008) . @, .
a[dept]-(jj) . @, .
a[dequate]-(jj) . @, .
a[djacent]-(jj) . & .
a[dopt]-(vb) . & .
a[dvantage]-(nn,vb) . @, .
a[dvantages]-(+advantage+s,nns) . @, .
a[ffair]-(nn,nnp) . & .
a[fford]-(vb) . & .
a[ffordable]-(+afford+able,jj) . & .
a[fraid]-(jj) . & .
a[fter]-(cc,in,rb,rp) . @, .
a[fternoon]-(nn) . @, .
a[gain]-(rb) . & .
a[gainst]-(in,nnp,rp) . & .
a[ge]-(nn,nnp,nnp_surname_0.000,vb,vbp) . ei, .
a[gencies]-(+age+ency+s,nns) . ei, .
a[ghast]-(jj) . & .
a[ging]-(+age+ing,nn,vbg) . ei, .
a[go]-(in,jj,rb) . & .
a[gree]-(vb,vbp) . & .
a[greement]-(+agree+ment,nn,nnp) . & .
a[griculture]-(nn,nnp) . @, .
a[head]-(rb) . & .
a[ir]-(nn,nnp,vb) . ei, .
a[larm]-(nn,vb) . & .
a[lfred]-(nnp,nnp_boyname_0.162,nnp_surname_0.003) . @, l .
a[live]-(jj) . & .
a[ll]-(dt,nnp,nnp_surname_0.000,pdt,prp,rb) . >, .
a[llegedly]-(+allege+ed+ly,rb) . & .
a[llow]-(vb,vbp) . & .
a[lmost]-(nnp,rb) . >, .
a[long]-(in,jj,rb,rp) . & .
a[lso]-(rb) . >, .
a[lthough]-(cc,in) . >, .
a[ltogether]-(rb) . >, .
a[lways]-(nnp,rb) . >, .
a[maze]-(vb) . & .
a[mazing]-(+amaze+ing,jj,nnp,vbg) . & .
a[mendment]-(+amend+ment,nn,nnp) . & .
a[mong]-(in,rp) . & .
a[mount]-(nn,vb,vbp) . & .
a[nd]-(cc,in,jj,nn,nnp,vbp) . @, .
a[nimals]-(+animal+s,nns) . @, .
a[nother]-(dt,nn,prp) . & .
a[nteks]-(fw_misspelling:antics) . @, .
a[ny]-(dt,rb) . E, .
a[nybody]-(nn,prp) . E, .
a[nything]-(nn,nnp,prp) . E, .
a[nytime]-(rb) . E, .
a[nyway]-(rb) . E, .
a[part]-(rb,rp) . & .
a[partment]-(nn) . & .
a[partments]-(+apartment+s,nns) . & .
a[pparently]-(+apparent+ly,rb) . & .
a[ppealing]-(+appeal+ing,jj,vbg) . & .
a[pplied]-(+apply+ed,jj,nnp,vbd,vbn) . & .
a[pplies]-(+apply+s,vbz) . & .
a[pplying]-(+apply+ing,vbg) . & .
a[ppraisal]-(+appraise+al,nn) . & .
a[pproach]-(nn,vb,vbp) . & .
a[ppropriate]-(jj,vb) . & .
a[re]-(+abbreviation,in,nnp,nnp_organization,vb,vbp) . A:, .
a[rea]-(nn,nnp,nnp_surname_0.000) . ei, .
a[ren't]-(vb) . A:, .
a[round]-(in,rb,rp) . & .
a[s]-(cc,in,jj,nnp,rb,rp) . @, .
a[side]-(rb,rp) . & .
a[sk]-(nnp_surname_0.000,vb,vbp) . @, .
a[sphyxiate]-(vb) . @, .
a[ssistant]-(+assist+ant,jj,nn,nnp) . & .
a[ssisting]-(+assist+ing,vbg) . & .
a[ssume]-(vb,vbp) . & .
a[ssumed]-(+assume+ed,jj,vbd,vbn) . & .
a[sylum]-(nn) . & .
a[t]-(in,nn,rp) . @, .
a[ttached]-(+attach+ed,jj,vbd,vbn) . & .
a[ttachment]-(+attach+ment,nn) . & .
a[ttacking]-(+attack+ing,nn,vbg) . & .
a[ttention]-(nn,vb) . & .
a[vailable]-(+avail+able,jj) . & .
a[void]-(vb,vbp) . & .
a[way]-(rb,rp) . & .
a[while]-(rb) . & .
a_b_c(nn,nnp) . ei, . b i:, . s i:, .
a_b_c's(+abc+'s,nn,nnp,pos) . ei, . b i:, . s i:, z .
a_bas() . A # b A:' .
a_cappella() . A:, # kh & . ph E' . l & .
a_capriccio() . A:, # kh A . ph 9r i:' t . tS A .
a_cheval() . A # S & . v A:' l .
a_compte() . A # kh A:' N t .
a_couvert() . A # kh u . v E' 9r .
a_datu() . A # d A:' . th u .
a_deux() . A # d U' .
a_droite() . A # d 9r w A:' t .
a_due() . A # d u:' . ei .
a_fond() . A # f A:' N .
a_fortiori() . A # f oU, 9r . th Ix . oU' . 9r i .
a_gauche() . A # g oU' S .
a_gogo() . A # g oU' . g oU, .
a_jour() . A:' # Z U' .
a_l'ancienne() . A # l A N . s j E' n .
a_l'etuvee() . A # l ei t j . v ei' .
a_l'improviste() . A # l @ N . ph 9r A . v i:' s t .
a_la() . A:' # l A .
a_la_carte() . A:, # l & # kh A:' 9r t .
a_la_mode() . @, . l & . m oU' d .
a_luoi() . A # l oU j .
a_pied() . A # ph j ei' .
a_point() . A # p w @' N .
a_posteriori() . ei, # ph A . s th i:, . 9r i . oU' . 9r i .
a_priori() . ei, # ph 9r aI . oU' . 9r i .
a_quo() . A # kh w oU' .
a_tempo() . A # th E' m . ph oU .
a_tergo() . A # th E' 9r . g oU .
a_terre() . A # th E' 9r .
a_trois() . A # t 9r w A:' .
a_vol() . A # v A:' l .
aa() . A:' . A .
aaa(nnp_organization) . th 9r I, . ph & . l ei' .
aaberg(nnp_surname_0.000) . A:' . b &r g .
aachen(nnp_city) . A:' . kh n= .
aaker(nnp_surname_0.000) . A:' . kh &r .
aalborg() . A:' l . b A 9r g .
aalesund() . A:' . l & . s U, n .
aalii() . A . l i:' . i .
aalseth(nnp_surname_0.000) . A:' l . s E T .
aalst() . A l s t .
aalto() . A:' l . th A .
aames(nnp_surname_0.000) . ei, m z .
aamodt(nnp_surname_0.000) . A:' . m & t .
aancor(nnp_company) . A:' n . kh >, 9r .
aandahl() . A:' n . d A l .
aaqbiye() . A k . b i:' . j E .
aar() . A 9r .
aarau() . A:' . 9r aU .
aardema(nnp_surname_0.000) . A 9r . d E' . m & .
aardvark(nn) . A:' 9r d . v A:, 9r k .
aardwolf() . A:' 9r d . w U, l f .
aargau() . A:' 9r . g aU .
aaron(nnp,nnp_boyname_0.240,nnp_girlname_0.002,nnp_surname_0.008) . E' . 9r n= .
aaron's(nnp,nnp_boyname_0.240,nnp_girlname_0.002,nnp_surname_0.008,pos) . E' . 9r n= z .
aaron's-beard() . E' . 9r n= z . b i:, 9r d .
aaronic() . E . 9r A:' . n Ix k .
aaronical() . E . 9r A:' . n Ix . kh l= .
aaronite() . E' . 9r & . n aI, t .
aaronitic() . E, 9r . ^, . n Ix . th Ix k .
aarons(nnp_surname_0.001) . E' . 9r n= z .
aaronson(nnp_surname_0.000) . A:' . 9r n= . s n= .
aaronson(nnp_surname_0.000) . E' . 9r n= . s n= .
aaronson's(nnp_surname_0.000,pos) . A:' . 9r n= . s n= z .
aaronson's(nnp_surname_0.000,pos) . E' . 9r n= . s n= z .
aarp(nnp_organization) . ei, . ei, . A:, 9r . ph i:, .
aarti(nnp_event) . A:' 9r . th i:, .
aase(nnp_surname_0.000) . A:' s .
aase(nnp_surname_0.000) . A:' . s i .
aasen(nnp_surname_0.001) . A:' . s n= .
ab(nnp,nnp_boyname_0.000) . @ b .
ab(nnp,nnp_boyname_0.000) . @' b .
ab(nnp,nnp_organization) . ei' . b i:' .
ab[le]-(jj,nnp,nnp_surname_0.001) . ei, b .
ab[out]-(in,jj,rb,rbr,rp) . & b .
ab[solute]-(jj,nn) . @, b .
ab[solutely]-(+absolute+ly,rb) . @, b .
ab_extra() . A b # E' k . s t 9r A .
ab_initio() . A b # Ix . n I' . th i . oU, .
ab_intra() . A b # I' n . th 9r A .
ab_origine() . A b # oU . 9r I' . g Ix . n E, .
ab_ovo() . A b # oU' . w oU .
aba(+abbreviation,nnp,nnp_organization) . & . b A:' .
aba(+abbreviation,nnp,nnp_organization) . ei, . b i:, . ei, .
ababa(nnp_city) . & . b A:' . b & .
ababa(nnp_city) . A:' . b & . b & .
abac() . ei' . b @ k .
abaca() . A:, . b A . kh A:' .
abacha(nnp_city) . @' . b & . kh & .
abaci() . @' . b & . s aI, .
abaciscus() . @, . b & . s I' s . kh & s .
abacist() . @' . b & . s Ix s t .
aback(rb) . & . b @' k .
abaco(nnp_city) . @' . b & . kh oU, .
abaculus() . & . b @' . kh j & . l & s .
abacus(nn) . @' . b & . kh & s .
abacus_major() . @' . b & . kh & s # m ei' . dZ & 9r .
abad(nnp_surname_0.001) . & . b A:' d .
abadaka() . & . b @' . d_( & . kh & .
abadan(nnp_city) . A . b & . d A:' n .
abaddon() . & . b @' . d n= .
abadi(nnp_surname_0.000) . & . b @' . d i .
abadie(nnp_surname_0.001) . & . b @' . d i .
abaft() . & . b @' f t .
abagtha() . & . b @' g . T & .
abailard() . A . b ei . l A:' 9r .
abair(nnp_surname_0.000) . & . b E' 9r .
abaised() . & . b ei' s t .
abakumov() . A . b A . kh u:' . m A f .
abalkin(nnp) . & . b A:' l . kh Ix n .
abalon() . @, . b & . l A:, n .
abalone(nn) . @, . b & . l oU' . n i .
abalone_shell() . @, . b & . l oU' . n i # S E l .
abalos(nnp_surname_0.000) . A . b A:' . l oU z .
abamp() . @' b . @, m p .
abampere() . @ b . @' m . ph i 9r .
abandon(vb,vbp) . & . b @' n . d n= .
abandon_hope() . & . b @' n . d n= # h oU p .
abandoned(+abandon+ed,vbd,vbn) . & . b @' n . d n= d .
abandoned_person() . & . b @' n . d n= d # ph 3r' 9r . s n= .
abandoned_thing() . & . b @' n . d n= d # T Ix N .
abandonedly() . & . b @' n . d n= d . l i .
abandonee() . & . b @, n . d & . n i:' .
abandoning(+abandon+ing,vbg) . & . b @' n . d & . n Ix N .
abandonment(+abandon+ment,nn) . & . b @' n . d n= . m n= t .
abandonments(+abandon+ment+s,nns) . & . b @' n . d n= . m n= t s .
abandons(+abandon+s,vbz) . & . b @' n . d n= z .
abantes() . & . b @' n . th i z .
abanto() . & . b @' n . th oU .
abaptiston() . @, . b @ p . th I' s . th n= .
abarbarea() . & . b A 9r . b @' . 9r i . & .
abarca(nnp_surname_0.001) . & . b A:' 9r . kh & .
abare(nnp_surname_0.000) . A . b A:' . 9r i .
abaris() . @' . b & . 9r Ix s .
abas() . A:' . b & s .
abascal(nnp_surname_0.000) . @' . b & s . kh l= .
abase() . & . b ei' s .
abase_yourself() . & . b ei' s # j U 9r . s E' l f .
abased() . & . b ei' s t .
abash(vb) . & . b @' S .
abashed(+abash+ed,jj,vbd,vbn) . & . b @' S t .
abashedly() . & . b @' . S Ix d . l i .
abasia() . & . b ei' . Z & .
abask() . & . b A:' s k .
abassieh() . A . b A . s i:' . E .
abatage() . A . b & . th A:' Z .
abate(nnp_surname_0.001) . & . b A:' t . i .
abate(nnp_surname_0.001) . & . b ei' t .
abate(vb) . & . b ei' t .
abated(+abate+ed,vbd,vbn) . & . b ei' . t_( Ix d .
abatement(+abate+ment,nn) . & . b ei' t . m n= t .
abatements(+abate+ment+s,nns) . & . b ei' t . m n= t s .
abates(+abate+s,vbz) . & . b ei' t s .
abatic() . & . b @' . t_( Ix k .
abating(+abate+ing,vbg) . & . b ei' . t_( Ix N .
abatis() . @' . b & . th i:, .
abatises() . @' . b & . th I, . s Ix z .
abatjour() . A . b A . Z u:' 9r .
abattage() . A:' . b & . th @' Z .
abattoir() . @, . b & . th w A:' 9r .
abaxial() . @ b . @' k . s i . l= .
abb() . @ b .
abb_wool() . @ b # w U l .
abba(fw) . & . b A:' .
abba(fw) . @' . b & .
abba_eban() . A:' . b A # i:' . b A n .
abbacy() . @' . b & . s i .
abbado() . & . b A:' . d oU .
abbai() . A . b aI' .
abbas(nnp_surname_0.001) . & . b A:' s .
abbasi(nnp_surname_0.000) . A . b A:' . s i .
abbasid() . @' . b & . s Ix d .
abbasside() . @' . b & . s aI, d .
abbate(nnp_surname_0.001) . A:' . b ei t .
abbatial() . & . b ei' . S l= .
abbatiello(nnp_surname_0.000) . A . b A . th i . E' . l oU .
abbe(nn,nnp,nnp_surname_0.000) . @ . b ei' .
abbe(nn,nnp,nnp_surname_0.000) . @' . b i .
abbe_condenser() . @' . b i # kh n= . d E' n . s & 9r .
abbenhaus(nnp_surname_0.000) . @' . b n= . h aU, s .
abbes() . @ . b ei' z .
abbess() . @' . b Ix s .
abbett(nnp) . & . b E' t .
abbeville(nnp_city) . @' . b i . v Ix l .
abbeville(nnp_city) . @' b . v Ix l .
abbevillian() . @ b . v I' . l i . n= .
abbey(+abbe+y,jj,nn,nnp,nnp_girlname_0.004,nnp_surname_0.002) . @' . b i .
abbey's(+abbe+y,jj,nn,nnp,nnp_girlname_0.004,nnp_surname_0.002,pos) . @' . b i z .
abbey_counter() . @' . b i # kh aU' n . th & 9r .
abbey_laird() . @' . b i # l E 9r d .
abbey_lubber() . @' . b i # l ^' . b & 9r .
abbeystead() . @' . b i . s th E, d .
abbie(nnp,nnp_girlname_0.008) . @' . b i .
abbitt(nnp_surname_0.000) . @' . b Ix t .
abbot(nn,nnp,nnp_surname_0.000) . @' . b & t .
abbotsford(nnp_city) . @' . b & t s . f A 9r d .
abbott(nnp,nnp_boyname_0.000,nnp_surname_0.025) . @' . b & t .
abbott's(nnp,nnp_boyname_0.000,nnp_surname_0.025,pos) . @' . b & t s .
abboud(nnp,nnp_surname_0.000) . & . b aU' d .
abboud(nnp,nnp_surname_0.000) . & . b u:' d .
abboud(nnp,nnp_surname_0.000) . A . b u:' d .
abbreviate(vb) . & b . 9r i:' . v i . ei, t .
abbreviated(+abbreviate+ed,vbd,vbn) . & b . 9r i:' . v i . ei, . t_( Ix d .
abbreviates(+abbreviate+s,vbz) . & b . 9r i:' . v i . ei, t s .
abbreviating(+abbreviate+ing,vbg) . & b . 9r i:' . v i . ei, . t_( Ix N .
abbreviation(+abbreviate+ion,nn) . & b . 9r i:, . v i . ei' . S n= .
abbreviations(+abbreviate+ion+s,nns) . & b . 9r i:, . v i . ei' . S n= z .
abbruzzese(nnp_surname_0.000) . A b . 9r u t . s ei' . z i .
abbs(nnp_surname_0.000) . @' b z .
abby(nnp,nnp_girlname_0.016,nnp_surname_0.000) . @ . b i .
abby(nnp,nnp_girlname_0.016,nnp_surname_0.000) . @' . b i .
abco(nnp_company) . @' b . kh oU .
abcotek(nnp_company) . @' b . kh oU . th E, k .
abcoulomb() . @ b . kh u:' . l A m .
abcs(+abc+s,nns) . i:, . b i:, . s i:, z .
abd-al-kadir() . A:, b . d @ l # kh A:' . d i 9r .
abd-al-rahman() . A b . d A l . 9r A:' . m A n .
abd-el-kadir() . A:, b . d E l # kh A:' . d i 9r .
abd-el_krim() . A:, b . d E l # kh 9r i:' m .
abdalla(nnp_surname_0.000) . @, b . d @' . l & .
abdallah(nnp_surname_0.001) . @, b . d @' . l & .
abddullah_al_salim_al_saba() . A b . d ^' . l & # @ l # s A . l i:' m # @ l # s A . b A:' .
abdel(nnp_surname_0.000) . @' b . d E, l .
abdel_hakim_amer() . A:' b . d l= # h A . kh i:' m # A:' . m i 9r .
abdel_rahman_hakki() . A:' b . d l= # 9r A:' . m A n # h A:' . kh i .
abdel_rahman_iriani() . A:' b . d l= # 9r A:' . m A n # j 9r j A:' . n i .
abdel_salam_aref() . A:' b . d l= # s A . l A:' m # A:' . 9r & f .
abdelhadi_boutaleb() . @' b . d l= . h @ . d i # b u t . A:' . l & b .
abdelkarim_gheraieb() . A b . d E l . kh 9r i:' m # g A . 9r aI' . A b .
abdella(nnp_surname_0.000) . @, b . d E' . l & .
abdenour() . @' b . d E . n oU 9r .
abderhalden() . A:' p . d & 9r . h A:, l . d n= .
abderus() . @ b . d i:' . 9r & s .
abdias() . @ b . d aI' . & s .
abdicant() . @' b . d & . kh n= t .
abdicate(vb,vbp) . @' b . d & . kh ei, t .
abdicated(+abdicate+ed,vbd,vbn) . @' b . d & . kh ei, . t_( & d .
abdicates(+abdicate+s,vbz) . @' b . d & . kh ei, t s .
abdicating(+abdicate+ing,vbg) . @' b . d Ix . kh ei, . t_( Ix N .
abdication(+abdicate+ion,nn) . @, b . d & . kh ei' . S n= .
abdication(+abdicate+ion,nn) . @, b . d Ix . kh ei' . S n= .
abdicative() . @' b . d & . kh ei, . t_( Ix v .
abdnor() . @' b . d n &r .
abdo(nnp_surname_0.001) . @' b . d oU .
abdollah(nnp_boyname_0.000) . @, b . d A:' . l & .
abdomen(nn) . @ b . d oU' . m n= .
abdomen(nn) . @' b . d & . m n= .
abdominal(jj) . & b . d A:' . m & . n l= .
abdominal(jj) . @ b . d A:' . m & . n l= .
abdominal_epilepsy() . @ b . d A:' . m & . n l= # E' . ph & . l E, p . s i .
abdominal_hernia() . @ b . d A:' . m & . n l= # h 3r' 9r . n i . & .
abdominally() . @ b . d A:' . m Ix . n & . l i .
abdominals(nns) . @, b . d A:, . m I, . n l= z .
abdominous() . @ b . d A:' . m & . n & s .
abdon(nnp_surname_0.000) . @' b . d A n .
abdou_diouf() . A b . d u # d i . u:' f .
abduce() . @ b . d u:' s .
abducens() . @ b . d u:' . s E n z .
abducens_nerve() . @ b . d u:' . s E n z # n &r 9r v .
abducent() . @ b . d u:' . s n= t .
abducent_nerve() . @ b . d u:' . s n= t # n &r 9r v .
abducentes() . @, b . d U . s E' n . th i z .
abduct(vb) . @ b . d ^' k t .
abducted(+abduct+ed,nn,vbd,vbn) . & b . d ^' k . th Ix d .
abducted(+abduct+ed,nn,vbd,vbn) . @ b . d ^' k . th Ix d .
abductee(+abduct+ee,nn) . @ b . d ^, k . th i:' .
abductees(+abduct+ee+s,nns) . @ b . d ^, k . th i:' z .
abducting(+abduct+ing,vbg) . & b . d ^' k . th Ix N .
abducting(+abduct+ing,vbg) . @ b . d ^' k . th Ix N .
abduction(+abduct+ion,nn) . & b . d ^' k . S n= .
abduction(+abduct+ion,nn) . @ b . d ^' k . S n= .
abductions(+abduct+ion+s,nns) . & b . d ^' k . S n= z .
abductions(+abduct+ion+s,nns) . @ b . d ^' k . S n= z .
abductor(+abduct+or,nn) . & b . d ^' k . th &r .
abductor(+abduct+or,nn) . @ b . d ^' k . th & 9r .
abductor(+abduct+or,nn) . @ b . d ^' k . th &r .
abductors(+abduct+or+s,nns) . & b . d ^' k . th &r z .
abductors(+abduct+or+s,nns) . @ b . d ^' k . th &r z .
abducts(+abduct+s,vbz) . @ b . d ^' k t s .
abdul(nnp_boyname_0.007,nnp_surname_0.001) . @ b . d u:' l .
abdul-aziz() . A b . d U' . l A . z i:' z .
abdul-hamid() . A:, b . d U l . h A . m i:' d .
abdul-mejid() . A:, b . d U l . m E . dZ i:' d .
abdul_jaffar_khan() . A:' b . d u l # dZ A:' . f A 9r # kh A n .
abdul_khaalis() . A:' b . d u l # k h A:' . l i s .
abdul_rahman_hourieh() . @' b h . d u l # 9r A . m A:' n # h u . 9r i:' . j E .
abdulaziz(nnp_surname_0.000) . @ b . d u:, . l & . z i:' z .
abdulla(nnp_surname_0.000) . A b . d u:' . l & .
abdullah(nnp_boyname_0.000,nnp_surname_0.002) . @, b . d ^' . l & .
abdullah_al-sallal() . @ b . d ^' . l A # @ l . s A . l A:' l .
abe(nnp_boyname_0.006,nnp_surname_0.001) . ei b .
abe(nnp_boyname_0.006,nnp_surname_0.001) . ei' b .
abeam() . & . b i:' m .
abebe_mekonnen() . ^' . b ei . b ei # m E' . kh oU . n E n .
abecedarian() . ei, . b i . s i . d E' . 9r i . n= .
abecedarium() . ei, . b i . s i . d E' . 9r i . & m .
abecedary() . ei, . b i . s i:' . d_( & . 9r i .
abed(jj,nnp_surname_0.000) . & . b E' d .
abedi(nnp_surname_0.000) . & . b E' . d i .
abednego() . ^' . b E d . n & . g oU, .
abee(nnp_surname_0.000) . & . b i:' .
abeid_karume() . A . b ei' d # kh A . 9r u:' . m ei .
abel(nnp,nnp_boyname_0.019,nnp_surname_0.007) . ei' . b l= .
abel-meholah() . ei, . b l= . m Ix . h oU' . l & .
abela(nnp_surname_0.000) . A . b E' . l & .
abelard(nnp_boyname_0.000) . @' . b & . l A:, 9r d .
abelard(nnp_boyname_0.000) . @' . b Ix . l &r d .
abele(nnp_surname_0.000) . & . b i:' l .
abeles(nnp_surname_0.000) . & . b i:' l z .
abeles(nnp_surname_0.000) . ei' . b & . l i:, z .
abelian() . & . b i:' . l i . n= .
abell(nnp_surname_0.003) . ei' . b l= .
abella(nnp_surname_0.000) . & . b E' . l & .
abelmosk() . ei' . b l= . m A:, s k .
abeln(nnp_surname_0.000) . @' . b Ix l n .
abelow() . @' . b & . l oU .
abels(nnp_surname_0.001) . ei' . b l= z .
abelson(nnp_surname_0.000) . @' . b Ix l . s n= .
abend(nnp_surname_0.000) . & . b E' n d .
abend(nnp_surname_0.000) . @' . b E n d .
abendroth(nnp_surname_0.000) . @' . b Ix n . d 9r > T .
abenezra() . A:, . b & . n E' . z 9r & .
abeokuta(nnp_city) . A:' . b ei . oU' . kh U . th A .
aber(nnp_surname_0.000) . ei' . b &r .
abercrombie(nnp_surname_0.002) . @' . b & 9r . kh 9r A:, m . b i .
abercrombie(nnp_surname_0.002) . @, . b &r k . 9r A:' m . b i .
aberdare() . @' . b & 9r . d E, 9r .
aberdeen(nnp,nnp_city) . @' . b & 9r . d i:, n .
aberdeen(nnp,nnp_city) . @' . b &r . d i:, n .
aberdeen_angus() . @, . b & . d i n # @' N . & s .
aberdeen_terrier() . @' . b & 9r . d i:, n # th E' . 9r i . & 9r .
aberdeenshire() . @, . b & 9r . d i:' n . S i 9r .
aberdonian() . @, . b & 9r . d oU' . n i . n= .
aberfan() . @' . b &r 9r . v @ n .
aberford(nnp_city) . ei' . b &r . f &r d .
aberg() . @' . b &r g .
aberglaube() . A:' . b & 9r . g l aU, . b & .
aberle(nnp_surname_0.000) . @' . b &r l .
aberle(nnp_surname_0.000) . @' . b &r . l= .
abermin() . @' . b &r . m Ix n .
abernathy(nnp_surname_0.007) . @' . b &r . n @, . T i .
abernethy(nnp_surname_0.001) . @' . b &r . n E, . T i .
aberrant(jj) . & . b E' . 9r n= t .
aberrant(jj) . @ . b E' . 9r n= t .
aberrant_duct() . & . b E' . 9r n= t # d & k t .
aberration(+aberrate+ion,nn) . @, . b & . 9r ei' . S n= .
aberration(+aberrate+ion,nn) . @, . b &r . ei' . S n= .
aberration_constant() . @, . b & . 9r ei' . S n= # kh A:' n s . th n= t .
aberrational(+aberrate+ion+al,jj) . @, . b &r . ei' . S & . n l= .
aberrations(+aberrate+ion+s,nns) . @, . b &r . ei' . S n= z .
abert() . @' . b &r t .
aberystwyth() . @ . b &r 9r . I' s s . th w Ix T .
abesse() . A b . E' s . s E .
abessive() . @ . b E' . s Ix v .
abet(vb) . & . b E' t .
abetted(+abet+ed,vbd,vbn) . & . b E' . t_( Ix d .
abetter() . & . b E' . t_( & 9r .
abetting(+abet+ing,vbg) . & . b E' . t_( Ix N .
abettor() . & . b E' . t_( & 9r .
abex() . ei' . b E k s .
abeyance(nn) . & . b ei' . n= s .
abeyant() . & . b ei' . n= t .
abeyta(nnp_surname_0.002) . A . b ei' . t_( & .
abfarad() . @ b . f @' . 9r @ d .
abgatha() . @' b . g & . T & .
abhenry() . @ b . h E' n . 9r i .
abhominable() . @ b . h A:' . m & . n & . b l= .
abhor(vb) . @ b . h >' 9r .
abhor(vb) . @ b . h A:' 9r .
abhorred(+abhor+ed,vbd,vbn) . & b . h >' 9r d .
abhorrence(+abhor+ence,nn) . & b . h >' . 9r n= s .
abhorrence(+abhor+ence,nn) . @ b . h A:' . 9r n= s .
abhorrent(+abhor+ent,jj) . @ b . h >' . 9r n= t .
abhorrent(+abhor+ent,jj) . @ b . h A:' . 9r n= t .
abhorrently() . @ b . h A:' . 9r n= t . l i .
abhors(+abhor+s,vbz) . & b . h >' 9r z .
abia() . @' . b i . & .
abiathar() . & . b aI' . & . T & 9r .
abib() . ei' . b Ix b .
abid() . ei' . b Ix d .
abidance() . & . b aI' . d n= s .
abide(nnp_surname_0.000,vb) . & . b aI' d .
abide_with() . & . b aI' d # w Ix T .
abided(+abide+ed,vbd,vbn) . & . b aI' . d_( Ix d .
abides(+abide+s,vbz) . & . b aI' d z .
abiding(+abide+ing,vbg) . & . b aI' . d_( Ix N .
abiding_place() . & . b aI' . d_( Ix N # ph l ei s .
abidingly() . & . b aI' . d_( Ix N . l i .
abidingness() . & . b aI' . d_( Ix N . n E s .
abidjan(nnp_city) . A . b i . dZ A:' n .
abie(nnp) . @' . b i .
abie(nnp) . ei' . b i .
abient() . @' . b i . n= t .
abietate() . @' . b i . Ix . th ei, t .
abigail(nnp_girlname_0.025) . @' . b & . g ei, l .
abihu() . & . b aI' h . j u .
abila(nnp_surname_0.000) . A . b i:' . l & .
abilene(nnp_city) . @' . b & . l i:, n .
abilene(nnp_city) . @' . b Ix . l i:, n .
abilities(+ability+s,nns) . & . b I' . l & . th i z .
ability(nn) . & . b I' . l & . th i .
ability(nn) . & . b I' . l Ix . th i .
abilyne() . @' . b & . l Ix n .
abimelech() . & . b I' . m & . l E, k .
abineri() . A:' . b & . n E' . 9r i .
abingdon() . @' . b Ix N . d n= .
abinger() . @' . b n= . dZ & 9r .
abington(nnp_surname_0.000) . @' . b Ix N . th n= .
abinoam() . & . b I' . n oU . & m .
abinoem() . & . b I' . n oU . E, m .
abio() . A:' . b i . oU .
abiogenesis() . ei, . b aI . oU . dZ E' . n Ix . s Ix s .
abiogenetic() . ei, . b aI . oU . dZ & . n E, . t_( Ix k .
abiogenist() . ei, . b aI' . A . dZ & . n Ix s t .
abiola() . A:, . b i . oU' . l & .
abiola's(pos) . A:, . b i . oU' . l & z .
abiomed() . ei . b i:' . & . m E d .
abiosis() . ei, . b aI . oU' . s Ix s .
abiotic() . ei, . b aI . A:' . t_( Ix k .
abiotrophic() . @' . b i . & . th 9r A:' . f Ix k .
abiotrophy() . @, . b i . A:' . th 9r & . f i .
abirritant() . @ b . I' . 9r Ix . th n= t .
abirritate() . @ b . I' . 9r Ix . th ei, t .
abisag() . @' . b Ix . s @, g .
abishag() . @' . b & . S @, g .
abitibi() . @, . b Ix . th i:' . b i .
abitz() . @' . b Ix t s .
abiu() . & . b aI' . j u .
abject(jj) . @' b . dZ E k t .
abject_apology() . @' b . dZ E k t # & . ph A:' . l & . dZ i .
abject_defeat() . @' b . dZ E k t # d Ix . f i:' t .
abject_fear() . @' b . dZ E k t # f i 9r .
abjection() . & b . dZ E' k . S n= .
abjective() . @ b . dZ E' k . th Ix v .
abjectly() . @ b . dZ E' k t . l i .
abjunction() . @ b . dZ ^' N k . S n= .
abjuration() . @, b . dZ U . 9r ei' . S n= .
abjure() . @ b . dZ U' 9r .
abkhazia(nnp_country) . @ b . kh @' z . j & .
abkhazia(nnp_country) . @ b . kh A:' z . j & .
abkhazia(nnp_country) . A b . kh A:' . s i . A:, .
abkhazian(jj,nn) . @ b . kh @' . z i . n= .
abkhazian(jj,nn) . @ b . kh @' z . j n= .
abkhazian(jj,nn) . @ b . kh A:' . z i . n= .
abkhazian(jj,nn) . @ b . kh A:' z . j n= .
abkhazians(nns) . @ b . kh @' . z i . n= z .
abkhazians(nns) . @ b . kh A:' . z i . n= z .
ablactate() . @ b . l @' k . th ei t .
ablate() . @ . b l ei' t .
ablation() . @ b . l ei' . S n= .
ablatival() . @, . b l & . th aI' . v l= .
ablative() . @ b . l ei' . t_( Ix v .
ablative_absolute() . @ b . l ei' . t_( Ix v # @' b . s & . l u:, t .
ablaut() . A:' . b l aU t .
ablaze(jj) . & b . l ei' z .
able(jj,nnp,nnp_surname_0.001) . ei' . b l= .
able-bodied(+able+body+ed,jj) . ei' . b l= . b A:' . d i d .
able-bodied(+able+body+ed,jj) . ei, . b l= . b A:, . d i:, d .
abled(+able+ed,jj) . ei' . b l= d .
ablegate() . @' . b l & . g ei, t .
ablepharous() . ei . b l E' . f & . 9r & s .
ablepsia() . & . b l E' p . s i . & .
ableptical() . & . b l E' p . th Ix . kh l= .
abler(+able+er,jjr,nnp_surname_0.000) . ei' . b & . l &r .
abler(+able+er,jjr,nnp_surname_0.000) . ei' b . l &r .
ables(nnp_surname_0.002) . ei' . b l= z .
ablest(+able+est,jjs) . ei' b . l & s t .
ablest(+able+est,jjs) . ei' . b l= s t .
ablins() . ei' . b l Ix n z .
ablock() . & . b l A:' k .
abloom(jj) . & b . l u:' m .
abluent() . @' . b l u . n= t .
ablush() . & . b l ^' S .
ablution() . @ b . l u:' . S n= .
ablution_room() . @ b . l u:' . S n= # 9r u m .
ably(rb) . ei' b . l i .
abmho() . @' b . m oU .
abmodality() . @, b . m oU . d @' . l Ix . th i .
abnaki() . @ b . n A:' . kh i .
abnegate() . @' b . n & . g ei, t .
abnegation() . @, b . n Ix . g ei' . S n= .
abner(nnp_boyname_0.000,nnp_surname_0.003) . @' b . n & 9r .
abner(nnp_boyname_0.000,nnp_surname_0.003) . @' b . n &r .
abney(nnp,nnp_surname_0.005) . @' b . n i .
abnormal(jj) . @ b . n >' 9r . m l= .
abnormal(jj) . @ b . n A:' 9r . m l= .
abnormal_psychology() . @ b . n A:' 9r . m l= # s aI . kh A:' . l & . dZ i .
abnormalcy() . @ b . n A:' 9r . m l= . s i .
abnormalise() . @ b . n A:' 9r . m & . l aI, z .
abnormalities(+abnormal+ity+s,nns) . @, b . n > 9r . m @' . l & . th i z .
abnormality(+abnormal+ity,nn) . @, b . n > 9r . m @' . l & . th i .
abnormality(+abnormal+ity,nn) . @, b . n A 9r . m @' . l Ix . th i .
abnormalize() . @ b . n A:' 9r . m & . l aI, z .
abnormally(+abnormal+ly,rb) . @ b . n >' 9r . m & . l i .
abnormally(+abnormal+ly,rb) . @ b . n A:' 9r . m l= . l i .
abnormity() . @ b . n A:' 9r . m Ix . th i .
abo(nnp_surname_0.000) . @' . b oU .
abo(nnp_surname_0.000) . A:' . b oU .
abo(nnp_surname_0.000) . A:' . b u .
abo's(nnp_surname_0.000,pos) . A:' . b oU z .
aboard(in,rb,rp) . & . b >' 9r d .
aboard(in,rb,rp) . & . b oU' 9r d .
aboardage() . & . b oU' 9r . d Ix dZ .
abode(nn,vbd,vbn) . & . b oU' d .
abohm() . @ b . oU' m .
abolhassan_bani-sadr() . A . b U l . h A:' . s A n # b A:' . n i # s A:' . d_( &r 9r .
abolish(vb) . & . b A:' . l Ix S .
abolished(+abolish+ed,vbd,vbn) . & . b A:' . l Ix S t .
abolishes(+abolish+s,vbz) . & . b A:' . l Ix . S Ix z .
abolishing(+abolish+ing,vbg) . & . b A:' . l Ix . S Ix N .
abolition(nn) . @, . b & . l I' . S n= .
abolitionise() . @, . b & . l I' . S & . n aI, z .
abolitionism(+abolition+ism,nn) . @, . b & . l I' . S & . n I, . z & m .
abolitionist(+abolition+ist,nn) . @, . b & . l I' . S & . n & s t .
abolitionist(+abolition+ist,nn) . @, . b & . l I' . S & . n Ix s t .
abolitionists(+abolition+ist+s,nns) . @, . b & . l I' . S & . n & s .
abolitionists(+abolition+ist+s,nns) . @, . b & . l I' . S & . n & s s .
abolitionists(+abolition+ist+s,nns) . @, . b & . l I' . S & . n & s t s .
abolitionize() . @, . b & . l I' . S & . n aI, z .
abolla() . & . b A:' . l & .
abollae() . & . b A:' . l i .
abomasum() . @, . b & . m ei' . s & m .
abomasus() . @, . b & . m ei' . s & s .
abominable(jj) . & . b A:' . m & . n & . b l= .
abominableness() . & . b A:' . m & . n & . b l= . n E s .
abominate() . & . b A:' . m & . n ei, t .
abomination(+abominate+ion,nn) . & . b A:, . m & . n ei' . S n= .
abood(nnp_surname_0.000) . & . b u:' d .
aboodi() . & . b u:' . d i .
aboon() . & . b u:' n .
aborad() . @ b . oU' . 9r @ d .
aboral() . @ b . oU' . 9r l= .
aboriginal(+aborigine+al,jj) . @, . b & . 9r I' . dZ & . n l= .
aboriginal(+aborigine+al,jj) . @, . b &r . I' . dZ & . n l= .
aboriginally() . @, . b & . 9r I' . dZ & . n l= . l i .
aborigine(nn) . @, . b & . 9r I' . dZ & . n i .
aborigine(nn) . @, . b &r . I' . dZ & . n i .
aborigines(+aborigine+s,nns) . @, . b &r . I' . dZ & . n i z .
aborn(jj) . & . b >' 9r n .
aborning() . & . b A:' 9r . n Ix N .
abort(vb) . & . b >' 9r t .
abort(vb) . & . b A:' 9r t .
aborted(+abort+ed,jj,vbd,vbn) . & . b >' 9r . th Ix d .
aborticide() . & . b A:' 9r . th Ix . s aI, d .
abortifacient(+abort+faci+ent,nn) . & . b >, 9r . th & . f ei' . S n= t .
abortifacient(+abort+faci+ent,nn) . & . b A:, 9r . th & . f ei' . S n= t .
abortifacients(+abort+faci+ent+s,nns) . & . b >, 9r . th & . f ei' . S n= t s .
aborting(+abort+ing,vbg) . & . b >' 9r . th Ix N .
abortion(+abort+ion,nn,nnp) . & . b >' 9r . S n= .
abortion(+abort+ion,nn,nnp) . & . b A:' 9r . S n= .
abortion's(+abort+ion,nn,nnp,pos) . & . b oU, 9r . S I, n z .
abortionist(+abort+ion+ist,nn) . & . b >' 9r . S & . n Ix s t .
abortionist(+abort+ion+ist,nn) . & . b A:' 9r . S & . n Ix s t .
abortionists(+abort+ion+ist+s,nns) . & . b >' 9r . S & . n Ix s .
abortionists(+abort+ion+ist+s,nns) . & . b >' 9r . S & . n Ix s s .
abortionists(+abort+ion+ist+s,nns) . & . b >' 9r . S & . n Ix s t s .
abortions(+abort+ion+s,nns) . & . b >' 9r . S n= z .
abortive(+abort+ive,jj) . & . b >' 9r . th Ix v .
abortive(+abort+ive,jj) . & . b A:' 9r . th Ix v .
abortive_attempt() . & . b A:' 9r . th Ix v # & . th E' m p t .
abortively() . & . b A:' 9r . th Ix . v l i .
abortus() . & . b A:' 9r . th & s .
abott(fw_misspelling:abbott) . & . b A:' t .
abou() . & . b u:' .
abou[t]-(in,jj,rb,rbr,rp) . & . b aU, .
aboud(nnp_surname_0.000) . A . b u:' d .
aboudikro() . A:, . b u . d i:' . kh 9r oU .
abought() . & . b A:' t .
abouhalima() . A:, . b u . h A . l i:' . m & .
abouhalima's(pos) . A:, . b u . h A . l i:' . m & z .
aboukir() . A . b u . kh i:' 9r .
aboulia() . & . b u:' . l i . & .
abound(vb,vbp) . & . b aU' n d .
abound_with() . & . b aU' n d # w Ix T .
abounded(+abound+ed,vbd,vbn) . & . b aU' n . d Ix d .
abounding(+abound+ing,vbg) . & . b aU' n . d Ix N .
abounds(+abound+s,vbz) . & . b aU' n d z .
abourezk() . A:' . b u . 9r E s k .
about(in,jj,rb,rbr,rp) . & . b aU' t .
about(in,jj,rb,rbr,rp) . b aU, t .
about's(in,jj,pos,rb,rbr,rp) . & . b aU' t s .
about-face() . & . b aU' t # f ei s .
about-face() . & . b aU' t . f ei, s n .
about-face() . & . b aU, t . f ei' s v .
about-facing() . & . b aU' t # f ei' . s Ix N .
about-ship() . & . b aU' t # S Ix p .
about-sledge() . & . b aU' t # s l E dZ .
about-turn() . & . b aU' t # th &r 9r n .
about_face() . & . b aU' t # f ei s .
about_ship() . & . b aU' t # S Ix p .
about_turn() . & . b aU' t # th &r 9r n .
abouts(+about+s,nns) . & . b aU, t s .
above(in,jj,rb,rp) . & . b ^' v .
above's(in,jj,pos,rb,rp) . & . b ^' v z .
above-found() . & . b ^' v # f aU n d .
above-given() . & . b ^' v # g I' . v n= .
above-said() . & . b ^' v # s A:' . Ix d .
above-water() . & . b ^' v # w A:' . t_( & 9r .
above-written() . & . b ^' v # 9r I' . th n= .
above_all() . & . b ^' v # A l .
above_suspicion() . & . b ^' v # s & . s ph I' . S n= .
above_water() . & . b ^' v # w A:' . t_( & 9r .
aboveboard(jj,rb) . & . b ^' v . b >, 9r d .
aboveboard(jj,rb) . & . b ^' v . b oU, 9r d .
aboveground() . & . b ^' v . g 9r aU, n d .
abox() . & . b A:' k s .
abplanalp(nnp_surname_0.000) . @' b . ph l & . n @ l p .
abplanalp(nnp_surname_0.000) . @' b . ph l A . n @ l p .
abqaiq() . A b . kh aI' k .
abra(uh) . A:' b . 9r & .
abracadabra(uh) . @, b . 9r & . kh & . d @' b . 9r & .
abradant() . & . b 9r ei' . d n= t .
abrade() . & . b 9r ei' d .
abraham(nnp,nnp_boyname_0.035,nnp_surname_0.008) . ei' b . 9r & . h @, m .
abraham-man() . ei' . b 9r & . h @, m # m A n .
abrahamian(nnp_surname_0.000) . @, b . 9r & . h ei' . m i . n= .
abrahams(nnp,nnp_surname_0.001) . ei' b . 9r & . h @, m z .
abrahamsen(nnp_surname_0.000) . @ b . 9r & . h @' m . s n= .
abrahamson(nnp_surname_0.001) . & b . 9r @' . h & m . s n= .
abram(nnp_boyname_0.005,nnp_surname_0.002) . & b . 9r @' m .
abram(nnp_boyname_0.005,nnp_surname_0.002) . ei' . b 9r & m .
abramczyk(nnp_surname_0.000) . A:' b . 9r & m . tS Ix k .
abramo() . A b . 9r A:' . m oU .
abramovitz(nnp_surname_0.000) . & b . 9r A:' . m & . v Ix t s .
abramowicz(nnp_surname_0.000) . & b . 9r A:' . m & . v Ix tS .
abramowitz(nnp_surname_0.001) . & b . 9r A:' . m & . w Ix t s .
abramowitz(nnp_surname_0.001) . A . b 9r A:' . m oU . w Ix t s .
abrams(nnp,nnp_surname_0.009) . ei' b . 9r & m z .
abramson(nnp,nnp_surname_0.002) . ei' b . 9r & m . s n= .
abranchial() . ei . b 9r @' N . kh i . l= .
abranchiate() . ei . b 9r @' N . kh i . Ix t .
abraser() . & . b 9r ei' . s & 9r .
abrasion(nn) . & b . 9r ei' . Z n= .
abrasions(+abrasion+s,nns) . & b . 9r ei' . Z n= z .
abrasive(jj,nn) . & b . 9r ei' . s Ix v .
abrasives(nns) . & b . 9r ei' . s Ix v z .
abraxas() . & . b 9r @' k . s & s .
abraxas_stone() . & . b 9r @' k . s & s # s th oU n .
abrazo() . A . b 9r A:' . T A .
abreact() . @, . b 9r i . @' k t .
abreaction() . @, . b 9r i . @' k . S n= .
abreast(jj,nnp,rb) . & b . 9r E' s t .
abrego(nnp_surname_0.002) . A b . 9r E' . g oU .
abreu(nnp_surname_0.004) . & b . 9r u:' .
abri() . @ . b 9r i:' .
abridge(vb) . & b . 9r I' dZ .
abridged(+abridge+ed,vbd,vbn) . & b . 9r I' dZ d .
abridgement() . & . b 9r i:' dZ . m n= t .
abridgment() . & . b 9r I' dZ . m n= t .
abril(nnp_girlname_0.000,nnp_surname_0.001) . & b . 9r I' l .
abris() . @ . b 9r i:' z .
abroach() . & . b 9r oU' tS .
abroad(jj,rb) . & b . 9r >' d .
abroad(jj,rb) . & . b 9r A:' d .
abrogable() . @' . b 9r & . g & . b l= .
abrogate(vb) . @' b . 9r & . g ei, t .
abrogated(+abrogate+ed,vbd,vbn) . @' b . 9r & . g ei, . t_( Ix d .
abrogating(+abrogate+ing,vbg) . @' b . 9r & . g ei, . t_( Ix N .
abrogation(+abrogate+ion,nn) . @, b . 9r & . g ei' . S n= .
abron(nnp_surname_0.001) . & b . 9r A:' n .
abrupt(jj) . & b . 9r ^' p t .
abruption() . & . b 9r ^' p . S n= .
abruptly(+abrupt+ly,rb) . & b . 9r ^' p t . l i .
abruptness(+abrupt+ness,nn) . & b . 9r ^' p t . n & s .
abrutyn() . ei' b . 9r u . th Ix n .
abruzzese(nnp_surname_0.000) . A b . 9r u t . s ei' . z i .
abruzzi() . A . b 9r u:' t . t s i .
abruzzo(nnp_surname_0.000) . A b . 9r u:' . z oU .
abs(nnp_organization) . ei' . b i:' . E' s .
abs(nns) . @' b z .
abs[olutely]-(+absolute+ly,rb) . @, b s .
absalom(nnp_boyname_0.000) . @' b . s & . l & m .
abscam(nnp_organization) . @' b . s kh @ m .
abscess(nn) . @' b . s E s .
abscess(nn) . @' b . s E, s .
abscind() . @ b . s I' n d .
abscise() . @ b . s aI' z .
abscissa() . @ b . s I' . s & .
abscission() . @ b . s I' . Z n= .
abscission_layer() . @ b . s I' . Z n= # l ei' . & 9r .
abscond() . @ b . s kh A:' n d .
abscound() . @ b . s kh A:' n d .
absecon() . @ b . s i:' . kh n= .
abseil() . A:' p . z aI l .
absence(nn) . @' b . s n= s .
absence_flag() . @' b . s n= s # f l @ g .
absence_state() . @' b . s n= s # s th ei t .
absences(+absence+s,nns) . @' b . s n= . s Ix z .
absent(jj) . @ b . s E' n t v .
absent(jj) . @' b . s n= t .
absent(vb) . & b . s E' n t .
absent-minded() . @' b . s n= t . m aI' n . d Ix d .
absentation() . @, b . s n= . th ei' . S n= .
absente_reo() . @ b . s E' n . th i # 9r i:' . oU .
absentee(+absent+ee,nn) . @, b . s n= . th i:' .
absentee_ballot() . @, b . s n= . th i:' # b @' . l & t .
absentee_landlord() . @, b . s n= . th i:' # l @' n d . l A:, 9r d .
absentee_vote() . @, b . s n= . th i:' # v oU t .
absentee_voter() . @, b . s n= . th i:' # v oU' . t_( & 9r .
absenteeism(+absent+ee+ism,nn) . @, b . s n= . th i:' . Ix . z & m .
absentees(+absent+ee+s,nns) . @, b . s n= . th i:' z .
absentia(fw) . @ b . s E' n . S & .
absentia(fw) . @' b . s n= . th i . @ .
absently() . @' b . s n= t . l i .
absentminded() . @, b . s n= t . m aI' n . d & d .
absher(nnp_surname_0.001) . @' b . S &r .
abshier(nnp_surname_0.000) . @' b . S i . &r .
abshire(nnp_surname_0.001) . @' b . S aI 9r .
abshire(nnp_surname_0.001) . @' b . S aI, 9r .
absinth() . @' b . s Ix n T .
absinthe() . @' b . s Ix n T .
absinthe_green() . @' b . s Ix n T # g 9r i n .
absinthe_oil() . @' b . s Ix n T # >i l .
absinthism() . @' b . s Ix n . T I, . z & m .
absit_omen() . A:' b . s Ix t # oU' . m E n .
abso() . @' b . s oU .
abso[lutely]-(+absolute+ly,rb) . @, b . s & .
absol[utely]-(+absolute+ly,rb) . @, b . s l= .
absolom(nnp_boyname_0.000) . @' b . s & . l & m .
absolu[tely]-(+absolute+ly,rb) . @, b . s & . l u:, .
absolut(nnp_product) . @, b . s & . l u:' t .
absolut[ely]-(+absolute+ly,rb) . @, b . s & . l u:, t .
absolute(jj,nn) . @' b . s & . l u:, t .
absolute[ly]-(+absolute+ly,rb) . @, b . s & . l u:, t .
absolute_alcohol() . @' b . s & . l u:, t # @' l . kh & . h A:, l .
absolute_altimeter() . @' b . s & . l u:, t # @ l . th I' . m Ix . th & 9r .
absolute_altitude() . @' b . s & . l u:, t # @' l . th Ix . th u:, d .
absolute_ceiling() . @' b . s & . l u:, t # s i:' . l Ix N .
absolute_contradiction() . @' b . s & . l u:, t # kh A:, n . th 9r & . d I' k . S n= .
absolute_ego() . @' b . s & . l u:, t # i:' . g oU .
absolute_fact() . @' b . s & . l u:, t # f @ k t .
absolute_idea() . @' b . s & . l u:, t # aI . d i:' . & .
absolute_impediment() . @' b . s & . l u:, t # Ix m . ph E' . d_( & . m n= t .
absolute_indication() . @' b . s & . l u:, t # I, n . d & . kh ei' . S n= .
absolute_interest() . @' b . s & . l u:, t # I' n . th & . 9r Ix s t .
absolute_likeness() . @' b . s & . l u:, t # l aI' k . n Ix s .
absolute_magnitude() . @' b . s & . l u:, t # m @' g . n Ix . th u:, d .
absolute_majority() . @' b . s & . l u:, t # m & . dZ A:' . 9r Ix . th i .
absolute_master() . @' b . s & . l u:, t # m @' s . th & 9r .
absolute_monarch() . @' b . s & . l u:, t # m A:' . n & 9r k .
absolute_monarchy() . @' b . s & . l u:, t # m A:' . n & 9r . kh i .
absolute_music() . @' b . s & . l u:, t # m j u:' . z Ix k .
absolute_pitch() . @' b . s & . l u:, t # ph Ix tS .
absolute_power() . @' b . s & . l u:, t # ph aU' . & 9r .
absolute_realism() . @' b . s & . l u:, t # 9r i:' . & . l I, . z & m .
absolute_scale() . @' b . s & . l u:, t # s kh ei l .
absolute_spirit() . @' b . s & . l u:, t # s ph I' . 9r Ix t .
absolute_temperature() . @' b . s & . l u:, t # th E' m . ph & . 9r & . tS & 9r .
absolute_value() . @' b . s & . l u:, t # v @' l . j u .
absolute_veto() . @' b . s & . l u:, t # v i:' . th oU .
absolute_zero() . @' b . s & . l u:, t # z i:' . 9r oU .
absolutely(+absolute+ly,rb) . @, b . s & . l u:' t . l i .
absolutely_right() . @, b . s & . l u:' t . l i # 9r aI t .
absoluteness(+absolute+ness,nn) . @' b . s & . l u:, t . n & s .
absolutes(+absolute+s,nns) . @' b . s & . l u:, t s .
absolution(nn) . @, b . s & . l u:' . S n= .
absolutism(+absolute+ism,nn) . @' b . s & . l u . th I, . z & m .
absolutism(+absolute+ism,nn) . @' b . s & . l u:, . th I, . z & m .
absolutist(+absolute+ist,nn) . @ b . s Ix . l u:' . t_( Ix s t .
absolutory() . @ b . s A:' l . j & . th oU, . 9r i .
absolve(vb) . & b . z A:' l v .
absolve(vb) . @ b . z A:' l v .
absolved(+absolve+ed,vbd,vbn) . & b . z A:' l v d .
absolved(+absolve+ed,vbd,vbn) . @ b . z A:' l v d .
absolves(+absolve+s,vbz) . & b . z A:' l v z .
absolves(+absolve+s,vbz) . @ b . z A:' l v z .
absolving(+absolve+ing,vbg) . & b . z A:' l . v Ix N .
absolving(+absolve+ing,vbg) . @ b . z A:' l . v Ix N .
absonant() . @' b . s & . n n= t .
absorb(vb,vbp) . & b . z >' 9r b .
absorb(vb,vbp) . @ b . s A:' 9r b .
absorbance() . @ b . s A:' 9r . b n= s .
absorbed(+absorb+ed,vbd,vbn) . & b . z >' 9r b d .
absorbed(+absorb+ed,vbd,vbn) . @ b . s A:' 9r b d .
absorbedly() . @ b . s A:' 9r . b Ix d . l i .
absorbedness() . @ b . s A:' 9r b d . n E s .
absorbefacient() . @ b . s A:, 9r . b & . f ei' . S n= t .
absorbency(+absorb+ency,nn) . & b . z >' 9r . b n= . s i .
absorbent(+absorb+ent,jj) . & b . z >' 9r . b n= t .
absorbent(+absorb+ent,jj) . @ b . s A:' 9r . b n= t .
absorber(+absorb+er,nn) . & b . z >' 9r . b &r .
absorber(+absorb+er,nn) . @ b . s A:' 9r . b & 9r .
absorbers(+absorb+er+s,nns) . & b . z >' 9r . b &r z .
absorbing(+absorb+ing,vbg) . & b . z >' 9r . b Ix N .
absorbing(+absorb+ing,vbg) . @ b . s A:' 9r . b Ix N .
absorbs(+absorb+s,vbz) . & b . z >' 9r b z .
absorptance() . @ b . s A:' 9r p . th n= s .
absorptiometer() . @ b . s A:, 9r p . S i . A:' . m Ix . th & 9r .
absorptiometric() . @ b . s A:' 9r p . S i . & . m E' # th 9r Ix k .
absorption(nn) . & b . s >' 9r p . S n= .
absorption(nn) . & b . z >' 9r p . S n= .
absorption(nn) . @ b . s A:' 9r p . S n= .
absorption_band() . @ b . s A:' 9r p . S n= # b @ n d .
absorption_circuit() . @ b . s A:' 9r p . S n= # s 3r' 9r . kh Ix t .
absorption_coefficient() . @ b . s A:' 9r p . S n= # kh oU, . & . f I' . S n= t .
absorption_current() . @ b . s A:' 9r p . S n= # kh 3r' . 9r n= t .
absorption_discontinuity() . @ b . s A:' 9r p . S n= # d I, s . kh A n . th n=' . u . Ix . th i .
absorption_dynamometer() . @ b . s A:' 9r p . S n= # d aI, . n & . m A:' . m Ix . th & 9r .
absorption_edge() . @ b . s A:' 9r p . S n= # E dZ .
absorption_factor() . @ b . s A:' 9r p . S n= # f @' k . th & 9r .
absorption_limit() . @ b . s A:' 9r p . S n= # l I' . m Ix t .
absorption_pipette() . @ b . s A:' 9r p . S n= # ph aI . ph E' t .
absorption_screen() . @ b . s A:' 9r p . S n= # s k 9r i n .
absorption_spectrum() . @ b . s A:' 9r p . S n= # s ph E' k . th 9r & m .
absorption_system() . @ b . s A:' 9r p . S n= # s I' s . th & m .
absorptivity() . @' b . s A 9r p . th I' . v Ix . th i .
abstain(vb) . & b . s th ei' n .
abstain(vb) . @ b . s th ei' n .
abstain_from() . @ b . s th ei' n # f 9r & m .
abstained(+abstain+ed,vbd,vbn) . & b . s th ei' n d .
abstained(+abstain+ed,vbd,vbn) . @ b . s th ei' n d .
abstaining(+abstain+ing,vbg) . & b . s th ei' . n Ix N .
abstaining(+abstain+ing,vbg) . @ b . s th ei' . n Ix N .
abstemious() . @ b . s th i:' . m i . & s .
abstemiously() . @ b . s th i:' . m i . & . s l i .
abstemiousness() . @ b . s th i:' . m i . & . s n E s .
abstention(nn) . & b . s th E' n . tS n= .
abstention(nn) . @ b . s th E' n . S n= .
abstention(nn) . @ b . s th E' n . tS n= .
abstentions(+abstention+s,nns) . & b . s th E' n . tS n= z .
abstentions(+abstention+s,nns) . @ b . s th E' n . tS n= z .
absterge() . @ b . s th 3r' 9r dZ .
abstergent() . @ b . s th 3r' 9r . dZ n= t .
abstersion() . @ b . s th 3r' 9r . S n= .
abstersive() . @ b . s th 3r' 9r . s Ix v .
abstersiveness() . @ b . s th 3r' 9r . s Ix v . n E s .
abstinence(nn) . @' b . s th & . n n= s .
abstinence_theory() . @' b s . th & . n n= s # T i:' . & . 9r i .
abstinency() . @' b s . th Ix . n n= . s i .
abstinent(jj) . @' b . s th & . n n= t .
abstinent(jj) . @' b s . th Ix . n n= t .
abston(nnp_surname_0.001) . @' b . s th n= .
abstract(jj,nn) . @ b . s t 9r @' k t v .
abstract(jj,nn) . @' b . s t 9r @ k t .
abstract(jj,nn) . @' b . s t 9r @, k t .
abstract(jj,nn) . @' b . s t 9r @, k t n .
abstract(vb) . @ b . s t 9r @' k t .
abstracted(+abstract+ed,vbd,vbn) . @ b . s t 9r @' k . th Ix d .
abstractedly() . @ b . s t 9r @' k . th Ix d . l i .
abstractedness() . @ b . s t 9r @' k . th Ix d . n E s .
abstraction(+abstract+ion,nn) . @ b . s t 9r @' k . S n= .
abstractionism() . @ b . s t 9r @' k . S & . n I, . z & m .
abstractionist() . @ b . s t 9r @' k . S & . n Ix s t .
abstractions(+abstract+ion+s,nns) . @ b . s t 9r @' k . S n= z .
abstractive() . @ b . s t 9r @' k . th Ix v .
abstractively() . @ b . s t 9r @' k . th Ix . v l i .
abstractiveness() . @ b . s t 9r @' k . th Ix v . n E s .
abstractly() . @' b . s t 9r @ k t . l i .
abstractor() . & b . s t 9r @' k . th & 9r .
abstracts(+abstract+s,nns) . @ b . s t 9r @' k t s .
abstracts(+abstract+s,nns) . @' b . s t 9r @ k t s .
abstriction() . @ b . s t 9r I' k . S n= .
abstruse(jj) . & b . s t 9r u:' s .
abstruse(jj) . @ b . s t 9r u:' s .
abstrusely() . @ b . s t 9r u:' . s l i .
abstruseness() . @ b . s t 9r u:' . s n E s .
absurd(jj) . & b . s 3r' d .
absurd(jj) . @ b . s 3r' 9r d .
absurd_idea() . @ b . s 3r' 9r d # aI . d i:' . & .
absurdist(+absurd+ist,nn) . & b . s 3r' . d_( Ix s t .
absurdities(+absurd+ity+s,nns) . & b . s 3r' . d_( & . th i z .
absurdity(+absurd+ity,nn) . & b . s 3r' . d_( & . th i .
absurdity(+absurd+ity,nn) . @ b . s 3r' 9r . d Ix . th i .
absurdly(+absurd+ly,rb) . & b . s 3r' d . l i .
absurdly(+absurd+ly,rb) . @ b . s 3r' 9r d . l i .
absurdness() . @ b . s 3r' 9r d . n E s .
absyrtus() . @ b . s 3r' 9r . th & s .
abt(nnp_surname_0.000) . @' b t .
abt(nnp_surname_0.000) . ei' . b i:' . th i:' .
abts(nnp_surname_0.000) . @' b t s .
abts(nnp_surname_0.000) . ei' . b i:' . th i:' . E' s .
abts(nnp_surname_0.000) . ei' . b i:' . th i:' z .
abu(nnp,nnp_surname_0.000) . @' . b u .
abu-bakr() . & . b u:, . b @' . kh & 9r .
abu-bekr() . & . b u:, . b E' . kh & 9r .
abu_alam() . A:' . b u # A:' . l A m .
abu_daoud() . A:' . b u # d A . u:' d .
abu_dhabi(nnp_city) . A:' . b u # d A:' . b i .
abu_egeila() . A . b u # E . g ei' . l A .
abu_iyad() . A:' . b u # i:' . j @ d .
abu_jihad() . @' . b u # dZ i . h A:' d .
abu_nidal() . A . b u:' # n i . d A:' l .
abu_rudeis() . A:' . b u # 9r oU # d ei' s .
abu_simbel() . & . b u:' # s I' m . b E l .
abucay() . A:' . b u . kh aI .
abudrahm() . & . b ^' d . 9r & m .
abukir() . A:, . b u . kh i:' 9r .
abul_abbas() . A:' . b u l # A . b A:' s .
abuladze() . @, b . j u . l @' d . z i .
abulfeda() . A:, . b U l . f ei' . d_( & .
abulia() . & . b j u:' . l i . & .
abuna() . & . b u:' . n & .
abundance(nn) . & . b ^' n . d n= s .
abundant(jj) . & . b ^' n . d n= t .
abundant_year() . & . b ^' n . d n= t # j i 9r .
abundantly(+abundant+ly,rb) . & . b ^' n . d n= t . l i .
abura() . & . b j U' . 9r & .
aburto(nnp_surname_0.000) . & . b U' 9r . th oU, .
aburto's(nnp_surname_0.000,pos) . & . b U' 9r . th oU, z .
abury() . ei' . b & . 9r i .
abusage() . & . b j u:' . s Ix dZ .
abuse(nn) . & . b j u:' s .
abuse(nn) . & . b j u:' s n .
abuse(nn) . & . b j u:' z .
abuse(nn) . & . b j u:' z v .
abuse(vb) . & . b j u:' z .
abused(+abuse+ed,jj,vbd,vbn) . & b . j u:' z d .
abuser(+abuse+er,nn) . & . b j u:' . z & 9r .
abuser(+abuse+er,nn) . & b . j u:' . z &r .
abusers(+abuse+er+s,nns) . & b . j u:' . z &r z .
abuses(+abuse+s,nns) . & . b j u:' . s Ix z .
abuses(+abuse+s,vbz) . & . b j u:' z . Ix z .
abusing(+abuse+ing,vbg) . & b . j u:' . z Ix N .
abusive(+abuse+ive,jj) . & b . j u:' . s Ix v .
abusively() . & . b j u:' . s Ix . v l i .
abusiveness() . & . b j u:' . s Ix v . n E s .
abut(vb) . & . b ^' t .
abut_upon() . & . b ^' t # & . ph A:' n .
abutilon() . & . b j u:' t . l=, . A n .
abutment() . & . b ^' t . m n= t .
abutment_arch() . & . b ^' t . m n= t # A 9r tS .
abutment_pier() . & . b ^' t . m n= t # ph i 9r .
abuts(+abut+s,vbz) . & . b ^' t s .
abuttal() . & . b ^' . th l= .
abuttals() . & . b ^' . th l= z .
abutted(+abut+ed,vbd,vbn) . & . b ^' . t_( & d .
abutter() . & . b ^' . t_( & 9r .
abutting(+abut+ing,vbg) . & . b ^' . t_( Ix N .
abutting_joint() . & . b ^' . t_( Ix N # dZ >i n t .
abuzz(jj) . & . b ^' z .
abvolt() . @ b . v oU' l t .
abwatt() . @ b . w A:' t .
aby() . & . b aI' .
abydos() . & . b aI' . d A s .
abye() . & . b aI' .
abyla() . @' . b & . l & .
abysm() . & . b I' . z & m .
abysmal(jj) . & . b I' z . m l= .
abysmally(+abysmal+ly,rb) . & . b I' z . m & . l i .
abyss(nn) . & . b I' s .
abyssal() . & . b I' . s l= .
abyssinia() . @, . b Ix . s I' . n i . & .
abzug(nnp_surname_0.000) . @' b . z U, g .
abzug(nnp_surname_0.000) . @' b . z ^, g .
ac(+abbreviation,nn,nnp_product) . ei' . s i:' .
ac-globulin() . ei' . s i:' . g l A:, . b j & . l Ix n .
ac[ross]-(in,rb,rp) . & k .
ac[tion]-(+act+ion,nn,nnp,nnp_surname_0.000) . @, k .
ac[tivities]-(+act+ive+ity+s,nnps,nns) . @, k .
ac[tivity]-(+act+ive+ity,nn,nnp) . @, k .
ac[tor]-(+act+or,nn) . @, k .
ac[tual]-(+act+ual,jj) . @, k .
ac[tually]-(+act+ual+ly,rb) . @, k .
aca() . @' . kh & .
acacallis() . & . kh & . kh @' . l Ix s .
acacia(nnp_plant) . & . kh ei' . S & .
acacia_veld() . & . kh ei' . S & # v E l t .
academe(nn) . @' . kh & . d i:, m .
academe(nn) . @, . kh & . d i:' m .
academia(nn) . @' . kh & . d i:' . m i . & .
academia(nn) . @, . kh & . d i:' . m i . & .
academic(+academe+ic,jj,nn,nnp) . @, . kh & . d E' . m Ix k .
academic_dean() . @, . kh & . d E' . m Ix k # d i n .
academic_degree() . @, . kh & . d E' . m Ix k # d Ix . g 9r i:' .
academic_discipline() . @, . kh & . d E' . m Ix k # d I' . s & . ph l Ix n .
academic_disputation() . @, . kh & . d E' . m Ix k # d I, s . ph j U . th ei' . S n= .
academic_freedom() . @, . kh & . d E' . m Ix k # f 9r i:' . d_( & m .
academic_gown() . @, . kh & . d E' . m Ix k # g aU n .
academic_hood() . @, . kh & . d E' . m Ix k # h U d .
academic_institution() . @, . kh & . d E' . m Ix k # I, n s . th Ix . th u:' . S n= .
academic_psychology() . @, . kh & . d E' . m Ix k # s aI . kh A:' . l & . dZ i .
academic_rank() . @, . kh & . d E' . m Ix k # 9r @ N k .
academic_specialty() . @, . kh & . d E' . m Ix k # s ph E' . S l= . th i .
academic_year() . @, . kh & . d E' . m Ix k # j i 9r .
academical() . @, . kh & . d E' . m Ix . kh l= .
academically(+academic+al+ly,rb) . @, . kh & . d E' . m Ix k . l i .
academically(+academic+al+ly,rb) . @, . kh & . d E' . m Ix . kh l= . l i .
academician(+academic+ian,jj,nn) . & . kh @, . d_( & . m I' . S n= .
academician(+academic+ian,jj,nn) . @, . kh & . d & . m I' . S n= .
academicians(+academic+ian+s,nns) . & . kh @, . d_( & . m I' . S n= z .
academicians(+academic+ian+s,nns) . @, . kh & . d & . m I' . S n= z .
academicism() . @, . kh & . d E' . m Ix . s I, . z & m .
academics(+academic+s,nn,nns) . @, . kh & . d E' . m Ix k s .
academies(+academy+s,nns) . & . kh @' . d_( & . m i z .
academise() . & . kh @' . d_( & . m aI, z .
academism() . & . kh @' . d_( & . m I, . z & m .
academize() . & . kh @' . d_( & . m aI, z .
academus() . @, . kh & . d i:' . m & s .
academy(nn,nnp) . & . kh @' . d_( & . m i .
academy's(+academy+'s,nn,nnp,pos) . & . kh @' . d_( & . m i z .
academy_blue() . & . kh @' . d_( & . m i # b l u .
academy_board() . & . kh @' . d_( & . m i # b oU 9r d .
academy_figure() . & . kh @' . d_( & . m i # f I' . g j & 9r .
acadia(nnp) . & . kh ei' . d i . & .
acadian() . & . kh ei' . d i . n= .
acadie() . A . kh A . d i:' .
acalculia() . ei, . kh @ l . kh j u:' . l i . & .
acaleph() . @' . kh & . l E, f .
acalephe() . @' . kh & . l i:, f .
acamas() . @' k . m & s .
acampora(nnp_surname_0.000) . & . kh @' m . ph &r . & .
acantha(nnp_plant) . A . kh A:' n . D & .
acanthaceous() . @, . kh n= . T ei' . S & s .
acanthine() . & . kh @' n . T Ix n .
acanthite() . & . kh @' n . T aI t .
acanthocarpous() . & . kh @, n . T & . kh A:' 9r . ph & s .
acanthocephalan() . & . kh @, n . T & . s E' . f & . l n= .
acanthocladous() . @, . kh n= . T A:' . kh l & . d & s .
acanthodian() . @, . kh n= . T oU' . d i . n= .
acanthoid() . & . kh @' n . T >i d .
acanthopterygian() . @, . kh n= . T A:, p . th & . 9r I' . dZ i . n= .
acanthosis() . @, . kh n= . T oU' . s Ix s .
acanthotic() . @, . kh n= . T A:' . t_( Ix k .
acanthous() . & . kh @' n . T & s .
acanthus() . & . kh @' n . T & s .
acanthus_family() . & . kh @' n . T & s # f @' . m & . l i .
acanthus_leaf() . & . kh @' n . T & s # l i f .
acapnia() . & . kh @' p . n i . & .
acappella() . A:, # kh & . ph E' . l & .
acapulco(nnp_city) . @, . kh & . ph U' l . kh oU .
acapulco_gold() . @, . kh & . ph U' l . kh oU # g oU l d .
acardia() . ei . kh A:' 9r . d i . & .
acardiac() . ei . kh A:' 9r . d i . @, k .
acariasis() . @, . kh & . 9r aI' . & . s Ix s .
acaricide() . & . kh @' . 9r Ix . s aI, d .
acarid() . @' . kh & . 9r Ix d .
acaridan() . & . kh @' . 9r Ix . d n= .
acarine() . @' . kh & . 9r aI, n .
acarnan() . & . kh A:' 9r . n n= .
acaroid() . @' . kh & . 9r >i, d .
acaroid_resin() . @' . kh & . 9r >i, d # 9r E' . z Ix n .
acarology() . @, . kh & . 9r A:' . l & . dZ i .
acarophobia() . @, . kh & . 9r & f . b i . & .
acarpelous() . ei . kh A:' 9r . ph & . l & s .
acarpous() . ei . kh A:' 9r . ph & s .
acarus() . @' . kh & . 9r & s .
acastus() . & . kh @' s . th & s .
acatalectic() . ei . kh @, t . l=' . E k . th Ix k .
acaudal() . ei . kh A:' . d l= .
acaudate() . ei . kh A:' . d ei t .
acaulescent() . @, . kh A . l E' . s n= t .
acaulous() . ei . kh A:' . l & s .
acc(+abbreviation,nnp_organization) . ei, . s i:, . s i:, .
acc[elerated]-(+accelerate+ed,jj,vbd,vbn) . @, k s .
acc[ent]-(nn,vb) . @, k s .
acc[eptable]-(+accept+able,jj) . @, k s .
acc[epted]-(+accept+ed,jj,nnp,vbd,vbn) . E, k s .
acc[ess]-(nn,vb) . @, k s .
acc[ount]-(nn,nnp,vb,vbp) . & k .
acc[ountant]-(+account+ant,nn) . & k .
acca_larentia() . @' . kh & # l & . 9r E' n . S i . & .
accad() . @' . kh @ d .
accadian() . & . kh ei' . d i . n= .
accardi(nnp_surname_0.000) . A . kh A:' 9r . d i .
accardo(nnp_surname_0.000) . A . kh A:' 9r . d oU .
acce[pted]-(+accept+ed,jj,nnp,vbd,vbn) . E, k . s E, .
accede(vb) . @ k . s i:' d .
acceded(+accede+ed,vbd,vbn) . @ k . s i:' . d_( Ix d .
accedes(+accede+s,vbz) . @ k . s i:' d z .
acceding(+accede+ing,vbg) . @ k . s i:' . d_( Ix N .
accel() . & k . s E' l .
accelerando() . @ k . s E, . l & . 9r A:' n . d oU .
accelerant(nn) . @ k . s E' . l & . 9r n= t .
accelerant(nn) . @ k . s E' . l &r . n= t .
accelerants(nns) . @ k . s E' . l &r . n= t s .
accelerate(vb,vbp) . @ k . s E' . l & . 9r ei, t .
accelerate(vb,vbp) . @ k . s E' . l &r . ei, t .
accelerated(+accelerate+ed,jj,vbd,vbn) . @ k . s E' . l &r . ei, . t_( Ix d .
accelerates(+accelerate+s,vbz) . @ k . s E' . l &r . ei, t s .
accelerating(+accelerate+ing,jj,vbg) . @ k . s E' . l &r . ei, . t_( Ix N .
acceleration(+accelerate+ion,nn) . @ k . s E, . l & . 9r ei' . S n= .
acceleration(+accelerate+ion,nn) . @, k . s E, . l &r . ei' . S n= .
acceleration_coefficient() . @ k . s E, . l & . 9r ei' . S n= # kh oU, . & . f I' . S n= t .
acceleration_note() . @ k . s E, . l & . 9r ei' . S n= # n oU t .
acceleration_principle() . @ k . s E, . l & . 9r ei' . S n= # ph 9r I' n . s & . ph l= .
accelerative() . @ k . s E' . l & . 9r ei, . t_( Ix v .
accelerator(+accelerate+or,nn) . @ k . s E' . l & . 9r ei, . t_( & 9r .
accelerator(+accelerate+or,nn) . @ k . s E' . l &r . ei, . t_( &r .
accelerator_globulin() . @ k . s E' . l & . 9r ei, . t_( & 9r # g l A:' . b j & . l Ix n .
accelerator_nerve() . @ k . s E' . l & . 9r ei, . t_( & 9r # n &r 9r v .
acceleratory() . @ k . s E' . l & . 9r & . th oU, . 9r i .
accelerometer(nn) . @ k . s E, . l & . 9r A:' . m Ix . th & 9r .
accelerometer(nn) . @ k . s E, . l &r . A:' . m & . th &r .
accelerometers(+accelerometer+s,nns) . @ k . s E, . l &r . A:' . m & . th &r z .
accent(vb) . & k . s E' n t .
accent(vb) . @ k . s E' n t v .
accent(vb) . @' k . s E n t .
accent(vb) . @' k . s E n t n .
accent(vb) . @' k . s E, n t .
accent's(+accent+'s,nn,vb,vbz) . @' k . s E, n t s .
accented(+accent+ed,vbd,vbn) . @' k . s E n . th Ix d .
accenting(+accent+ing,vbg) . @' k . s E n . th Ix N .
accentor() . @ k . s E' n . th & 9r .
accents(+accent+s,nns,vbz) . @' k . s E n t s .
accents(+accent+s,vbz) . @ k . s E' n t s .
accentuable() . @ k . s E' n . tS u . & . b l= .
accentual() . @ k . s E' n . tS u . l= .
accentually() . @ k . s E' n . tS u . l= . l i .
accentuate(vb) . @ k . s E' n . tS u . ei t .
accentuate(vb) . @ k . s E' n . tS u . ei, t .
accentuated(+accentuate+ed,vbd,vbn) . @ k . s E' n . tS & . w ei, . t_( Ix d .
accentuates(+accentuate+s,vbz) . @ k . s E' n . tS u . ei t s .
accentuating(+accentuate+ing,vbg) . @ k . s E' n . tS & . w ei, . t_( Ix N .
accentuation() . @ k . s E, n . tS u . ei' . S n= .
accentuator() . @ k . s E' n . tS u . ei, . t_( & 9r .
accep[ted]-(+accept+ed,jj,nnp,vbd,vbn) . E, k . s E, p .
accept(vb,vbp) . & k . s E' p t .
accept(vb,vbp) . @ k . s E' p t .
accept_advice() . @ k . s E' p t # @ d . v aI' s .
accept_christ() . @ k . s E' p t # kh 9r aI s t .
accept_obligation() . @ k . s E' p t # A:, . b l & . g ^' . S n= .
acceptability(+accept+ability,nn) . & k . s E, p . th & . b I' . l & . th i .
acceptability(+accept+ability,nn) . & k . s E, p . th & . b I' . l Ix . th i .
acceptable(+accept+able,jj) . & k . s E' p . th & . b l= .
acceptable(+accept+able,jj) . @ k . s E' p . th & . b l= .
acceptable_person() . @ k . s E' p . th & . b l= # ph 3r' 9r . s n= .
acceptance(+accept+ance,nn,nnp) . & k . s E' p . th n= s .
acceptance(+accept+ance,nn,nnp) . @ k . s E' p . th n= s .
acceptance_bill() . @ k . s E' p . th n= s # b Ix l .
acceptance_race() . @ k . s E' p . th n= s # 9r ei s .
acceptance_sampling() . @ k . s E' p . th n= s # s @' m . ph l Ix N .
acceptance_speech() . @ k . s E' p . th n= s # s ph i tS .
acceptances(+accept+ance+s,nnps,nns) . @ k . s E' p . th n= . s Ix z .
acceptancy() . @ k . s E' p . th n= . s i .
acceptant() . @ k . s E' p . th n= t .
acceptation() . @, k . s E p . th ei' . S n= .
accepted(+accept+ed,jj,nnp,vbd,vbn) . & k . s E' p . th & d .
accepted(+accept+ed,jj,nnp,vbd,vbn) . @ k . s E' p . th Ix d .
accepted_fact() . @ k . s E' p . th Ix d # f @ k t .
accepted_meaning() . @ k . s E' p . th Ix d # m i:' . n Ix N .
acceptedly() . @ k . s E' p . th Ix d . l i .
acceptee() . @' k . s E p . th i:' .
accepter() . @ k . s E' p . th & 9r .
accepting(+accept+ing,vbg) . & k . s E' p . th Ix N .
accepting(+accept+ing,vbg) . @ k . s E' p . th Ix N .
acceptive(+accept+ive,jj) . E, k . s E, p . th i:, v .
acceptor() . @ k . s E' p . th & 9r .
acceptor_atom() . @ k . s E' p . th & 9r # @' . t_( & m .
acceptor_impurity() . @ k . s E' p . th & 9r # Ix m . ph j U' . 9r Ix . th i .
accepts(+accept+s,vbz) . @ k . s E' p t s .
access(nn,vb) . @' k . s E s .
access(nn,vb) . @' k . s E, s .
access_road() . @' k . s E s # 9r oU d .
access_time() . @' k . s E s # th aI m .
accessary() . @ k . s E' . s & . 9r i .
accessed(+access+ed,vbd,vbn) . @' k . s E, s t .
accessibility(+access+ibility,nn) . & k . s E, . s Ix . b I' . l Ix . th i .
accessibility(+access+ibility,nn) . @, k . s E . s & . b I' . l Ix . th i .
accessible(+access+ible,jj) . @ k . s E' . s & . b l= .
accessing(+access+ing,vbg) . @' k . s E, . s Ix N .
accession(+access+ion,nn) . & k . s E' . S n= .
accession(+access+ion,nn) . @ k . s E' . S n= .
accession_book() . @ k . s E' . S n= # b U k .
accession_service() . @ k . s E' . S n= # s 3r' 9r . v Ix s .
accessorial() . @, k . s Ix . s oU' . 9r i . l= .
accessories(+accessory+s,nns) . @ k . s E' . s &r . i z .
accessorius() . @, k . s Ix . s oU' . 9r i . & s .
accessorize(+access+or+ize,vb) . @ k . s E' . s & . 9r I, z .
accessorize(+access+or+ize,vb) . @ k . s E' . s &r . aI, z .
accessorized(+access+or+ize+ed,vbd,vbn) . @ k . s E' . s &r . aI, z d .
accessors(+access+or+s,nns) . @, k . s E, . s 3r, z .
accessory(+access+ory,jj,nn) . @ k . s E' . s & . 9r i .
accessory(+access+ory,jj,nn) . @ k . s E' . s &r . i .
accessory_chromosome() . @ k . s E' . s & . 9r i # kh 9r oU' . m & . s oU, m .
accessory_nerve() . @ k . s E' . s & . 9r i # n &r 9r v .
accetta(nnp_surname_0.000) . A . tS E' . t_( & .
acci[dent]-(nn,nnp) . @, k . s I, .
acciaccatura() . A . tS A:, . kh & . th U' . 9r & .
accidence() . @' k . s Ix . d n= s .
accident(nn,nnp) . @' k . s Ix . d E, n t .
accident(nn,nnp) . @' k . s Ix . d n= t .
accident's(+accident+'s,nn) . @' k . s Ix . d n= t s .
accident-prone() . @' k . s Ix . d n= t # ph 9r oU n .
accident_boat() . @' k . s Ix . d n= t # b oU t .
accident_insurance() . @' k . s Ix . d n= t # Ix n . S U' . 9r n= s .
accident_neurosis() . @' k . s Ix . d n= t # n U . 9r oU' . s Ix s .
accident_prone() . @' k . s Ix . d n= t # ph 9r oU n .
accident_tout() . @' k . s Ix . d n= t # th aU t .
accidental(+accident+al,jj) . @, k s . Ix . d E' n . l= .
accidental(+accident+al,jj) . @, k . s Ix . d E' n . th l= .
accidental_discovery() . @, k . s Ix . d E' n . th l= # d Ix . s kh ^' . v & . 9r i .
accidentalism() . @, k . s Ix . d E' n . th l=, . Ix . z & m .
accidentally(+accident+al+ly,rb) . @, k . s & . d E' . n & . l i .
accidentally(+accident+al+ly,rb) . @, k . s & . d E' n . th & . l i .
accidentally(+accident+al+ly,rb) . @, k . s Ix . d E' n . th l= . l i .
accidently(+accident+ly,rb) . @' k . s & . d n= t . l i .
accidently(+accident+ly,rb) . @, k . s I, . d E' n t . l i:, .
accidents(+accident+s,nns) . @' k . s & . d n= t s .
accidie() . @' k . s Ix . d i .
accion() . @' . tS i . n= .
accipiter() . @ k . s I' . ph Ix . th & 9r .
accipitral() . @ k . s I' . ph Ix . th 9r l= .
accipitrine() . @ k . s I' . ph Ix . th 9r Ix n .
accius() . @' k . S i . & s .
accival() . @' . s Ix . v A:, l .
acclaim(nn,vb) . & k . l ei' m .
acclaim(nn,vb) . & . kh l ei' m .
acclaimed(+acclaim+ed,jj,vbd,vbn) . & k . l ei' m d .
acclaiming(+acclaim+ing,vbg) . & k . l ei' . m Ix N .
acclamation() . @, . kh l & . m ei' . S n= .
acclamation_medal() . @, . kh l & . m ei' . S n= # m E' . d l= .
acclamatory() . & . kh l @' . m & . th oU, . 9r i .
acclimate(vb) . & . kh l aI' . m Ix t .
acclimate(vb) . @' k . l & . m ei, t .
acclimated(+acclimate+ed,vbd,vbn) . @' k . l & . m ei, . t_( Ix d .
acclimation(+acclimate+ion,nn) . @, k . l & . m ei' . S n= .
acclimation(+acclimate+ion,nn) . @, . kh l & . m ei' . S n= .
acclimation_fever() . @, . kh l & . m ei' . S n= # f i:' . v & 9r .
acclimatise() . & . kh l aI' . m & . th aI, z .
acclimatize() . & . kh l aI' . m & . th aI, z .
acclivity() . & . kh l I' . v Ix . th i .
acclivous() . & . kh l aI' . v & s .
acco(nnp) . @' . kh oU .
acco[mplish]-(vb) . & . kh A:, .
acco[rding]-(+accord+ing,vbg) . & . kh oU, .
accola(nnp_surname_0.000) . A . kh oU' . l & .
accolade(nn) . @' . kh & . l ei, d .
accolade(nn) . @, . kh & . l ei' d .
accoladed() . @, . kh & . l ei' . d_( Ix d .
accolades(+accolade+s,nns) . @' . kh & . l ei, d z .
accolated() . @' . kh & . l ei, . t_( Ix d .
accom[plish]-(vb) . & . kh A:, m .
accomando(nnp_surname_0.000) . A . kh oU . m A:' n . d oU .
accommodate(vb,vbp) . & . kh A:' . m & . d ei, t .
accommodate_distribution() . & . kh A:' . m & . d ei, t # d I, . s t 9r & . b j u:' . S n= .
accommodate_with() . & . kh A:' . m & . d ei, t # w Ix T .
accommodated(+accommodate+ed,vbd,vbn) . & . kh A:' . m & . d ei, . t_( & d .
accommodates(+accommodate+s,vbz) . & . kh A:' . m & . d ei, t s .
accommodating(+accommodate+ing,vbg) . & . kh A:' . m & . d ei, . t_( Ix N .
accommodatingly() . & . kh A:' . m & . d ei, . t_( Ix N . l i .
accommodation(+accommodate+ion,nn) . & . kh A:, . m & . d ei' . S n= .
accommodation_acceptance() . & . kh A:, . m & . d ei' . S n= # @ k . s E' p . th n= s .
accommodation_bill() . & . kh A:, . m & . d ei' . S n= # b Ix l .
accommodation_draft() . & . kh A:, . m & . d ei' . S n= # d 9r @ f t .
accommodation_group() . & . kh A:, . m & . d ei' . S n= # g 9r u p .
accommodation_ladder() . & . kh A:, . m & . d ei' . S n= # l @' . d_( & 9r .
accommodation_line() . & . kh A:, . m & . d ei' . S n= # l aI n .
accommodation_train() . & . kh A:, . m & . d ei' . S n= # th 9r ei n .
accommodations(+accommodate+ion+s,nns) . & . kh A:, . m & . d ei' . S n= z .
accommodative(+accommodate+ive,jj) . & . kh A:' . m & . d ei, . t_( Ix v .
accommodativeness() . & . kh A:' . m & . d ei, . t_( Ix v . n E s .
accompanied(+accompany+ed,vbd,vbn) . & . kh ^' m . ph & . n i d .
accompanies(+accompany+s,vbz) . & . kh ^' m . ph & . n i z .
accompaniment(+accompany+ment,nn) . & . kh ^' m p . n Ix . m n= t .
accompaniment(+accompany+ment,nn) . & . kh ^' m p . n i . m n= t .
accompaniment(+accompany+ment,nn) . & . kh ^' m . ph & . n Ix . m n= t .
accompaniment_figure() . & . kh ^' m . ph & . n Ix . m n= t # f I' . g j & 9r .
accompaniments(+accompany+ment+s,nns) . & . kh ^' m p . n Ix . m n= t s .
accompaniments(+accompany+ment+s,nns) . & . kh ^' m p . n i . m n= t s .
accompanist(nn) . & . kh ^' m . ph & . n & s t .
accompanist(nn) . & . kh ^' m . ph & . n Ix s t .
accompany(vb) . & . kh ^' m . ph & . n i .
accompanying(+accompany+ing,jj,vbg) . & . kh ^' m . ph & . n i . Ix N .
accompanyist() . & . kh ^' m . ph & . n i . Ix s t .
accompli(fw) . & . kh A:' m . ph l i .
accompli(fw) . A:, . kh A:' m . ph l i .
accomplice(nn) . & . kh A:' m . ph l & s .
accomplice(nn) . & . kh A:' m . ph l Ix s .
accomplices(+accomplice+s,nns) . & . kh A:' m . ph l & . s & z .
accomplish(vb) . & . kh A:' m . ph l Ix S .
accomplished(+accomplish+ed,jj,vbd,vbn) . & . kh A:' m . ph l Ix S t .
accomplished_fact() . & . kh A:' m . ph l Ix S t # f @ k t .
accomplishes(+accomplish+s,vbz) . & . kh A:' m . ph l Ix . S Ix z .
accomplishing(+accomplish+ing,vbg) . & . kh A:' m . ph l Ix . S Ix N .
accomplishment(+accomplish+ment,nn) . & . kh A:' m . ph l Ix S . m E n t .
accomplishment(+accomplish+ment,nn) . & . kh A:' m . ph l Ix S . m n= t .
accomplishments(+accomplish+ment+s,nns) . & . kh A:' m . ph l Ix S . m n= t s .
accompt() . & . kh aU' n t .
accor(nnp,nnp_company) . @' . kh >, 9r .
accor's(nnp,nnp_company,pos) . @' . kh &r z .
accor[ding]-(+accord+ing,vbg) . & . kh oU, 9r .
accord(nn,nnp,vb) . & . kh >' 9r d .
accord(nn,nnp,vb) . & . kh A:' 9r d .
accord's(+accord+'s,nn,nnp,pos,vb,vbz) . & . kh >' 9r d z .
accordance(+accord+ance,nn) . & . kh >' 9r . d n= s .
accordance(+accord+ance,nn) . & . kh A:' 9r . d n= s .
accordant() . & . kh A:' 9r . d n= t .
accordantly() . & . kh A:' 9r . d n= t . l i .
accordatura() . & . kh A:, 9r . d & . th U' . 9r & .
accorded(+accord+ed,vbd,vbn) . & . kh >' 9r . d Ix d .
according(+accord+ing,vbg) . & . kh >' 9r . d Ix N .
according(+accord+ing,vbg) . & . kh A:' 9r . d Ix N .
accordingly(+accord+ing+ly,rb) . & . kh >' 9r . d Ix N . l i .
accordingly(+accord+ing+ly,rb) . & . kh A:' 9r . d Ix N . l i .
accordion(+accord+ion,nn) . & . kh >' 9r . d i . n= .
accordion(+accord+ion,nn) . & . kh A:' 9r . d i . n= .
accordions(+accord+ion+s,nns) . & . kh >' 9r . d i . n= z .
accords(+accord+s,nnp,nnps,nns,vbz) . & . kh >' 9r d z .
accost(vb) . & . kh >' s t .
accost(vb) . & . kh A:' s t .
accosted(+accost+ed,vbd,vbn) . & . kh A:' s . th & d .
accosted(+accost+ed,vbd,vbn) . & . kh A:' s . th Ix d .
accosting(+accost+ing,vbg) . & . kh A:' s . th Ix N .
accouchement() . A . kh u S . m A:' N .
accoucheur() . A . kh u . S U' 9r .
accoucheuse() . A . kh u . S U' z .
account(nn,nnp,vb,vbp) . & . kh aU' n t .
account's(+account+'s,nn,nnp,pos,vb,vbp,vbz) . & . kh aU' n t s .
account_book() . & . kh aU' n t # b U k .
account_current() . & . kh aU' n t # kh 3r' . 9r n= t .
account_days() . & . kh aU' n t # d ei z .
account_duty() . & . kh aU' n t # d u:' . th i .
account_entry() . & . kh aU' n t # E' n . th 9r i .
account_executive() . & . kh aU' n t # Ix g . z E' . kh j & . th Ix v .
account_for() . & . kh aU' n t # f A 9r .
account_receivable() . & . kh aU' n t # 9r Ix . s i:' . v & . b l= .
account_render() . & . kh aU' n t # 9r E' n . d & 9r .
account_sales() . & . kh aU' n t # s ei l z .
account_stated() . & . kh aU' n t # s th ei' . t_( Ix d .
account_with() . & . kh aU' n t # w Ix T .
accountability(+account+ability,nn) . & . kh @, . U n . th & . b I' . l Ix . th i .
accountability(+account+ability,nn) . & . kh aU' . n & . b Ix . l Ix . th i .
accountability(+account+ability,nn) . & . kh aU' n . th & . b Ix . l Ix . th i .
accountable(+account+able,jj) . & . kh aU' . n & . b l= .
accountable(+account+able,jj) . & . kh aU' n . th & . b l= .
accountableness() . & . kh aU' n . th & . b l= . n E s .
accountancy(+account+ant+cy,nn) . & . kh aU' n . th n= . s i .
accountant(+account+ant,nn) . & . kh aU' n . th n= t .
accountant's(+account+ant,nn,pos) . & . kh aU' n . th n= t s .
accountants(+account+ant+s,nns) . & . kh aU' n . th n= t s .
accounted(+account+ed,vbd,vbn) . & . kh aU' . n & d .
accounted(+account+ed,vbd,vbn) . & . kh aU' n . th & d .
accountemp() . & . kh aU' n . th E, m p .
accountemps() . & . kh aU' n . th E, m p s .
accounting(+account+ing,jj,nn,nnp,vbg) . & . kh aU' . n Ix N .
accounting(+account+ing,jj,nn,nnp,vbg) . & . kh aU' n . th Ix N .
accounts(+account+s,nnps,nns,vbz) . & . kh aU' n t s .
accouplement() . & . kh ^' . ph l= . m n= t .
accouter() . & . kh u:' . t_( & 9r .
accouterment(nn) . & . kh u:' . t_( & 9r . m n= t .
accouterment(nn) . & . kh u:' . t_( &r . m n= t .
accouterments(+accouterment+s,nn) . & . kh u:' . t_( &r . m n= t s .
accoutre() . & . kh u:' . t_( & 9r .
accoutrement() . & . kh u:' . t_( & 9r . m n= t .
accra(nnp_city) . @' . kh 9r & .
accredit(vb) . & k . 9r E, . d_( & t .
accredit(vb) . & . kh 9r E' . d_( Ix t .
accredit_with() . & . kh 9r E' . d_( Ix t # w Ix T .
accredita[tion]-(+accredit+ation,nn) . & k . 9r E, . d I, . th ei, .
accreditation(+accredit+ation,nn) . & k . 9r E, . d_( & . th ei' . S n= .
accreditations(+accredit+ation+s,nns) . & k . 9r E, . d_( & . d ei' . S n= z .
accredited(+accredit+ed,vbd,vbn) . & k . 9r E' . d_( Ix . th Ix d .
accrediting(+accredit+ing,vbg) . & k . 9r E' . d_( & . th Ix N .
accrescent() . & . kh 9r E' . s n= t .
accrete() . & . kh 9r i:' t .
accretion(+accrete+ion,nn) . & k . 9r i:' . S n= .
accretion(+accrete+ion,nn) . & . kh 9r i:' . S n= .
accretion_borer() . & . kh 9r i:' . S n= # b oU' . 9r & 9r .
accretion_cutting() . & . kh 9r i:' . S n= # kh ^' . t_( Ix N .
accroach() . & . kh 9r oU' tS .
accrual(+accrue+al,nn) . & k . 9r u:' . l= .
accrual(+accrue+al,nn) . & . kh 9r u:' . l= .
accrual_basis() . & . kh 9r u:' . l= # b ei' . s Ix s .
accruals(+accrue+al+s,nns) . & k . 9r u:' . l= z .
accrue(vb) . & k . 9r u:' .
accrue(vb) . & . kh 9r u:' .
accrue_from() . & . kh 9r u:' # f 9r & m .
accrued(+accrue+ed,jj,vbd,vbn) . & k . 9r u:' d .
accrues(+accrue+s,vbz) . & k . 9r u:' z .
accruing(+accrue+ing,vbg) . & k . 9r u:' . Ix N .
accu[rate]-(jj) . @, k . j & .
acculturate() . & . kh ^' l . tS & . 9r ei, t .
acculturation() . & . kh ^, l . tS & . 9r ei' . S n= .
acculturationist() . & . kh ^, l . tS & . 9r ei' . S & . n Ix s t .
acculturize() . & . kh ^' l . tS & . 9r aI, z .
accumbent() . & . kh ^' m . b n= t .
accumulate(vb,vbp) . & k . j u:' m . j & . l ei, t .
accumulate(vb,vbp) . & . kh j u:' . m j & . l ei, t .
accumulated(+accumulate+ed,vbd,vbn) . & k . j u:' m . j & . l ei, . t_( Ix d .
accumulates(+accumulate+s,vbz) . & k . j u:' m . j & . l ei, t s .
accumulating(+accumulate+ing,vbg) . & k . j u:' m . j & . l ei, . t_( Ix N .
accumulation(+accumulate+ion,nn,nnp) . & k . j u:, m . j & . l ei' . S n= .
accumulation(+accumulate+ion,nn,nnp) . & . kh j u:, . m j & . l ei' . S n= .
accumulation_factor() . & . kh j u:, . m j & . l ei' . S n= # f @' k . th & 9r .
accumulation_point() . & . kh j u:, . m j & . l ei' . S n= # ph >i n t .
accumulations(+accumulate+ion+s,nns) . & k . j u:, m . j & . l ei' . S n= z .
accumulative(+accumulate+ive,jj) . & k . j u:' m . j & . l ei, . t_( Ix v .
accumulative(+accumulate+ive,jj) . & . kh j u:' . m j & . l ei, . t_( Ix v .
accumulatively(+accumulate+ive+ly,rb) . & k . j u:' m . j & . l & . th Ix v . l i .
accumulatively(+accumulate+ive+ly,rb) . & k . j u:' m . j & . l ei, . t_( Ix v . l i .
accumulatively(+accumulate+ive+ly,rb) . & . kh j u:' . m j & . l ei, . t_( Ix . v l i .
accumulativeness() . & . kh j u:' . m j & . l ei, . t_( Ix v . n E s .
accumulator(+accumulate+or,nn) . & k . j u:' m . j & . l ei, . t_( &r .
accumulator(+accumulate+or,nn) . & . kh j u:' . m j & . l ei, . t_( & 9r .
accumulators(+accumulate+or+s,nns) . & k . j u:' m . j & . l ei, . t_( &r z .
accuracies(+accuracy+s,nns) . @' k . j &r . & . s i z .
accuracy(nn) . @' k . j &r . & . s i .
accuracy(nn) . @' . kh j & . 9r & . s i .
accurate(jj) . @' k . j &r . & t .
accurate(jj) . @' . kh j & . 9r Ix t .
accurate[ly]-(+accurate+ly,rb) . @, k . j & . 9r I, t .
accurately(+accurate+ly,rb) . @' k . j &r . & t . l i .
accurately(+accurate+ly,rb) . @' . kh j & . 9r Ix t . l i .
accurateness() . @' . kh j & . 9r Ix t . n E s .
accuray() . @' k . j &r . ei, .
accuray's(pos) . @' k . j &r . ei, z .
accuride() . @' k . j &r . aI, d .
accursed() . & . kh 3r' 9r . s Ix d .
accursedly() . & . kh 3r' 9r . s Ix d . l i .
accurso(nnp_surname_0.000) . A . kh U' 9r . s oU .
accusal() . & . kh j u:' . z l= .
accusation(+accuse+ation,nn) . @, k . j & . z ei' . S n= .
accusation(+accuse+ation,nn) . @, k . j u . z ei' . S n= .
accusation(+accuse+ation,nn) . @, . kh j U . z ei' . S n= .
accusations(+accuse+ation+s,nns) . @, k . j & . z ei' . S n= z .
accusations(+accuse+ation+s,nns) . @, k . j u . z ei' . S n= z .
accusatival() . & . kh j u:, . z & . th aI' . v l= .
accusative(jj) . & k . j u:' . z & . th Ix v .
accusative(jj) . & . kh j u:' . z & . th Ix v .
accusative-dative() . & . kh j u:' . z & . th Ix v # d ei' . t_( Ix v .
accusatively() . & . kh j u:' . z & . th Ix . v l i .
accusatorial() . & . kh j u:, . z & . th oU' . 9r i . l= .
accusatorially() . & . kh j u:, . z & . th oU' . 9r i . l= . l i .
accusatory(jj) . & k . j u:' . z & . th >, . 9r i .
accusatory(jj) . & . kh j u:' . z & . th oU, . 9r i .
accuse(vb,vbp) . & k . j u:' z .
accuse(vb,vbp) . & . kh j u:' z .
accuse_yourself() . & . kh j u:' z # j U 9r . s E' l f .
accused(+accuse+ed,nnp,vbd,vbn) . & k . j u:' z d .
accused(+accuse+ed,nnp,vbd,vbn) . & . kh j u:' z d .
accuser(+accuse+er,nn) . & k . j u:' . z &r .
accusers(+accuse+er+s,nns) . & k . j u:' . z &r z .
accuses(+accuse+s,vbz) . & k . j u:' . z Ix z .
accusing(+accuse+ing,vbg) . & k . j u:' . z Ix N .
accusingly(+accuse+ing+ly,rb) . & k . j u:' . z Ix N . l i .
accustom(vb) . & . kh ^' s . th & m .
accustomed(+accustom+ed,jj,vbd,vbn) . & . kh ^' s . th & m d .
accustomedly() . & . kh ^' s . th & m d . l i .
accustomedness() . & . kh ^' s . th & m d . n E s .
accutane() . @' k . j u . th ei, n .
ace(nn,nnp,nnp_boyname_0.000,nnp_surname_0.000) . ei s .
ace(nn,nnp,nnp_boyname_0.000,nnp_surname_0.000) . ei' s .
ace-high() . ei s # h aI .
ace_bandage() . ei s # b @' n . d Ix dZ .
ace_point() . ei s # ph >i n t .
aced(+ace+ed,vbd) . ei' s t .
acedia() . & . s i:' . d i . & .
aceldama() . & . s E' l . d & . m & .
acellular() . ei . s E' l . j U . l & 9r .
acenesthesia() . ei, . s i . n Ix s . T i:' . Z & .
acentric() . ei . s E' n . th 9r Ix k .
acephalous() . ei . s E' . f & . l & s .
acequia() . & . s ei' . kh j & .
acer(+ace+er,nn) . ei' . s &r .
acerate() . @' . s & . 9r ei' t .
acerb() . & . s 3r' 9r b .
acerbas() . & . s 3r' 9r . b & s .
acerbate() . & . s 3r' 9r . b Ix t .
acerbate() . @' . s & 9r . b ei, t v .
acerbic(jj) . & . s 3r' 9r . b Ix k .
acerbic(jj) . & . s E' 9r . b Ix k .
acerbity() . & . s 3r' 9r . b Ix . th i .
acerdol() . @' . s & 9r . d oU, l .
acero(nnp_surname_0.000) . & . s E' . 9r oU .
acerose() . @' . s & . 9r oU, s .
acerous() . ei . s i:' . 9r & s .
acerra(nnp_surname_0.000) . & . s E' . 9r & .
acervate() . & . s 3r' 9r . v Ix t .
acervately() . & . s 3r' 9r . v Ix t . l i .
acervulus() . & . s 3r' 9r . v j & . l & s .
aces(+ace+s,nns) . ei' . s Ix z .
acescent() . & . s E' . s n= t .
acesius() . & . s E' . s i . & s .
acesodyne() . & . s E' . s & . d aI, n .
acesodynous() . @, . s Ix . s A:' . d n= . E s .
acessamenus() . & . s E, . s & . m i:' . n & s .
acestoma() . @, . s Ix . s th oU' . m & .
acetabuliform() . @, . s Ix . th @' . b j & . l & . f A:, 9r m .
acetabulum() . @, . s Ix . th @' . b j & . l & m .
acetal() . @' . s Ix . th @, l .
acetaldehyde() . @, . s Ix . th @' l . d & . h aI, d .
acetaldol() . @' . s Ix . th @, l . d oU l .
acetamid() . @, . s Ix . th @' . m Ix d .
acetamide() . @, . s Ix . th @' . m aI d .
acetaminophen(nnp_product) . & . s i:, . t_( & . m I' . n & . f n= .
acetaminophen(nnp_product) . A . s i . th A . m I' . n oU . f n= .
acetanilid() . @, . s Ix . th @' . n l= . Ix d .
acetanilide() . @, . s Ix . th @' n . l=, . aI d .
acetanisidine() . @, . s Ix . th & . n I' . s Ix . d i:, n .
acetate(nn) . @' . s & . th ei, t .
acetate(nn) . @' . s Ix . th ei, t .
acetate_green() . @' . s Ix . th ei, t # g 9r i n .
acetate_nitrate() . @' . s Ix . th ei, t # n aI' . th 9r ei t .
acetate_rayon() . @' . s Ix . th ei, t # 9r ei' . A n .
acetation() . @, . s Ix . th ei' . S n= .
acetazolamide() . @, . s Ix . th & . z oU' . l & . m aI, d .
acetes() . & . s i:' . th i z .
acetic(+ace+etic,jj,nn) . & . s E' . t_( Ix k .
acetic(+ace+etic,jj,nn) . & . s i:' . t_( Ix k .
acetic_acid() . & . s i:' . t_( Ix k # @' . s Ix d .
acetic_anhydride() . & . s i:' . t_( Ix k # @ n . h aI' . d 9r aI d .
acetify() . & . s E' . t_( & . f aI, .
acetimeter() . @, . s Ix . th I' . m Ix . th & 9r .
acetimetric() . @, . s Ix . th & . m E' . th 9r Ix k .
acetin() . @' . s Ix . th Ix n .
aceto(nnp_surname_0.000) . A . s E' . th oU .
acetobacter() . & . s i:, . t_( & . b @' k . th & 9r .
acetoin() . & . s E' . th oU . Ix n .
acetometer() . @, . s Ix . th A:' . m Ix . th & 9r .
acetometric() . @, . s Ix . th & . m E' . th 9r Ix k .
acetone(nn) . @' . s & . th oU, n .
acetone(nn) . @' . s Ix . th oU, n .
acetone_alcohol() . @' . s Ix . th oU, n # @' l . kh & . h A:, l .
acetone_body() . @' . s Ix . th oU, n # b A:' . d i .
acetone_chloroform() . @' . s Ix . th oU, n # kh l oU' . 9r & . f A:, 9r m .
acetone_oil() . @' . s Ix . th oU, n # >i l .
acetonic() . @, . s Ix . th A:' . n Ix k .
acetonitrile() . @, . s Ix . th oU . n aI' . th 9r Ix l .
acetophenetidin() . @, . s Ix . th oU . f & . n E' . t_( Ix . d Ix n .
acetophenetidine() . @, . s Ix . th oU . f & . n E' . t_( Ix . d i:, n .
acetophenone() . @, . s Ix . th oU . f & . n oU' n .
acetose() . @' . s Ix . th oU, s .
acetostearin() . @, . s Ix . th oU . s th i:' . & . 9r Ix n .
acetous() . @' . s Ix . th & s .
acetous_fermentation() . @' . s Ix . th & s # f 3r, 9r . m E n . th ei' . S n= .
acetum() . & . s i:' . t_( & m .
acetyl() . & . s i:' . th l= .
acetyl_bromide() . & . s i:' . th l= # b 9r oU' . m aI d .
acetyl_carbinol() . & . s i:' . th l= # kh A:' 9r . b & . n oU, l .
acetyl_chloride() . & . s i:' . th l= # kh l oU' . 9r aI d .
acetyl_group() . & . s i:' . th l= # g 9r u p .
acetyl_index() . & . s i:' . th l= # I' n . d E k s .
acetyl_oxide() . & . s i:' . th l= # A:' k . s aI d .
acetyl_radical() . & . s i:' . th l= # 9r @' . d_( Ix . kh l= .
acetyl_value() . & . s i:' . th l= # v @' l . j u .
acetylaminobenzene() . & . s i:, . th l= . & . m i:, . n oU . b E' n . z i n .
acetylaniline() . & . s i:, . th l= . @' . n l= . Ix n .
acetylate() . & . s E' t . l=, . ei t .
acetylbenzene() . & . s i:, . th l= . b E' n . z i n .
acetylcholine(nnp_product) . & . s E, . t_( l= . kh oU' . l i n .
acetylcholine(nnp_product) . & . s i:, . t_( l= . kh oU' . l i n .
acetylcholine(nnp_product) . & . s i:, . th l= . kh oU' . l i n .
acetylene(nn) . & . s E' t . l=, . i n .
acetylene(nn) . & . s E' . t_( & . l i:, n .
acetylene_acid() . & . s E' t . l=, . i n # @' . s Ix d .
acetylene_alcohol() . & . s E' t . l=, . i n # @' l . kh & . h A:, l .
acetylene_black() . & . s E' t . l=, . i n # b l @ k .
acetylene_burner() . & . s E' t . l=, . i n # b 3r' 9r . n & 9r .
acetylene_dichloride() . & . s E' t . l=, . i n # d aI . kh l oU' . 9r aI d .
acetylene_gas() . & . s E' t . l=, . i n # g @ s .
acetylene_linkage() . & . s E' t . l=, . i n # l I' N . kh Ix dZ .
acetylene_series() . & . s E' t . l=, . i n # s i:' . 9r i z .
acetylene_tetrachloride() . & . s E' t . l=, . i n # th E, . th 9r & . kh l oU' . 9r aI d .
acetylene_torch() . & . s E' t . l=, . i n # th A 9r tS .
acetylene_urea() . & . s E' t . l=, . i n # j U . 9r i:' . & .
acetylenic() . & . s E, t . l=' . E . n Ix k .
acetylenogen() . & . s E, t . l=' . i . n & . dZ n= .
acetylic() . @, . s Ix . th I' . l Ix k .
acetylide() . & . s E' t . l=, . aI d .
acetylize() . & . s E' t . l=, . aI z .
acetylmethylcarbinol() . & . s i:, . th l= . m E, . T Ix l . kh A:' 9r . b & . n oU, l .
acevedo(nnp_surname_0.013) . @ . s & . v ei' . d oU .
aceves(nnp_surname_0.001) . A . s ei' . v E s .
acey(+ace+y,jj,nnp_surname_0.000) . ei' . s i .
acey-deucy() . ei' . s i . d u:' . s i .
achab() . ei' . kh @ b .
achad() . ei' . kh @ d .
achaea() . & . kh i:' . & .
achaean() . & . kh i:' . n= .
achaemenes() . & . kh i:' . m & . n i:, z .
achaemenian() . @, . kh & . m i:' . n i . n= .
achaemenid() . & . kh i:' . m & . n Ix d .
achaemenides() . @, . kh & . m E' . n Ix . d i:, z .
achaeus() . & . kh i:' . & s .
achaia() . & . kh ei' . & .
achaian() . & . kh ei' . n= .
achalasia() . @, . kh & . l ei' . Z & .
achan() . ei' . kh @ n .
achar() . A . tS A:' 9r .
achates() . & . kh ei' . th i z .
achatz() . @' . kh & t s .
achaz() . ei' . kh @ z .
ache(nn,nnp_surname_0.000,vb) . ei k .
ache(nn,nnp_surname_0.000,vb) . ei' k .
ache_for() . ei k # f A 9r .
achebe(nnp_surname_0.000) . A . tS ei' . b i .
achech() . @ . tS E' k .
achee(+ache+ee,nn,nnp_surname_0.000) . & . tS i:' .
acheilary() . & . kh aI' . l & . 9r i .
achelous() . @, . kh & . l oU' . & s .
achenbach(nnp_surname_0.001) . @' . kh Ix n . b A k .
achenbaum() . @' . kh n= . b aU, m .
achene() . ei . kh i:' n .
achenial() . ei k . E' . n i . l= .
achernar() . ei' . kh & 9r . n A:, 9r .
acheron() . @' . kh & . 9r A:, n .
aches(+ache+s,nns,vbz) . ei' k s .
acheson(nnp_surname_0.001) . @' . tS & . s n= .
acheson(nnp_surname_0.001) . @' . tS Ix . s n= .
acheulean() . & . S u:' . l i . n= .
acheulian() . & . S u:' . l i . n= .
achey(+ache+y,jj) . @' . tS i .
achie[ve]-(vb) . & . tS i:, .
achievable(+achieve+able,jj) . & . tS i:' . v & . b l= .
achieve(vb) . & . tS i:' v .
achieve_orgasm() . & . tS i:' v # A:' 9r . g @ . z & m .
achieve_success() . & . tS i:' v # s & k . s E' s .
achieved(+achieve+ed,vbd,vbn) . & . tS i:' v d .
achievement(+achieve+ment,nn) . & . tS i:' v . m n= t .
achievement_age() . & . tS i:' v . m n= t # ei dZ .
achievement_quotient() . & . tS i:' v . m n= t # kh w oU' . S n= t .
achievement_test() . & . tS i:' v . m n= t # th E s t .
achievements(+achieve+ment+s,nns) . & . tS i:' v . m n= t s .
achiever(+achieve+er,nn) . & . tS i:' . v &r .
achievers(+achieve+er+s,nns) . & . tS i:' . v &r z .
achieves(+achieve+s,vbz) . & . tS i:' v z .
achieving(+achieve+ing,vbg) . & . tS i:' . v Ix N .
achilary() . & . kh aI' . l & . 9r i .
achill() . @' . kh l= .
achille(nnp_surname_0.000) . & . kh I' . l i .
achille_lauro() . A . kh i:' . l E # l A:' . 9r oU .
achillea() . @, . kh Ix . l i:' . & .
achillean() . @, . kh & . l i:' . n= .
achilles(nnp_surname_0.000) . & . kh I' . l i z .
achilles_heel() . & . kh I' . l i z # h i l .
achilles_tendon() . & . kh I' . l i z # th E' n . d n= .
achimaas() . & . kh I' . m i . @, s .
achimelech() . & . kh I' . m & . l E, k .
achimenes() . & . kh I' . m & . n i:, z .
aching(+ache+ing,vbg) . ei' . kh Ix N .
achiral() . ei . kh aI' . & . 9r l= .
achish() . ei' . kh Ix S .
achitophel() . & . kh I' . t_( & . f E, l .
achkan() . @' tS . kh n= .
achlamydate() . ei . kh l @' . m Ix . d ei, t .
achlamydeous() . @, . kh l & . m I' . d i . & s .
achlorhydria() . ei, . kh l oU 9r . h aI' . d 9r i . & .
achlorophyllous() . ei . kh l oU, . 9r & . f I' . l & s .
achmed(nnp_boyname_0.000) . A:' . h m E d .
achmed(nnp_boyname_0.000) . A:' k . m E d .
achoa() . & . tS oU' . & .
achoa's(pos) . & . tS oU' . & z .
acholia() . ei . kh oU' . l i . & .
acholous() . ei . kh oU' . l & s .
acholuria() . @, . kh & . l U' . 9r i . & .
achondrite() . ei . kh A:' n . d 9r aI t .
achondritic() . ei, . kh A n . d 9r I' . t_( Ix k .
achondroplasia() . ei . kh A:, n . d 9r & . ph l ei' . Z & .
achondroplastic() . ei . kh A:, n . d 9r & . ph l @' s . th Ix k .
achor(+ache+or,nn,nnp_surname_0.000) . ei' . kh &r .
achord(nnp_surname_0.000) . @' . kh > 9r d .
achorn(nnp_surname_0.000) . @' . kh &r n .
achroite() . @' . kh 9r oU . aI, t .
achromat() . @' . kh 9r & . m @, t .
achromate() . @' . kh 9r & . m ei, t .
achromatic() . @, . kh 9r & . m @' . t_( Ix k .
achromatic_color() . @, . kh 9r & . m @' . t_( Ix k # kh ^' . l & 9r .
achromatic_lens() . @, . kh 9r & . m @' . t_( Ix k # l E n z .
achromatic_prism() . @, . kh 9r & . m @' . t_( Ix k # ph 9r I' . z & m .
achromatic_vision() . @, . kh 9r & . m @' . t_( Ix k # v I' . Z n= .
achromaticity() . @, . kh 9r oU . m & . th I' . s Ix . th i .
achromatin() . ei . kh 9r oU' . m & . th Ix n .
achromatise() . & . kh 9r oU' . m & . th aI, z .
achromatism() . ei . kh 9r oU' . m & . th I, . z & m .
achromatize() . ei . kh 9r oU' . m & . th aI, z .
achromatophil() . ei, . kh 9r & . m @' . t_( & . f Ix l .
achromatophilia() . ei, . kh 9r & . m @, . t_( & . f I' . l i . & .
achromatophilic() . ei, . kh 9r & . m @, . t_( & . f I' . l Ix k .
achromatous() . ei . kh 9r oU' . m & . th & s .
achromic() . ei . kh 9r oU' . m Ix k .
achromobacter() . ei . kh 9r oU' . m & . b @, k . th & 9r .
achromycin() . @, . kh 9r oU . m aI' . s Ix n .
achronychous() . & . kh 9r A:' . n & . kh & s .
achsah() . @' k . s & .
achtenberg() . @' k . th E n . b &r g .
achterberg() . @' k . th &r . b &r g .
achy() . ei' . kh i .
acicula() . & . s I' . kh j & . l & .
acicular() . & . s I' . kh j & . l & 9r .
acicularity() . & . s I, . kh j & . l @' . 9r Ix . th i .
acicularly() . & . s I' . kh j & . l & 9r . l i .
aciculate() . & . s I' . kh j & . l Ix t .
aciculum() . & . s I' . kh j & . l & m .
acid(jj,nn) . @' . s & d .
acid(jj,nn) . @' . s Ix d .
acid-ash() . @' . s Ix d # @ S .
acid-base() . @' . s Ix d # b ei s .
acid-binding() . @' . s Ix d # b aI' n . d Ix N .
acid-fast() . @' . s Ix d # f @, s t .
acid-fastness() . @' . s Ix d # f @' s t . n Ix s .
acid-forming() . @' . s Ix d # f A:, 9r . m Ix N .
acid-head() . @' . s Ix d # h E d .
acid-mordant() . @' . s Ix d # m A:' 9r . d n= t .
acid-treat() . @' . s Ix d # th 9r i t .
acid_albumin() . @' . s Ix d # @ l . b j u:' . m n= .
acid_albuminate() . @' . s Ix d # @ l . b j u:' . m & . n ei, t .
acid_amide() . @' . s Ix d # @' . m aI d .
acid_anhydride() . @' . s Ix d # @ n . h aI' . d 9r aI d .
acid_azide() . @' . s Ix d # @' . z aI d .
acid_bath() . @' . s Ix d # b @ T .
acid_black() . @' . s Ix d # b l @ k .
acid_blast() . @' . s Ix d # b l @ s t .
acid_blower() . @' . s Ix d # b l oU' . & 9r .
acid_boiler() . @' . s Ix d # b >i' . l & 9r .
acid_bronze() . @' . s Ix d # b 9r A n z .
acid_brown() . @' . s Ix d # b 9r aU n .
acid_burner() . @' . s Ix d # b 3r' 9r . n & 9r .
acid_casein() . @' . s Ix d # kh ei' . s i n .
acid_cell() . @' . s Ix d # s E l .
acid_color() . @' . s Ix d # kh ^' . l & 9r .
acid_dipper() . @' . s Ix d # d I' . ph & 9r .
acid_drop() . @' . s Ix d # d 9r A p .
acid_dye() . @' . s Ix d # d aI .
acid_dyspepsia() . @' . s Ix d # d Ix s . ph E' p . S & .
acid_egg() . @' . s Ix d # E g .
acid_ester() . @' . s Ix d # E' s . th & 9r .
acid_freak() . @' . s Ix d # f 9r i k .
acid_fuchsine() . @' . s Ix d # f U' k . s Ix n .
acid_gloss() . @' . s Ix d # g l A s .
acid_green() . @' . s Ix d # g 9r i n .
acid_halide() . @' . s Ix d # h @' . l aI d .
acid_honey() . @' . s Ix d # h ^' . n i .
acid_hydrolysis() . @' . s Ix d # h aI . d 9r A:' . l Ix . s Ix s .
acid_kiln() . @' . s Ix d # kh Ix l .
acid_metaprotein() . @' . s Ix d # m E, . t_( & . ph 9r oU' . th i n .
acid_nitrile() . @' . s Ix d # n aI' . th 9r Ix l .
acid_oil() . @' . s Ix d # >i l .
acid_phosphate() . @' . s Ix d # f A:' s . f ei t .
acid_ponceau() . @' . s Ix d # ph A n . s oU' .
acid_process() . @' . s Ix d # ph 9r A:' . s E s .
acid_radical() . @' . s Ix d # 9r @' . d_( Ix . kh l= .
acid_reserve() . @' . s Ix d # 9r Ix . z 3r' 9r v .
acid_resist() . @' . s Ix d # 9r Ix . z I' s t .
acid_rock() . @' . s Ix d # 9r A k .
acid_salt() . @' . s Ix d # s A l t .
acid_sludge() . @' . s Ix d # s l & dZ .
acid_soil() . @' . s Ix d # s >i l .
acid_test() . @' . s Ix d # th E s t .
acid_tide() . @' . s Ix d # th aI d .
acid_value() . @' . s Ix d # v @' l . j u .
acid_violet() . @' . s Ix d # v aI' . & . l Ix t .
acid_wood() . @' . s Ix d # w U d .
acid_worker() . @' . s Ix d # w 3r' 9r . kh & 9r .
acid_yellow() . @' . s Ix d # j E' . l oU .
acidalium() . @, . s Ix . d @' . l i . & m .
acidanthera() . @, . s Ix . d @' n . T & . 9r & .
acidemia() . @, . s Ix . d i:' . m i . & .
acidic(+acid+ic,jj) . & . s I' . d_( Ix k .
acidification(+acid+ify+cation,nn) . & . s I, . d_( & . f & . kh ei' . S n= .
acidified(+acid+ify+ed,vbd,vbn) . & . s I' . d_( & . f aI, d .
acidifies(+acid+ify+s,vbz) . & . s I' . d_( & . f aI, z .
acidify(+acid+ify,vb) . & . s I' . d_( & . f aI, .
acidimeter() . @, . s Ix . d I' . m Ix . th & 9r .
acidimetric() . @, . s Ix . d & . m E' . th 9r Ix k .
acidimetry() . @, . s Ix . d I' . m Ix . th 9r i .
acidity(+acid+ity,nn) . & . s I' . d_( & . th i .
acidity(+acid+ity,nn) . & . s I' . d_( Ix . th i .
acidity_coefficient() . & . s I' . d_( Ix . th i # kh oU, . & . f I' . S n= t .
acidize() . @' . s Ix . d aI, z .
acidly(+acid+ly,rb) . @' . s & d . l i .
acidly(+acid+ly,rb) . @' . s Ix d . l i .
acidogenic() . @, . s Ix . d oU . dZ E' . n Ix k .
acidolysis() . @, . s Ix . d A:' . l Ix . s Ix s .
acidophil() . @' . s Ix . d oU . f I, l .
acidophile() . @' . s Ix . d oU . f aI, l .
acidophilic() . @, . s Ix . d oU . f I' . l Ix k .
acidophilus() . @, . s Ix . d A:' . f & . l & s .
acidophilus_milk() . @, . s Ix . d A:' . f & . l & s # m Ix l k .
acidosis() . @, . s & . d oU' . s & s .
acidosis() . @, . s Ix . d oU' . s Ix s .
acidotic() . @, . s Ix . d A:' . t_( Ix k .
acids(+acid+s,nns) . @' . s & d z .
acidulant() . & . s I' . dZ & . l n= t .
acidulate() . & . s I' . dZ & . l ei, t .
acidulent() . & . s I' . dZ & . l n= t .
acidulous() . & . s I' . dZ & . l & s .
aciduria() . @, . s & . d U' . 9r i . & .
aciduric() . @, . s Ix . d U' . 9r Ix k .
acidy() . @' . s Ix . d i .
acierate() . @' . s i . & . 9r ei, t .
acierno(nnp_surname_0.000) . A . s I' 9r . n oU .
aciform() . @' . s & . f A:, 9r m .
acinaceous() . @, . s & . n ei' . S & s .
acinacifoliate() . & . s I, . n & . s & . f oU' . l i . Ix t .
acinacifolious() . & . s I, . n & . s & . f oU' . l i . & s .
acinaciform() . @, . s & . n @' . s & . f A:, 9r m .
acinarious() . @, . s & . n E' . 9r i . & s .
acinic() . & . s I' . n Ix k .
aciniform() . & . s I' . n & . f A:, 9r m .
acinose() . @' . s & . n oU, s .
acinous() . @' . s & . n & s .
acinus() . @' . s & . n & s .
acis() . ei' . s Ix s .
ack(nnp_surname_0.000,uh) . @' k .
ack-ack() . @' k . @, k .
acker(nnp_surname_0.005) . @' . kh &r .
acker's(nnp_surname_0.005,pos) . @' . kh &r z .
ackerley(nnp_surname_0.000) . @' . kh & 9r . l i .
ackerley(nnp_surname_0.000) . @' . kh &r . l i .
ackerly(nnp_surname_0.000) . @' . kh &r . l i .
ackerman(nnp,nnp_surname_0.009) . @' . kh &r . m n= .
ackermann(nnp_surname_0.001) . @' . kh &r . m n= .
ackerson(nnp_surname_0.001) . @' . kh &r . s n= .
ackert(nnp_surname_0.000) . @' . kh &r t .
ackey() . @' . kh i .
ackhouse() . @' k . h aU, s .
ackland(nnp_surname_0.000) . @' k . l n= d .
ackles(nnp_surname_0.001) . @' . kh l= z .
ackley(nnp_surname_0.003) . @' k . l i .
ackley(nnp_surname_0.003) . @' . kh l i .
acklin(nnp_surname_0.001) . @' k . l Ix n .
ackman(nnp_surname_0.001) . @' k . m n= .
acknowledge(vb,vbp) . @ k . n A:' . l Ix dZ .
acknowledge(vb,vbp) . Ix k . n A:' . l Ix dZ .
acknowledge_defeat() . @ k . n A:' . l Ix dZ # d Ix . f i:' t .
acknowledgeable(+acknowledge+able,jj) . @ k . n A:' . l Ix . dZ & . b l= .
acknowledgeable(+acknowledge+able,jj) . Ix k . n A:' . l Ix . dZ & . b l= .
acknowledged(+acknowledge+ed,vbd,vbn) . @ k . n A:' . l Ix dZ d .
acknowledged(+acknowledge+ed,vbd,vbn) . Ix k . n A:' . l Ix dZ d .
acknowledgement(+acknowledge+ment,nn) . & k . n A:' . l Ix dZ . m n= t .
acknowledgement(+acknowledge+ment,nn) . @ k . n A:' . l Ix dZ . m n= t .
acknowledgement(+acknowledge+ment,nn) . Ix k . n A:' . l Ix dZ . m n= t .
acknowledges(+acknowledge+s,vbz) . @ k . n A:' . l Ix . dZ Ix z .
acknowledges(+acknowledge+s,vbz) . Ix k . n A:' . l Ix . dZ Ix z .
acknowledging(+acknowledge+ing,vbg) . @ k . n A:' . l Ix . dZ Ix N .
acknowledging(+acknowledge+ing,vbg) . Ix k . n A:' . l Ix . dZ Ix N .
acknowledgment(nn) . @ k . n A:' . l Ix dZ . m n= t .
acknowledgment(nn) . Ix k . n A:' . l Ix dZ . m n= t .
ackroyd(nnp_surname_0.000) . @' k . 9r >i, d .
ackroyd's(nnp_surname_0.000,pos) . @' k . 9r >i, d z .
ackton() . @' k . th n= .
acle() . @' . kh l i .
acleistocardia() . & . kh l aI' s . th & . kh A:' 9r . d i . & .
aclu(+abbreviation,nnp,nnp_organization) . ei, . s i:, . E, l . j u:, .
aclu's(+abbreviation,nnp,nnp_organization,pos) . ei, . s i:, . E, l . j u:, z .
acm(nnp_organization) . ei, . s i:, . E, m .
acmat(nnp_company) . @' k . m @ t .
acmat's(nnp_company,pos) . @' k . m @ t s .
acmatic() . @ k . m @' . t_( Ix k .
acme(nn) . @' k . m i .
acme's(+acme+'s,nn,pos) . @' k . m i z .
acme_harrow() . @' k . m i # h @' . 9r oU .
acme_thread() . @' k . m i # T 9r E d .
acmesthesia() . @, k . m Ix s . T i:' . Z & .
acmite() . @' k . m aI t .
acmon() . @' k . m n= .
acne(nn) . @' k . n i .
acnemia() . @ k . n i:' . m i . & .
acnode() . @' k . n oU d .
acoasm() . @' . kh oU . @, . z & m .
acocella(nnp_surname_0.000) . A . kh oU . tS E' . l & .
acock(nnp_surname_0.000) . & . kh A:' k .
acockbill() . & . kh A:' k . b I, l .
acocotl() . @' . kh & . kh A:, . th l= .
acoelomate() . ei . s i:' . l & . m ei, t .
acoelomatous() . ei, . s i . l A:' . m & . th & s .
acoelous() . ei . s i:' . l & s .
acoemeti() . A . kh i:' . m i . th i .
acoenaesthesia() . ei, . s i . n Ix s . T i:' . Z & .
acoff(nnp_surname_0.000) . @' . kh > f .
acog() . & . kh >' g .
acold() . & . kh oU' l d .
acolyte(nn) . @' . kh & . l aI, t .
acolytes(+acolyte+s,nns) . @' . kh & . l aI, t s .
aconcagua() . A . kh oU n . kh A:' . g w A .
aconite() . @' . kh & . n aI, t .
aconite_violet() . @' . kh & . n aI, t # v aI' . & . l Ix t .
aconitic() . @, . kh & . n I' . t_( Ix k .
aconitine() . & . kh A:' . n Ix . th i:, n .
acord(nnp_surname_0.001) . & . kh >' 9r d .
acorn(nn,nnp) . ei' . kh > 9r n .
acorn(nn,nnp) . ei' . kh A 9r n .
acorn_barnacle() . ei' . kh A 9r n # b A:' 9r . n & . kh l= .
acorn_chair() . ei' . kh A 9r n # tS E 9r .
acorn_clock() . ei' . kh A 9r n # kh l A k .
acorn_cup() . ei' . kh A 9r n # kh & p .
acorn_duck() . ei' . kh A 9r n # d & k .
acorn_shell() . ei' . kh A 9r n # S E l .
acorn_spoon() . ei' . kh A 9r n # s ph u n .
acorn_squash() . ei' . kh A 9r n # s kh w A S .
acorn_sugar() . ei' . kh A 9r n # S U' . g & 9r .
acorn_tube() . ei' . kh A 9r n # th u b .
acorn_weevil() . ei' . kh A 9r n # w i:' . v l= .
acorns(+acorn+s,nns) . ei' . kh > 9r n z .
acosmism() . ei . kh A:' z . m Ix . z & m .
acosta(nnp_surname_0.022) . & . kh >' s . th & .
acotyledon() . ei, . kh A:, t . l=' . i . d n= .
acouasm() . & . kh u:' . @ . z & m .
acousma() . & . kh u:' z . m & .
acoust[ics]-(+acoustic+s,nn) . & . kh u:, s t .
acoustic(jj,nn) . & . kh u:' s . th Ix k .
acoustic_impedance() . & . kh u:' s . th Ix k # Ix m . ph i:' . d n= s .
acoustic_inertance() . & . kh u:' s . th Ix k # Ix n . 3r' 9r . th n= s .
acoustic_mass() . & . kh u:' s . th Ix k # m @ s .
acoustic_meatus() . & . kh u:' s . th Ix k # m i . ei' . t_( & s .
acoustic_mine() . & . kh u:' s . th Ix k # m aI n .
acoustic_nerve() . & . kh u:' s . th Ix k # n &r 9r v .
acoustic_phonetics() . & . kh u:' s . th Ix k # f & . n E' . t_( Ix k s .
acoustic_resistance() . & . kh u:' s . th Ix k # 9r Ix . z I' s . th n= s .
acoustic_tile() . & . kh u:' s . th Ix k # th aI l .
acoustic_wave() . & . kh u:' s . th Ix k # w ei v .
acoustical(+acoustic+al,jj) . & . kh u:' s . th Ix . kh l= .
acoustically(+acoustic+al+ly,rb) . & . kh u:' s . th Ix k . l i .
acoustician() . @, . kh U . s th I' . S n= .
acoustics(+acoustic+s,nn) . & . kh u:' s . th Ix k s .
acquaint(vb) . & k . w ei' n t .
acquaint(vb) . & . kh w ei' n t .
acquaint[ed]-(+acquaint+ed,vbd,vbn) . & k . w ei, n t .
acquaintance(+acquaint+ance,nn) . & k . w ei' n . th n= s .
acquaintance(+acquaint+ance,nn) . & . kh w ei' n . th n= s .
acquaintances(+acquaint+ance+s,nns) . & k . w ei' n . th n= . s Ix z .
acquaintanceship(+acquaint+ance+ship,nn) . & k . w ei' n . th n= s . S Ix p .
acquainted(+acquaint+ed,vbd,vbn) . & k . w ei' . n Ix d .
acquainted(+acquaint+ed,vbd,vbn) . & k . w ei' n . th Ix d .
acquainted(+acquaint+ed,vbd,vbn) . & . kh w ei' n . th Ix d .
acquainted_with() . & . kh w ei' n . th Ix d # w Ix T .
acquaintedness() . & . kh w ei' n . th Ix d . n E s .
acquaviva(nnp_surname_0.000) . A k . w A . v i:' . v & .
acquaviva(nnp_surname_0.000) . A:' . kh w A . v i:' . v A .
acquest() . & . kh w E' s t .
acquiesce(vb) . @, k . w i . E' s .
acquiesce(vb) . @, . kh w i . E' s .
acquiesced(+acquiesce+ed,vbd,vbn) . @, k . w i . E' s t .
acquiescence(+acquiesce+ence,nn) . @, k . w i . E' . s n= s .
acquiescence(+acquiesce+ence,nn) . @, . kh w i . E' . s n= s .
acquiescent() . @, . kh w i . E' . s n= t .
acquiescing(+acquiesce+ing,vbg) . @, k . w i . E' . s Ix N .
acquire(nn,vb) . & k . w aI' . &r .
acquire(nn,vb) . & . kh w aI' . &r .
acquired(+acquire+ed,jj,vbd,vbn) . & k . w aI' . &r d .
acquirement() . & . kh w aI' . &r . m n= t .
acquirer(+acquire+er,nn) . & k . w aI' . &r . &r .
acquirers(+acquire+er+s,nns) . & k . w aI' . &r . &r z .
acquires(+acquire+s,vbz) . & k . w aI' . &r z .
acquiring(+acquire+ing,vbg) . & k . w aI' . &r . Ix N .
acquiring(+acquire+ing,vbg) . & k . w aI' . 9r Ix N .
acquisition(nn,nnp) . @, k . w & . z I' . S n= .
acquisition(nn,nnp) . @, . kh w Ix . z I' . S n= .
acquisition's(+acquisition+'s,nn,nnp,pos) . @, k . w & . z I' . S n= z .
acquisitions(+acquisition+s,nns) . @, k . w & . z I' . S n= z .
acquisitive(jj) . & k . w I' . z & . th Ix v .
acquisitive(jj) . & . kh w I' . z Ix . th Ix v .
acquisitively() . & . kh w I' . z Ix . th Ix . v l i .
acquisitiveness() . & . kh w I' . z Ix . th Ix v . n E s .
acquit(vb) . & k . w I' t .
acquit(vb) . & . kh w I' t .
acquit_yourself() . & . kh w I' t # j U 9r . s E' l f .
acquitaine(nnp_place) . @' k . w Ix . th ei, n .
acquits(+acquit+s,vbz) . & k . w I' t s .
acquittal(nn) . & k . w I' . t_( l= .
acquittal(nn) . & . kh w I' . th l= .
acquittals(nns) . & k . w I' . t_( l= z .
acquittance() . & . kh w I' . th n= s .
acquittance_roll() . & . kh w I' . th n= s # 9r oU l .
acquitted(vbn) . & k . w I' . t_( Ix d .
acquitting(vbg) . & k . w I' . t_( Ix N .
acraea() . & . kh 9r i:' . & .
acraldehyde() . & . kh 9r @' l . d & . h aI, d .
acre(nn,nnp_surname_0.000) . A:' . kh 9r & .
acre(nn,nnp_surname_0.000) . ei' . kh & 9r .
acre(nn,nnp_surname_0.000) . ei' . kh &r .
acre-dale() . ei' . kh & 9r # d ei l .
acre-foot() . ei' . kh & 9r # f U t .
acre-inch() . ei' . kh & 9r # Ix n tS .
acreage(nn) . ei' k . 9r & dZ .
acreage(nn) . ei' . kh & . 9r Ix dZ .
acreage(nn) . ei' . kh &r . Ix dZ .
acred() . ei' . kh & 9r d .
acree(nnp_surname_0.002) . & k . 9r i:' .
acres(+acre+s,nnp,nnp_surname_0.001,nns) . ei' . kh &r z .
acrey(+acre+y,jj,nnp_surname_0.000) . @' k . 9r i .
acri(nnp_surname_0.000) . A:' k . 9r i .
acrid(jj) . @' k . 9r Ix d .
acrid(jj) . @' . kh 9r Ix d .
acridine() . @' . kh 9r Ix . d i:, n .
acridine_dye() . @' . kh 9r Ix . d i:, n # d aI .
acridine_yellow() . @' . kh 9r Ix . d i:, n # j E' . l oU .
acridity() . & . kh 9r I' . d_( Ix . th i .
acridly() . @' . kh 9r Ix d . l i .
acridness() . @' . kh 9r Ix d . n E s .
acriflavine() . @, . kh 9r & . f l ei' . v Ix n .
acriflavine_hydrochloride() . @, . kh 9r & . f l ei' . v Ix n # h aI, . d 9r & . kh l oU' . 9r aI d .
acrilan() . @' . kh 9r & . l @, n .
acrimonious(+acrimony+ous,jj) . @, k . 9r & . m oU' . n i . & s .
acrimonious(+acrimony+ous,jj) . @, . kh 9r & . m oU' . n i . & s .
acrimoniously() . @, . kh 9r & . m oU' . n i . & . s l i .
acrimoniousness() . @, . kh 9r & . m oU' . n i . & . s n E s .
acrimony(nn) . @' k . 9r Ix . m oU, . n i .
acrimony(nn) . @' . kh 9r & . m oU, . n i .
acrisius() . & . kh 9r I' . s i . & s .
acritical() . ei . kh 9r I' . t_( Ix . kh l= .
acro[ss]-(in,rb,rp) . & k . 9r >, .
acrobat(nn) . @' k . 9r & . b @, t .
acrobat(nn) . @' . kh 9r & . b @, t .
acrobatic(+acrobat+ic,jj) . @, k . 9r & . b @' . t_( Ix k .
acrobatic(+acrobat+ic,jj) . @, . kh 9r & . b @' . t_( Ix k .
acrobatically() . @, . kh 9r & . b @' . t_( Ix . kh & . l i .
acrobatics(+acrobat+ic+s,nn) . @, k . 9r & . b @' . t_( Ix k s .
acrobatics(+acrobat+ic+s,nn) . @, . kh 9r & . b @' . t_( Ix k s .
acrobats(+acrobat+s,nns) . @' k . 9r & . b @, t s .
acrocarpous() . @, . kh 9r & . kh A:' 9r . ph & s .
acrocephalic() . @, . kh 9r oU . s & . f @' . l Ix k .
acrocephaly() . @, . kh 9r & . s E' . f & . l i .
acrocorinth() . @, . kh 9r & . kh A:' . 9r Ix n T .
acrocyanosis() . @, . kh 9r oU . s aI, . & . n oU' . s Ix s .
acrodont() . @' . kh 9r & . d A:, n t .
acrodrome() . @' . kh 9r & . d 9r oU, m .
acrodromous() . & . kh 9r A:' . d 9r & . m & s .
acrodynia() . @, . kh 9r & . d I' . n i . & .
acrogen() . @' . kh 9r & . dZ n= .
acrogenous() . & . kh 9r A:' . dZ & . n & s .
acrogenously() . & . kh 9r A:' . dZ & . n & . s l i .
acrography() . & . kh 9r A:' . g 9r & . f i .
acrogynous() . & . kh 9r A:' . dZ & . n & s .
acrolein() . & . kh 9r oU' . l i . Ix n .
acrolith() . @' . kh 9r & . l Ix T .
acrologic() . @, . kh 9r & # l A:' . dZ Ix k .
acrology() . & . kh 9r A:' . l & . dZ i .
acromegalic() . @, . kh 9r oU . m & . g @' . l Ix k .
acromegaly() . @, . kh 9r & . m E' . g & . l i .
acromicria() . @, . kh 9r & . m I' . kh 9r i . & .
acromion() . & . kh 9r oU' . m i . n= .
acron(nnp_surname_0.000) . @' . kh 9r A n .
acronal() . @' . kh 9r & . n l= .
acronical() . & . kh 9r A:' . n Ix . kh l= .
acronically() . & . kh 9r A:' . n Ix . kh l= . l i .
acronychous() . & . kh 9r A:' . n & . kh & s .
acronym(nn) . @' k . 9r & . n Ix m .
acronym(nn) . @' . kh 9r & . n Ix m .
acronymize() . & . kh 9r A:' . n & . m aI, z .
acronymous() . & . kh 9r A:' . n & . m & s .
acronyms(+acronym+s,nns) . @' k . 9r & . n Ix m z .
acropathy() . & . kh 9r A:' . ph & . T i .
acropetal() . & . kh 9r A:' . ph Ix . th l= .
acropetally() . & . kh 9r A:' . ph Ix . th l= . l i