| /dports/math/p5-Math-Pari/pari-2.3.5/src/modules/ |
| H A D | thue.c | 309 divrr(addrr(mulrr(c9,mplog(divrr(mulir(BS->Ind, c9),BS->c10))), in Baker()
314 mplog(divrr(mulir(BS->Ind, BS->c11), in Baker()
349 *B0 = divrr(mplog(divrr(mulir(q,BS->c15), l0)), BS->c13); in CF_1stPass()
353 *B0 = divrr(mplog(divrr(mulir(q,BS->c11), l0)), BS->c10); in CF_1stPass()
638 delta = divrr(gel(Delta,i2),gel(Delta,i1)); in init_get_B()
651 delta = divrr(garg(p1,prec), Pi2); in init_get_B()
656 lambda = divrr(garg(p1,prec), Pi2); in init_get_B()
699 B0 = divrr(mplog(divrr(mulir(gel(Q,3), BS->c15), l0)), BS->c13); in get_B0()
748 B0 = divrr(mulir(BS->Ind, mplog(divrr(mulir(BS->Ind, BS->c15), l0))), in get_Bx_LLL()
806 tmp = divrr(c1,c2); in LargeSols()
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| H A D | part.c | 129 p1 = divrr(p1, sqrtr( stor(3,DEFAULTPREC) )); in estim()
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| /dports/math/pari/pari-2.13.3/src/basemath/ |
| H A D | trans2.c | 110 affrr(divrr(p2,p5), p2); set_avma(av); in mpatan()
169 z = mpatan(divrr(x, a)); in mpasin()
237 z = mpatan(divrr(a, x)); in mpacos()
316 z = mpatan(divrr(x,y)); in mparg()
1508 t2 = sqrtr_abs(divrr(s3, pi)); in Gn24()
1551 return divrr(mulrr(pi, s2), A); in gammafrac24_s()
1555 A = divrr(A, cbrtu(2, prec)); in gammafrac24_s()
1557 return divrr(Pi2n(1, prec), A); in gammafrac24_s()
1570 return divrr(pi, mulrr(t, A)); in gammafrac24_s()
1573 return divrr(pi, mulrr(t, A)); in gammafrac24_s()
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| H A D | bern.c | 87 v = divrr(mpfactr(N, prec), powru(u, n)); shiftr_inplace(v,1); in bernset()
190 GEN z = divrr(mpfactr(n, prec), mulrr(powru(pi2, n), iz)); in bernreal_using_zeta()
323 h = divrr(z, rpowuu(p, (ulong)n, l)); in inv_szeta_euler()
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| H A D | bnfunits.c | 105 e = umodiu(roundr(divrr(t, pi2_sur_w)), n); in bnfisunit()
110 GEN p2 = roundr(divrr(garg(ro, prec), pi2_sur_w)); in bnfisunit()
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| H A D | ellanal.c | 307 PiN = divrr(Pi2n(1,prec), sqrtr_abs(itor(N, prec))); in vecF()
365 GEN c = gpow(divrr(gsqrt(N,prec), Pi2n(1,prec)), s, prec); in ellgammafactor()
536 GEN B = divrr(mulur(bitprec,mplog2(DEFAULTPREC)), pi2); in heegner_psi()
543 gel(bnd,l) = ceil_safe(divrr(B,imag_i(gel(points, l)))); in heegner_psi()
1277 ht = divrr(mulru(l1, wtor * wtor), mulri(gel(om,1), tam)); in ellheegner()
1281 bitneeded = itos(gceil(divrr(hnaive, mplog2(prec)))) + 10; in ellheegner()
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| H A D | trans1.c | 207 return divrr(sqrr(addrr(A,B)), C);
1172 q = floorr(divrr(z, P)); /* round ( x / (Pi/2) ) */ in powcx()
1928 z = divrr(y, addrr(mulur(n1, y), mulur(n2, b))); in sqrtnr_abs()
2247 return gerepileupto(av, divrr(y, z)); in mpexpm1()
2303 GEN t = mplog(z), u = divrr(subrr(x, t),x); in mpexp_basecase()
2937 y = divrr(Pi2n(-1, prec), agm1r_abs(_4ovQ)); in logagmr_abs()
3278 x = logr_aux(divrr(x, addrs(x,2))); in mplog1p()
3359 q = floorr(divrr(z, P)); /* round ( x / (Pi/2) ) */ in mpcosm1()
3826 return gerepileuptoleaf(av, divrr(s,x)); in mpsinc()
3910 return gerepileuptoleaf(av, divrr(s,c)); in mptan()
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| H A D | trans3.c | 419 p1 = subsr(1, divrr(r,q)); if (cmprr(c,p1)>0) c = p1; in kbessel1()
454 zf = sqrtr(divrr(pi,r)); in kbessel1()
693 S = expx? divrr(S, expx): mulrr(S, mpexp(negr(x))); in eint1r_asymp()
748 return subrr(mulrr(x, divrr(S,expx? expx: mpexp(x))), in eint1p()
768 y = mulrr(p1, expx? divrr(S, expx): mulrr(S, mpexp(y))); in eint1m()
1411 GEN t = gmul(divrr(Pi2n(1,prec),h), x); in cxerfc_r1()
1690 z = divrr(z, mpfactr(k,prec)); in szeta()
3557 GEN lq = glog(q,prec); k = roundr(divrr(zy, real_i(lq))); in theta()
3741 x = mulrr(x, divrr(subsr(1, mplog(divrr(x,y))), addrs(x,1))); in mplambertW0()
3763 x = mulrr(x, divrr(subsr(1, mplog(divrr(x,y))),addrs(x,1))); in mplambertW()
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| H A D | lfunquad.c | 596 Q = divrr(P, rpowuu(p, k, nbits2prec(maxss(64, bitnew)))); in Linv()
630 res = divrr(mpfactr(k-1, prec), z); in Lfeq()
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/functions/symbolic_operators/ |
| H A D | div | 10 (real, real):real divrr($1, $2)
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| H A D | dive | 6 (*real, real):real:parens $1 = divrr($1, $2)
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| /dports/math/pari/pari-2.13.3/src/functions/symbolic_operators/ |
| H A D | dive | 9 (*real, real):real:parens $1 = divrr($1, $2)
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| H A D | div | 12 (real, real):real divrr($1, $2)
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| /dports/math/pari/pari-2.13.3/src/modules/ |
| H A D | thue.c | 321 divrr(addrr(mulrr(c9,mplog(divrr(mulir(BS->Ind, c9),BS->c10))), in Baker()
325 mplog(divrr(Indc11, BS->Pi2)))); in Baker()
364 *B0 = divrr(mplog(divrr(mulir(q,a), l0)), b); in CF_1stPass()
372 GEN t = divrr(mulir(BS->Ind, BS->c15), l0); in get_B0Bx()
373 *B0 = divrr(mulir(BS->Ind, mplog(t)), BS->c13); in get_B0Bx()
861 GEN v, u = divrr(garg(t,0), Pi); /* in -1 < u <= 1 */ in argsqr()
885 if (Deps5) BS->inverrdelta = divrr(Deps5, addsr(1,delta)); in init_get_B()
934 B0 = divrr(mplog(divrr(mulir(gel(Q,2), BS->c15), l0)), BS->c13); in get_B0()
1048 tmp = divrr(c1,c2); in LargeSols()
1073 Deps5 = divrr(subrr(c5,eps5), eps5); in LargeSols()
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| H A D | part.c | 89 p1 = divrr(p1, sqrtr( utor(3,DEFAULTPREC) )); in estim()
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| /dports/math/pari/pari-2.13.3/src/test/ |
| H A D | kerntest.c | 85 printf("/:"); _voirr(divrr(xr,yr)); in main()
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/test/ |
| H A D | kerntest.c | 91 printf("/:"); _voirr(divrr(xr,yr)); in main()
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| H A D | tune.c | 175 { disable(s); TIME_FUN(divrr(s->x, s->y)); } in speed_divrr()
177 { enable(s); TIME_FUN(divrr(s->x, s->y)); } in speed_divrrgmp()
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/basemath/ |
| H A D | trans3.c | 294 p2=subsr(1,divrr(r,q)); in kbessel()
598 p2=subsr(1,divrr(r,q)); if (gcmp(p1,p2)>0) p1=p2; in hyperu()
649 return divrr(addrr(real_1(l),z), mulrr(expx, x)); in incgam2_0()
920 z = divrr(z, sqrtpi); in gerfc()
1113 h = divrr(z, rpowuu(p, (ulong)n, l)); in inv_szeta_euler()
1133 z = divrr(mpfactr(n, l), mulrr(gpowgs(Pi2n(1, l), n), iz)); in bernreal_using_zeta()
1192 y = mulrr(divrr(gpowgs(pi2,k),mpfactr(kk,prec)),y); in szeta_odd()
1223 y = mulrr(divrr(gpowgs(pi2,k),mpfactr(kk,prec)),y); in szeta_odd()
1292 y = divrr(y, mpfactr(k,prec)); in szeta()
1371 tab[p] = divrr(unr, rpowuu(p, k, prec)); in czeta()
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| H A D | trans2.c | 95 affrr(divrr(p2,p5), p2); avma = av; in mpatan()
160 z = mpatan(divrr(x, a)); in mpasin()
235 z = mpatan(divrr(a, x)); in mpacos()
312 z = mpatan(divrr(y,x)); if (sx > 0) return z; in mparg()
315 z = mpatan(divrr(x,y)); in mparg()
473 y = gerepileuptoleaf(av, divrr(t, addsr(2,t))); in mpth()
968 return addrr(mulir(floorr(divrr(d, Z)), Z), x);
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| H A D | trans1.c | 127 affrr(divrr(gsqr(addrr(A,B)), C), tmppi); in constpi()
1243 return gerepileupto(av, divrr(y, z)); in mpexp1()
1595 y = divrr(Pi2n(-1, l), agm1r_abs( real2n(2 - n, l) )); in constlog2()
1648 y = divrr(subrex01(x), addrex01(x)); /* = (x-1) / (x+1) ~ 0 */ in logr_abs()
1688 y = divrr(Pi2n(-1, prec), agm1r_abs( divsr(4, Q) )); in logagmr_abs()
1901 q = floorr( divrr(z,pitemp) ); /* round ( x / (Pi/2) ) */ in mpsc1()
2261 return gerepileuptoleaf(av, divrr(s,c)); in mptan()
2305 return gerepile(av,tetpil,divrr(c,s)); in mpcotan()
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| /dports/math/pari/pari-2.13.3/src/kernel/none/ |
| H A D | mp_indep.c | 569 affrr(divrr(itor(x, ly+1), y), z); in divir()
588 affrr(divrr(utor(x,ly+1), y), z); in divur()
608 affrr(divrr(stor(x,ly+1), y), z); in divsr()
619 affrr(divrr(real_1(ly+1), y), z); in invr_basecase()
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| /dports/math/giacxcas/giac-1.6.0/ |
| H A D | pariinl.h | 773 affrr(divrr(p1,p2),z);
797 mpaff(divrr(x,y),z); avma=av;
852 return (typ(y)==t_INT) ? divri(x,y) : divrr(x,y);
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/headers/ |
| H A D | pariold.h | 175 #define ldivrr (long)divrr
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/kernel/none/ |
| H A D | mp_indep.c | 380 affrr(divrr(itor(x, ly+1), y), z); in divir()
410 affrr(divrr(stor(x,ly+1), y), z); in divsr()
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