Return to number CVS log

Up to [local] / OpenXM_contrib / pari-2.2 / src / test / in

Initial revision

\p 38
\e
addprimes([nextprime(10^9),nextprime(10^10)])
bestappr(Pi,10000)
bezout(123456789,987654321)
bigomega(12345678987654321)
binomial(1.1,5)
chinese(Mod(7,15),Mod(13,21))
content([123,456,789,234])
contfrac(Pi)
contfrac(Pi,5)
contfrac((exp(1)-1)/(exp(1)+1),[1,3,5,7,9])
contfracpnqn([2,6,10,14,18,22,26])
contfracpnqn([1,1,1,1,1,1,1,1;1,1,1,1,1,1,1,1])
core(54713282649239)
core(54713282649239,1)
coredisc(54713282649239)
coredisc(54713282649239,1)
divisors(8!)
eulerphi(257^2)
factor(17!+1)
factor(100!+1,0)
factor(40!+1,100000)
factorback(factor(12354545545))
factorcantor(x^11+1,7)
centerlift(lift(factorff(x^3+x^2+x-1,3,t^3+t^2+t-1)))
10!
factorial(10)
factormod(x^11+1,7)
factormod(x^11+1,7,1)
setrand(1);ffinit(2,11)
setrand(1);ffinit(7,4)
fibonacci(100)
gcd(12345678,87654321)
gcd(x^10-1,x^15-1,2)
hilbert(2/3,3/4,5)
hilbert(Mod(5,7),Mod(6,7))
isfundamental(12345)
isprime(12345678901234567)
ispseudoprime(73!+1)
issquare(12345678987654321)
issquarefree(123456789876543219)
kronecker(5,7)
kronecker(3,18)
lcm(15,-21)
lift(chinese(Mod(7,15),Mod(4,21)))
modreverse(Mod(x^2+1,x^3-x-1))
moebius(3*5*7*11*13)
nextprime(100000000000000000000000)
numdiv(2^99*3^49)
omega(100!)
precprime(100000000000000000000000)
prime(100)
primes(100)
qfbclassno(-12391)
qfbclassno(1345)
qfbclassno(-12391,1)
qfbclassno(1345,1)
Qfb(2,1,3)*Qfb(2,1,3)
qfbcompraw(Qfb(5,3,-1,0.),Qfb(7,1,-1,0.))
qfbhclassno(2000003)
qfbnucomp(Qfb(2,1,9),Qfb(4,3,5),3)
form=Qfb(2,1,9);qfbnucomp(form,form,3)
qfbnupow(form,111)
qfbpowraw(Qfb(5,3,-1,0.),3)
qfbprimeform(-44,3)
qfbred(Qfb(3,10,12),,-1)
qfbred(Qfb(3,10,-20,1.5))
qfbred(Qfb(3,10,-20,1.5),2,,18)
qfbred(Qfb(3,10,-20,1.5),1)
qfbred(Qfb(3,10,-20,1.5),3,,18)
quaddisc(-252)
quadgen(-11)
quadpoly(-11)
quadregulator(17)
quadunit(17)
sigma(100)
sigma(100,2)
sigma(100,-3)
sqrtint(10!^2+1)
znorder(Mod(33,2^16+1))
forprime(p=2,100,print(p," ",lift(znprimroot(p))))
znstar(3120)
getheap
print("Total time spent: ",gettime);
\q