Special functions

Gamma(x)

Euler’s Gamma function

Note

Euler’s constant is represented by gamma in yacas.

Example

In> Gamma(1.3)
Out> Gamma(1.3);
In> N(Gamma(1.3),30)
Out> 0.897470696306277188493754954771;
In> Gamma(1.5)
Out> Sqrt(Pi)/2;
In> N(Gamma(1.5),30);
Out> 0.88622692545275801364908374167;

See also

(), gamma

Zeta(x)

Riemann’s Zeta function

Example

In> Precision(30)
Out> True;
In> Zeta(1)
Out> Infinity;
In> Zeta(1.3)
Out> Zeta(1.3);
In> N(Zeta(1.3))
Out> 3.93194921180954422697490751058798;
In> Zeta(2)
Out> Pi^2/6;
In> N(Zeta(2));
Out> 1.64493406684822643647241516664602;

See also

()

Bernoulli(n)

Bernoulli(n, x)

Bernoulli numbers and Bernoulli polynomials

Euler(n)

Euler(n, x)

Euler numbers and Euler polynomials

Example

In> Euler(6)
Out> -61;
In> A:=Euler(5,x)
Out> (x-1/2)^5+(-10*(x-1/2)^3)/4+(25*(x-1/2))/16;
In> Simplify(A)
Out> (2*x^5-5*x^4+5*x^2-1)/2;

See also

Bin()

LambertW(x)

Lambert’s W-function

Example

In> LambertW(0)
Out> 0;
In> N(LambertW(-0.24/Sqrt(3*Pi)))
Out> -0.0851224014;

See also

Exp()