Pages that link to "Book:Milton Abramowitz/Handbook of mathematical functions"
The following pages link to Book:Milton Abramowitz/Handbook of mathematical functions:
View (previous 100 | next 100) (20 | 50 | 100 | 250 | 500)- Cosh of a sum (← links)
- Tanh of a sum (← links)
- Coth of a sum (← links)
- Halving identity for sinh (← links)
- Halving identity for cosh (← links)
- Halving identity for tangent (1) (← links)
- Halving identity for tangent (2) (← links)
- Halving identity for tangent (3) (← links)
- Doubling identity for sinh (1) (← links)
- Doubling identity for sinh (2) (← links)
- Doubling identity for cosh (1) (← links)
- Doubling identity for cosh (2) (← links)
- Doubling identity for cosh (3) (← links)
- Integral representation of Struve function (← links)
- Integral representation of Struve function (2) (← links)
- Integral representation of Struve function (3) (← links)
- Recurrence relation for Struve fuction (← links)
- Recurrence relation for Struve function (2) (← links)
- Derivative of Struve H0 (← links)
- D/dz(z^(nu)H (nu))=z^(nu)H (nu-1) (← links)
- D/dz(z^(-nu)H (nu))=1/(sqrt(pi)2^(nu)Gamma(nu+3/2))-z^(-nu)H (nu+1) (← links)
- H (nu)(x) geq 0 for x gt 0 and nu geq 1/2 (← links)
- H (-(n+1/2))(z)=(-1)^n J (n+1/2)(z) for integer n geq 0 (← links)
- H (1/2)(z)=sqrt(2/(pi z))(1-cos(z)) (← links)
- H (3/2)(z)=sqrt(z/(2pi))(1+2/z^2)-sqrt(2/(pi z))(sin(z)+cos(z)/z) (← links)
- Li 2(z)+Li 2(1-z)=pi^2/6-log(z)log(1-z) (← links)
- K(m)=(pi/2)2F1(1/2,1/2;1;m) (← links)
- E(m)=(pi/2)2F1(-1/2,1/2;1;m) (← links)
- Nth derivative of logarithm (← links)
- Antiderivative of the logarithm (← links)
- Integral of (z^n)log(z)dz=(z^(n+1)/(n+1))log(z)-z^(n+1)/(n+1)^2 for integer n neq -1 (← links)
- Ei(x)=-Integral from -x to infinity of e^(-t)/t dt (← links)