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- Anger three-term recurrence
- Antiderivative of arccos
- Antiderivative of arccosh
- Antiderivative of arcsin
- Antiderivative of arcsinh
- Antiderivative of arctan
- Antiderivative of arctanh
- Antiderivative of cosine integral
- Antiderivative of coth
- Antiderivative of hyperbolic cosecant
- Antiderivative of inverse error function
- Antiderivative of sech
- Antiderivative of sine integral
- Antiderivative of tanh
- Antiderivative of the logarithm
- Antiderivative of versine
- Apéry's constant
- Apéry's constant is irrational
- Arakawa-Kaneko zeta function
- Arccos
- Arccos as inverse cosine
- Arccosh
- Arccot
- Arccoth
- Arccsc
- Arccsch
- Arcsec
- Arcsech
- Arcsin
- Arcsin as inverse sine
- Arcsin cdf
- Arcsin pdf
- Arcsinh
- Arctan
- Arctanh
- Arithmetic functions
- Arithmetic zeta function
- Artin-Mazur zeta function
- Artin constant
- Associated Laguerre L
- Asymptotic behavior of Sievert integral
- Asymptotic formula for partition function
- B(x,y)=2^(1-x-y)integral (1+t)^(x-1)(1-t)^(y-1)+(1+t)^(y-1)(1-t)^(x-1) dt
- B(x,y)=integral (t^(x-1)+t^(y-1))(1+t)^(-x-y) dt
- B(x,y)B(x+y,z)=B(y,z)B(y+z,x)
- B(x,y)B(x+y,z)=B(z,x)B(x+z,y)
- B(x,y)B(x+y,z)B(x+y+z,u)=Gamma(x)Gamma(y)Gamma(z)Gamma(u)/Gamma(x+y+z+u)
- B(x,y+1)=(y/(x+y))B(x,y)
- B(x,y+1)=(y/x)B(x+1,y)
- Barnes G
- Barnes G at positive integer
- Barnes G at z+1 in terms of Barnes G and gamma
- Barnes zeta function
- Basic hypergeometric phi
- Basic hypergeometric series psi
- Bateman F
- Bell numbers
- Bell polynomial
- Bernardi operator
- Bernoulli-Euler Gamma function
- Bernoulli B
- Bernoulli numbers
- Bernoulli polynomial and Hurwitz zeta
- Bernstein B
- Bessel-Clifford
- Bessel J
- Bessel J in terms of Bessel-Clifford
- Bessel Y
- Bessel at -n-1/2 in terms of Bessel polynomial
- Bessel at n+1/2 in terms of Bessel polynomial
- Bessel functions footer
- Bessel polynomial
- Bessel polynomial generalized hypergeometric
- Bessel polynomial in terms of Bessel functions
- Beta
- Beta as improper integral
- Beta as product of gamma functions
- Beta in terms of gamma
- Beta in terms of power of t over power of (1+t)
- Beta in terms of sine and cosine
- Beta is symmetric
- Bickley-Naylor
- Binet's formula
- Binomial coefficient
- Binomial coefficient ((n+1) choose k) equals (n choose k) + (n choose (k-1))
- Binomial coefficient (n choose 0) equals 1
- Binomial coefficient (n choose k) equals (-1)^k ((k-n-1) choose k)
- Binomial coefficient (n choose k) equals (n choose (n-k))
- Binomial coefficient (n choose n) equals 1
- Binomial series
- Binomial theorem
- Bohr-Mollerup theorem
- Bolzano function
- Bolzano function is continuous
- Bolzano function is nowhere differentiable
- Book:Aleksandar Ivić/The Riemann Zeta-Function
- Book:Alfred George Greenhill/The applications of elliptic functions
- Book:Andrew Gray/A Treatise on Bessel Functions
- Book:Andrew Gray/A Treatise on Bessel Functions/Second Edition
- Book:Arthur Erdélyi/Higher Transcendental Functions Volume I