HP 49g+ User Manual
Page 137
Page 3-15
GAMMA:
The Gamma function
Γ(α)
PSI:
N-th derivative of the digamma function
Psi:
Digamma function, derivative of the ln(Gamma)
The Gamma function is defined by
∫
∞
−
−
=
Γ
0
1
)
(
dx
e
x
x
α
α
. This function has
applications in applied mathematics for science and engineering, as well as
in probability and statistics.
Factorial of a number
The factorial of a positive integer number n is defined as n!=n
⋅(n-1)⋅(n-
2) …3
⋅2⋅1, with 0! = 1. The factorial function is available in the calculator by
using
~‚2. In both ALG and RPN modes, enter the number first,
followed by the sequence
~‚2. Example: 5~‚2`.
The Gamma function, defined above, has the property that
Γ(α) = (α−1) Γ(α−1), for α > 1.
Therefore, it can be related to the factorial of a number, i.e.,
Γ(α) = (α−1)!,
when
α is a positive integer. We can also use the factorial function to
calculate the Gamma function, and vice versa. For example,
Γ(5) = 4! or,
4~‚2`. The factorial function is available in the MTH menu,
through the 7. PROBABILITY.. menu.
The PSI function,
Ψ(x,y), represents the y-th derivative of the digamma function,
i.e.,
)
(
)
,
(
x
dx
d
x
n
n
n
ψ
=
Ψ
, where
ψ(x) is known as the digamma function, or
Psi function. For this function, y must be a positive integer.
The Psi function,
ψ(x), or digamma function, is defined as
)]
(
ln[
)
(
x
x
Γ
=
ψ
.
Examples of these special functions are shown here using both the ALG and
RPN modes. As an exercise, verify that GAMMA(2.3) = 1.166711…,
PSI(1.5,3) = 1.40909.., and Psi(1.5) = 3.64899739..E-2.
These calculations are shown in the following screen shot: