what is function of gamma ray
what is function of gamma ray
Gamma radiations do not have any charge.
No it isn't! The function G(x) := Gamma(x) * (1 + c * sin(2 * pi * x)) with 0 < c < 1 is such an example. Both, the Gamma-function and G have the properties f(x+1) = x * f(x) and f(1) = 1. That's why one needs a third property to define the gamma function uniquely.
The gamma function is an extension of the concept of a factorial. For positive integers n, Gamma(n) = (n - 1)!The function is defined for all complex numbers z for which the real part of z is positive, and it is the integral, from 0 to infinity of [x^(z-1) * e^(-x) with respect to x.
Coz the gamma function is singular for all negative integers. The factorial for negative integers is not defined.
It is a ray of radiation. conducts muscle movement.
In basic mathematics, n factorial is equal to 1*2*3*...*n and is written as n! for positive integer values of n.The Gamma function is a generalisation of this concept, withGamma(x) = (x-1)! where x can be any real or complex.
According to the links, Karl Pearson was first to formally introduce the gamma distribution. However, the symbol gamma for the gamma function, as a part of calculus, originated far earlier, by Legrenge (1752 to 1853). The beta and gamma functions are related. Please review the related links, particularly the second one from Wikipedia.
Gamma Glutamyltransferase. It is a liver function test used in the diagnosis and monitoring of hepatobiliary diseases.
It seems that any matter will stop part of the gamma rays; to stop most of the gamma rays from passing, you would need a fairly thick layer of matter. The thickness required to block half of the gamma rays depends on the energy of the gamma rays. Just about any matter will do. For more details, check the Wikipedia article "Gamma ray", section "Shielding".
Grendel's theorem, also known as the Wilson-Stein identity, relates the gamma function to the factorial function. It states that for any positive integer n, the gamma function evaluated at (n-1/2) is equal to the factorial of (2n-1) divided by 2^(2n-1) times the square root of π. This theorem is named after mathematicians B. M. Grendel and E. M. Stein.