Examples of 'gamma function' in a sentence
Meaning of "gamma function"
In mathematics, the gamma function is an extension of the factorial function. It is commonly used in various mathematical fields and has applications in statistics, physics, and engineering
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- A meromorphic function which generalizes the notion of factorial to complex numbers and has singularities at the nonpositive integers; any of certain generalizations or analogues of said function, such as extend the factorial to domains other than the complex numbers.
How to use "gamma function" in a sentence
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gamma function
Gamma function is strictly positive and increasing.
The capital denotes the gamma function.
The gamma function is a generalization of the factorial function.
A good solution to this is the gamma function.
The gamma function is an important special function in mathematics.
Where denotes the incomplete gamma function.
The gamma function is defined as an integral from zero to infinity.
Our analysis uses the gamma function.
Thus the gamma function generalizes the factorial function.
And the definition of the gamma function.
The gamma function satisfies.
It can be written in terms of the double gamma function.
Gamma function exponent.
By using the definition of gamma function in the form.
The gamma function can also be extended to the complex numbers.
See also
Functional equation involving gamma function.
And gamma function.
An example of such may be a gamma function.
Representation through the gamma function allows evaluation of factorial of complex argument.
By the definition of the gamma function.
The incomplete gamma function is defined as an integral function of the same integrand.
Multivariate gamma function.
It is this extended version that is commonly referred to as the gamma function.
Incomplete gamma function.
The following equation defines the regularized incomplete gamma function.
Where is gamma function.
Posterior probabilities were computed after fitting the training data to a gamma function.
Use will be made of the exponential and gamma function drop size distribution models.
The integral on the right hand side may be recognized as the gamma function.
Integration of the reciprocal gamma function along the positive real axis gives the value.
And who claims he can give meaning to the negative values of the gamma function.
We recall that the Gamma function can be expressed as.
The Lanczos approximation for the gamma function.
The Gamma function is a continuous extension of the factorial function.
The factorial function is the restriction of the gamma function to the integers.
The Gamma function is a generalization of the notion of a factorial to complex numbers.
So we see that there is a relation between the gamma function and the factorial.
Where Γ is the gamma function and a is an arbitrary but fixed base point.
The duplication formula and the multiplication theorem for the gamma function are the prototypical examples.
The digamma function satisfies a reflection formula similar to that of the Gamma function.
There are different ways to define the Gamma function.
The Gamma function is defined as.
It should not be confused with the mathematical Gamma function.
See Particular values of the gamma function for calculated values.
Examples are the Riemann zeta function and the gamma function.
Where Γ denotes the Gamma function and the symbol a is given by.
Gauss sums are the analogues for finite fields of the Gamma function.
Is the Euler gamma function.
The Gamma function profile is shown by FIG.
Lower regularized incomplete Gamma function.
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