tpdf

Student's t probability density function

Syntax

y = tpdf(x,nu)

Description

y = tpdf(x,nu) returns the probability density function (pdf) of the Student's t distribution at each of the values in x using the corresponding degrees of freedom in nu. x and nu can be vectors, matrices, or multidimensional arrays that have the same size. A scalar input is expanded to a constant array with the same dimensions as the other inputs.

Examples

expand all

Compute Student's t pdf

The mode of the Student's t distribution is at x = 0. This example shows that the value of the function at the mode is an increasing function of the degrees of freedom.

tpdf(0,1:6)
ans =

    0.3183    0.3536    0.3676    0.3750    0.3796    0.3827

The t distribution converges to the standard normal distribution as the degrees of freedom approaches infinity. How good is the approximation for $\nu$ equal to 30?

difference = tpdf(-2.5:2.5,30)-normpdf(-2.5:2.5)
difference =

    0.0035   -0.0006   -0.0042   -0.0042   -0.0006    0.0035

More About

expand all

Student's t pdf

The probability density function (pdf) of the Student's t distribution is

y=f(x|ν)=Γ(ν+12)Γ(ν2)1νπ1(1+x2ν)ν+12

where ν is the degrees of freedom and Γ( · ) is the Gamma function. The result y is the probability of observing a particular value of x from a Student's t distribution with ν degrees of freedom.

See Also

| | | |

Was this topic helpful?