The tdf distribution is similar to the z distribution because Multiple Choice Neither as the degrees of freedom go to infinity, the r distribution converges to the z distribution nor both have asymptotic tails-that is, their tails become closer and closer to the horizontal axis but never touch it both have asymptotic tails-that is, their tails become closer and closer to the horizontal axis and eventually cross the axis as the degrees of freedom go to infinity, the r distribution converges to the z distribution and both have asymptotic tails-that is, their tails become closer and closer to the horizontal axis but never touch it as the degrees of freedom go to infinity, the t distribution converges to the z distribution, but both do not have asymptomatic tails

The tdf distribution is similar to the z distribution because Multiple Choice Neither as the degrees of freedom go to infinity, the r distribution converges to the z distribution nor both have asymptotic tails-that is, their tails become closer and closer to the horizontal axis but never touch it both have asymptotic tails-that is, their tails become closer and closer to the horizontal axis and eventually cross the axis as the degrees of freedom go to infinity, the r distribution converges to the z distribution and both have asymptotic tails-that is, their tails become closer and closer to the horizontal axis but never touch it as the degrees of freedom go to infinity, the t distribution converges to the z distribution, but both do not have asymptomatic tails

MATLAB: An Introduction with Applications

6th Edition

ISBN:9781119256830

Author:Amos Gilat

Publisher:Amos Gilat

Chapter1: Starting With Matlab

Section: Chapter Questions

Problem 1P

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#7
The tdf distribution is similar to the z distribution because
Multiple Choice
Neither as the degrees of freedom go to infinity, the t distribution converges to the z distribution nor both have asymptotic tails-that is, their tails become closer and closer to the horizontal axis but never touch it
both have asymptotic tails-that is, their tails become closer and closer to the horizontal axis and eventually cross the axis
as the degrees of freedom go to infinity, the t distribution converges to the z distribution and both have asymptotic tails-that is, their tails become closer and closer to the horizontal axis but never touch it
as the degrees of freedom go to infinity, the t distribution converges to the z distribution, but both do not have asymptomatic tails

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