21 Nov 2021
Problem 45
Page 683
Section: Exercises
Chapter G: Integration of Rational Function by Partial Functions
Textbook ExpertVerified Tutor
21 Nov 2021
Given information
Given that are polynomials and for all except when .
Step-by-step explanation
Step 1.
Here all the functions are polynomials and .
are all continuing, so, therefore, cross multiply the equations.
, and
Since all are continues for all , so divide by .
Thus