Note: You can get full credit for this problem by just entering the final answer (to the last question) correctly. The initial questions are meant as hints towards the final answer and also allow you the opportunity to get partial credit. x² Consider the indefinite integral (x-3)(x-4)² Then the integrand has partial fractions decomposition where a = b= C = Integrating term by term, we obtain that x² (x-3)(x-4)² dx = +C dx a x 3 + b C x-4 (x-4)² +
Note: You can get full credit for this problem by just entering the final answer (to the last question) correctly. The initial questions are meant as hints towards the final answer and also allow you the opportunity to get partial credit. x² Consider the indefinite integral (x-3)(x-4)² Then the integrand has partial fractions decomposition where a = b= C = Integrating term by term, we obtain that x² (x-3)(x-4)² dx = +C dx a x 3 + b C x-4 (x-4)² +
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter5: Inverse, Exponential, And Logarithmic Functions
Section: Chapter Questions
Problem 18T
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