Lectures and Solutions 3

# For some value of thus by equating exponents the

This preview shows page 1. Sign up to view the full content.

This is the end of the preview. Sign up to access the rest of the document.

Unformatted text preview: ) . . Thus, by equating exponents (the technique for solving a Type I Exponential Equation), But, can be rewritten as . is equivalent to . . Hence, Therefore, since , the desired result is obtained: . █ Product Rule Consider the Product Rule: Note that . , for some value of . Rewriting the preceding logarithm in exponential form yields Since So, , it can be stated that and can be rewritten as . , for some values of and . . Thus, by equating exponents (the technique for solving a Type I Exponential Equation), But, and can be rewritten as Hence, and is equivalent to Therefore, since . , respectively. . , the desired result is obtained:...
View Full Document

## This document was uploaded on 03/03/2014 for the course MAT 106-030 at Kutztown.

Ask a homework question - tutors are online