Answer:
We use log to solve only those equations in which we have our variables in power form.
Step-by-step explanation:
Given : Margee thinks she can use logs to solve [tex]56=x^8[/tex], since logs seem to make exponents disappear but Margee is wrong
We have to explain the difference between equations like [tex]2=(1.04)^x[/tex] and [tex]56=x^8[/tex]
We use log to solve only those equations in which we have our variables in power form.
Out of given equation only [tex]2=(1.04)^x[/tex] has x in power form so we can apply log for solving the equation as,
[tex]2=(1.04)^x\\\\\ \text{Taking ln both sides},\\\ln (2)=\ln (1.04)^x\\\\\\\\text{Using idenity} \ln a^b=b\ln a\\\\\\ln (2)=\ln (1.04)^x\\\\\text{on solving, we get}\\\\x=17.673[/tex]
While solving other equation ,
[tex]56=x^8[/tex], we can directly take 8 root both side, [tex]56=x^8\\\\\\56^{\frac{1}{8}}=x^{(8\times{\frac{1}{8}})[/tex]
Thus, We use log to solve only those equations in which we have our variables in power form.
