1. Solve for x, rounding to the nearest integer if necessary. Fully justify your response by showing all algebraic steps.

logx(8)=log5(2)

2. Change from exponential form to logarithmic form.

r=s(t)f

3. Use the exponential form to solve for x.

log3(log2)(x5))=2

4. What is the exact value of x in the exponential equation3+e2x=13

5. If log5=7, then what is the value of x?

6. Express in exponential form.

logx(y)=z

7. Select the inverse of the function.

y=2x

8. Change from logarithmic form to exponential form y=abx.

log3(5y)=x

9. Select the inverse of the function.

y=log9(x)

10. Solve for a.

loga(512)=3