10. Write in exponential form.log28 =3 log_(2)8=3underline ( )

## Step 1<br />The given problem is a logarithmic equation, which is \(log_{2}8=3\). This equation can be interpreted as "2 raised to the power of 3 equals 8".<br /><br />## Step 2<br />To convert this logarithmic equation into an exponential form, we need to understand the basic structure of a logarithmic equation. A logarithmic equation is of the form \(log_{b}x=y\), which can be written in exponential form as \(b^y=x\).<br /><br />## Step 3<br />In the given problem, the base \(b\) is 2, the exponent \(y\) is 3, and the number \(x\) is 8. Therefore, the exponential form of the given logarithmic equation is \(2^3=8\).