Solution Formulas Videos Final Answer $18\log \left(v\right)+\log \left(11\right)\cdot 18$ Got another answer? Verify it here! Step-by-step Solution Specify the solving method Choose an optionSimplifyWrite as single logarithmCondense the logarithmExpand the logarithmFind the integralFind the derivativeSolve for vSuggest another method or feature Send 1 Use the product rule for logarithms: $\log_b\left(MN\right)=\log_b\left(M\right)+\log_b\left(N\right)$, where $M=v$ and $N=11$ $18\left(\log \left(v\right)+\log \left(11\right)\right)$ 2 Multiply the single term $18$ by each term of the polynomial $\left(\log \left(v\right)+\log \left(11\right)\right)$ $18\log \left(v\right)+\log \left(11\right)\cdot 18$ Final Answer $18\log \left(v\right)+\log \left(11\right)\cdot 18$