overall accuracy: 87.5% record: 30 score: 30 ∫4^x dx = (4^x / ln4)+c (4^(x + 1)/(x + 1))+c 4^x ln4 + c 4^x +…

overall accuracy: 87.5% record: 30 score: 30 ∫4^x dx = (4^x / ln4)+c (4^(x + 1)/(x + 1))+c 4^x ln4 + c 4^x + c high score board: overall you must have at least 100 to be on the board. * name record

overall accuracy: 87.5% record: 30 score: 30 ∫4^x dx = (4^x / ln4)+c (4^(x + 1)/(x + 1))+c 4^x ln4 + c 4^x + c high score board: overall you must have at least 100 to be on the board. * name record

Answer

Explanation:

Step1: Recall exponential - integral formula

The general formula for $\int a^{x}dx=\frac{a^{x}}{\ln a}+C$ ($a>0,a\neq1$). Here $a = 4$.

Step2: Apply the formula

Substituting $a = 4$ into the formula $\int a^{x}dx$, we get $\int4^{x}dx=\frac{4^{x}}{\ln 4}+C$.

Answer:

$\frac{4^{x}}{\ln 4}+C$