evaluate the integral.
int an12xsec^{2}12x dx
int an12xsec^{2}12x dx=square

Question

evaluate the integral.
 int	an12xsec^{2}12x dx
 int	an12xsec^{2}12x dx=square

Accepted Answer

# Explanation:
## Step1: Use substitution
Let $u = 	an12x$. Then $du=12\sec^{2}12x dx$, so $\sec^{2}12x dx=\frac{1}{12}du$.
## Step2: Rewrite the integral
The original integral $\int	an12x\sec^{2}12x dx$ becomes $\int u	imes\frac{1}{12}du=\frac{1}{12}\int udu$.
## Step3: Integrate with respect to u
We know that $\int udu=\frac{u^{2}}{2}+C$. So $\frac{1}{12}\int udu=\frac{1}{12}	imes\frac{u^{2}}{2}+C=\frac{u^{2}}{24}+C$.
## Step4: Substitute back u
Substituting $u = 	an12x$ back, we get $\frac{	an^{2}12x}{24}+C$.
# Answer:
$\frac{	an^{2}12x}{24}+C$

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QUESTION IMAGE

Question

Explanation:

Step1: Use substitution

Step2: Rewrite the integral

Step3: Integrate with respect to u

Step4: Substitute back u

Answer: