QUESTION IMAGE
Question
determine the following indefinite integral. check your work by differentiation.
int 4sqrt11{x} dx
int 4sqrt11{x} dx=square
Step1: Rewrite the integrand
We know that $\sqrt[11]{x}=x^{\frac{1}{11}}$. So the integral becomes $\int 4x^{\frac{1}{11}}dx$.
Step2: Use the power - rule for integration
The power - rule for integration is $\int ax^{n}dx=\frac{a}{n + 1}x^{n+1}+C$ ($n
eq - 1$). Here $a = 4$ and $n=\frac{1}{11}$. Then $\int 4x^{\frac{1}{11}}dx=4\times\frac{1}{\frac{1}{11}+1}x^{\frac{1}{11}+1}+C$.
Step3: Simplify the coefficient
First, calculate $\frac{1}{\frac{1}{11}+1}=\frac{1}{\frac{1 + 11}{11}}=\frac{11}{12}$. So $4\times\frac{1}{\frac{1}{11}+1}x^{\frac{1}{11}+1}+C=\frac{4\times11}{12}x^{\frac{12}{11}}+C=\frac{11}{3}x^{\frac{12}{11}}+C$.
Step4: Check by differentiation
Differentiate $\frac{11}{3}x^{\frac{12}{11}}+C$ using the power - rule for differentiation $\frac{d}{dx}(ax^{n})=anx^{n - 1}$. We have $\frac{d}{dx}(\frac{11}{3}x^{\frac{12}{11}}+C)=\frac{11}{3}\times\frac{12}{11}x^{\frac{12}{11}-1}=4x^{\frac{1}{11}}$.
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$\frac{11}{3}x^{\frac{12}{11}}+C$