Evaluate: (2^x+2^ -x )^2 d x

MCQ

Evaluate: $\int\left(2^x+2^{-x}\right)^2 d x$

A
$\frac{1}{2 \log 2}\left(2^{2 x}-2^{-2 x}\right)+C$
B
$\frac{1}{2 \log 2}\left(2^{2 x}-2^{-2 x}\right)+2 x+C$
C
$\frac{1}{2 \log 2}\left(2^{2 x}+2^{-2 x}\right)+2 x+C$
D
$\frac{1}{2 \log 2}\left(2^{2 x}+2^{-2 x}\right)+C$

✓

Answer

$\begin{array}{l}\text { (b) : We have, } \int\left(2^x+2^{-x}\right)^2 d x=\int\left(2^{2 x}+2^{-2 x}+2\right) d x \\ =\frac{2^{2 x}}{(\log 2) \times 2}+\frac{2^{-2 x}}{(\log 2)(-2)}+2 \cdot x+C \\ =\frac{1}{2 \log 2}\left(2^{2 x}-2^{-2 x}\right)+2 x+C\end{array}$

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