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Question:
If $I_{n} = \int \frac{\sin nx}{\sin x} dx $ for $n = 1, 2 , 3,...,$ then $I_6$ =
If $I_{n} = \int \frac{\sin nx}{\sin x} dx $ for $n = 1, 2 , 3,...,$ then $I_6$ =
Updated On: May 6, 2024
- $\frac{3}{5} \sin3x + \frac{8}{3} \sin^{5} x -\sin x +c $
- $\frac{2}{5} \sin 5x - \frac{5}{3} \sin^{3} x - 2 \sin x +c $
- $\frac{2}{3} \sin 5x - \frac{8}{3} \sin^{5} x + 4 \sin x +c $
- $\frac{2}{5} \sin 5 x -\frac{8}{3} \sin^{3} x + 4 \sin x +c $
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The Correct Option is D
Solution and Explanation
Given, $ I_{n} =\int \frac{\sin n x}{\sin x} d x \dots$(i)
$ I_{n-2} =\int \frac{\sin (n-2) x}{\sin x} d x \dots$(ii)
Subtracting E (ii) from E (i), we get
$I_{n}-I_{n-2}=\int \frac{\{\sin n x-\sin (n-2) x\}}{\sin x} d x$
$=\int \frac{2 \cos (n-1) x \sin x}{\sin x} d x=\int 2 \cos (n-1) x d x$
$=\frac{2 \sin (n-1) x}{(n-1)}$
$\therefore I_{6}-I_{4}=\frac{2 \sin 5 x}{5}$ and $I_{4}-I_{2}=\frac{2 \sin 3 x}{3}$
Now, $ I_{2}=\int \frac{\sin 2 x}{\sin x} d x$
$=\int \frac{2 \sin x \cos x}{\sin x} d x=2 \int \cos x d x$
$=2 \sin x+c$
and $ I_{6}=I_{4}+2 \frac{\sin 3 x}{5}$
$=I_{2}+2 \frac{\sin 3 x}{3}+2 \frac{\sin 5 x}{5}$
$=2 \frac{\sin 5 x}{5}+2 \frac{\sin 3 x}{3}+2 \sin x+c$
$=\frac{2 \sin 5 x}{5}+\frac{2}{3}\left(3 \sin x-4 \sin ^{3} x\right)+2 \sin x+c$
$I_{6}=\frac{2}{5} \sin 5 x-\frac{8}{3} \sin ^{3} x+4 \sin x+c$
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Concepts Used:
Integral
The representation of the area of a region under a curve is called to be as integral. The actual value of an integral can be acquired (approximately) by drawing rectangles.
- The definite integral of a function can be shown as the area of the region bounded by its graph of the given function between two points in the line.
- The area of a region is found by splitting it into thin vertical rectangles and applying the lower and the upper limits, the area of the region is summarized.
- An integral of a function over an interval on which the integral is described.
Also, F(x) is known to be a Newton-Leibnitz integral or antiderivative or primitive of a function f(x) on an interval I.
F'(x) = f(x)
For every value of x = I.
Types of Integrals:
Integral calculus helps to resolve two major types of problems:
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