If In - - tann xdx- then I0-I1-2I2-I8 -I9-I10- is equal to

We have I_n = ∫ tan^n xdx = ∫ tan^n 2 x (sec^2 x 1)dx = tan^n 1x/n 1 I_n 2 i.e. I_n 2 + I_n = tan^n 1x/n 1 (n ≥ 2) Thus, we have I_0+ I_1+2 (I_2+....+ I_8 ...

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Byju's Answer

Standard XIII

Mathematics

Reduction Formulae

If In = ∫ tan...

Question

If $I_{n} = \int t a n^{n} x d x, t h e n I_{0} + I_{1} + 2 (I_{2} + . . . I_{8}) + I_{9} + I_{10}$ , is equal to

\sum_{n = 1}^{9} \frac{t a n^{n} x}{n}

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1 + \sum_{n = 1}^{8} \frac{t a n^{n} x}{n}

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\sum_{n = 1}^{9} \frac{t a n^{n} x}{n + 1}

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\sum_{n = 2}^{10} \frac{t a n^{n} x}{n + 1}

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Solution

The correct option is A $\sum_{n = 1}^{9} \frac{t a n^{n} x}{n}$
We have $I_{n} = \int t a n^{n} x d x = \int t a n^{n - 2} x (s e c^{2} x - 1) d x = \frac{t a n^{n - 1} x}{n - 1} - I_{n - 2} i . e . I_{n - 2} + I_{n} = \frac{t a n^{n - 1} x}{n - 1} (n \geq 2)$
Thus, we have
$I_{0} + I_{1} + 2 (I_{2} + . . . . + I_{8}) + I_{9} + I_{10} = (I_{0} + I_{2}) + (I_{1} + I_{3}) + (I_{2} + I_{4}) + (I_{3} + I_{5}) + (I_{4} + I_{6}) + (I_{5} + I_{7}) + (I_{6} + I_{8}) + (I_{7} + I_{9}) + (I_{8} + I_{10}) . = \sum_{n = 2}^{10} \frac{t a n^{n - 1} x}{n - 1} = \sum_{n = 1}^{9} \frac{t a n^{n} x}{n}$

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Similar questions

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If In=∫tannxdx,then I0+I1+2(I2+...I8)+I9+I10, is equal to

The correct option is A ∑9n=1tannxnWe have In=∫tannxdx=∫tann−2x(sec2x−1)dx=tann−1xn−1−In−2i.e.In−2+In=tann−1xn−1(n≥2) Thus, we have I0+I1+2(I2+....+I8)+I9+I10=(I0+I2)+(I1+I3)+(I2+I4)+(I3+I5)+(I4+I6)+(I5+I7)+(I6+I8)+(I7+I9)+(I8+I10).=∑10n=2tann−1xn−1=∑9n=1tannxn

If $I_{n} = \int t a n^{n} x d x, t h e n I_{0} + I_{1} + 2 (I_{2} + . . . I_{8}) + I_{9} + I_{10}$ , is equal to