If I n = ∫ 1 + t 2 t 2 n d t , then I n + 1 =

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If $I_n=\int \frac{t^{2 n}}{1+t^2} d t$, then $I_{n+1}=$

MathematicsIndefinite IntegrationAP EAMCETAP EAMCET 2017 (26 Apr Shift 2)

Options:

A $\frac{t^{2 n+1}}{2 n+1}+I_{2 n}$
B $\frac{t^{2 n+1}}{2 n+1}+I_n$
C $\frac{t^{2 n+1}}{2 n+1}-I_{2 n}$
D $\frac{t^{2 n+1}}{2 n+1}-I_n$

Solution:

1984 Upvotes Verified Answer

The correct answer is: $\frac{t^{2 n+1}}{2 n+1}-I_n$

No solution. Refer to answer key.

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