Let I n x = ∫ 0 x 1 t 2 + 5 n d t , n = 1 , 2 , 3 , … . Then

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Given, I n x = ∫ 0 x d t t 2 + 5 n Applying integration by parts we get, ⇒ I n x = t t 2 + 5 n 0 x - ∫ 0 x n t 2 + 5 - n - 1 · 2 t 2 ⇒ I n x = x x 2 + 5 n + 2 n ∫ 0 x t 2 t 2 + 5 n + 1 d t ⇒ I n x = x x 2 + 5 n + 2 n ∫ 0 x t 2 + 5 - 5 t 2 + 5 n + 1 d t ⇒ I n x = x x 2 + 5 n + 2 n ∫ 0 x d t t 2 + 5 n - 10 n ∫ 0 x d t t 2 + 5 n + 1 ⇒ I n x = x x 2 + 5 n + 2 n I n x - 10 n I n + 1 x ⇒ 10 n I n + 1 x + 1 - 2 n I n x = x x 2 + 5 n ⇒ 10 n I n + 1 x + 1 - 2 n I n x = x I ' n {where I ' n = 1 x 2 + 5 n we get by differentiating I n x = ∫ 0 x d t t 2 + 5 n } Now put n = 5 We get, 50 I 6 - 9 I 5 = x I 5 '

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