For I x = ∫ sec 2 x - 2022 sin 2022 x d x , if I π 4 = 2 1011 , then

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Given, I x = ∫ sec 2 x - 2022 sin 2022 x d x On rearranging we get, ⇒ I x = ∫ sec 2 x ⏟ I I · sin - 2022 x ⏟ I d x - 2022 ∫ sin - 2022 x d x Now using integration by parts we get, ⇒ I x = tan x . sin x - 2022 + ∫ 2022 tan x · sin x - 2023 cos x d x - 2022 ∫ sin x - 2022 d x ⇒ I x = tan x . sin x - 2022 + ∫ 2022 tan x · sin x - 2022 cos x sin x d x - 2022 ∫ sin x - 2022 d x ⇒ I x = tan x . sin x - 2022 + ∫ 2022 sin x - 2022 d x - 2022 ∫ sin x - 2022 d x ⇒ I x = tan x sin x - 2022 + C Now at x = π 4 I π 4 = 2 1011 ⇒ 2 1011 = 1 × 1 2 - 2022 + C ⇒ C = 0 Hence I x = tan x sin x 2022 Now finding the value of I π 6 = 1 3 1 2 2022 = 2 2022 3 And I π 3 = 3 3 2 2022 = 2 2022 3 2021 = 1 3 1010 I π 6 So, 3 1010 I π 3 = I π 6

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