Let F : 3 , 5 → R be a twice differentiable function on 3 , 5 such that F x = e - x ∫ 3 x 3 t 2 + 2 t + 4 F ' t d t . If F ' 4 = α e β - 224 e β - 4 2 , then α + β is equal to _____.

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Given, F x = e - x ∫ 3 x 3 t 2 + 2 t + 4 F ' t d t . So, F 3 = e - 3 ∫ 3 3 3 t 2 + 2 t + 4 F ' t d t . ⇒ F 3 = 0 Again, e x F x = ∫ 3 x 3 t 2 + 2 t + 4 F ' t d t Differentiate both sides ⇒ e x F x + e x F ' x = 3 x 2 + 2 x + 4 F ' x (Newton Leibnitz Theorem for Definite Integral) ⇒ e x - 4 d y d x + e x y = 3 x 2 + 2 x (Use y = F x ) ⇒ d y d x + e x e x - 4 y = 3 x 2 + 2 x e x - 4 Here, integrating factor is e ∫ e x e x - 4 d x = e ln e x - 4 = e x - 4 So, the solution is y · e x - 4 = ∫ 3 x 2 + 2 x d x + c ⇒ y · e x - 4 = x 3 + x 2 + c Put x = 3 , y = 0 ⇒ c = - 36 So, F x = x 3 + x 2 - 36 e x - 4 ⇒ F ' x = 3 x 2 + 2 x e x - 4 - x 3 + x 2 - 36 e x e x - 4 2 Now put value of x = 4 we will get F ' 4 = 3 4 2 + 2 4 e 4 - 4 - 4 3 + 4 2 - 36 e 4 e 4 - 4 2 = 12 e 4 - 224 e 4 - 4 2 So, α = 12 & β = 4 Hence, α + β = 16

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