If ∫ limits (4ex+6e-x/9ex-4e-x)dx= Ax+ B log (9e2x-4)+ C, then A = ..., B=... and C=... .

Question

If ∫ limits (4ex+6e-x/9ex-4e-x)dx= Ax+ B log (9e2x-4)+ C, then A = ..., B=... and C=... . (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

Given, ∫ limits (4ex+6e-x/9ex-4e-x)dx = Ax+ B log (9e2x-4) + c LHS = ∫ limits (4e2x+6/9e2x-4)dx Let 4e2x+6 = A (9e2x-4)+ B (18e2x) ⇒ 9A+18B=4 and -4A = 6 ⇒ A=- (3/2) and B= (35/36) ∴ ∫ limits (A(9e2x-4)+B(18e2x)/9e2x-4)dx =A ∫ limits 1dx+B ∫ limits (1/t)dt , where t =9e2x-4 =Ax+B log (9e2x-4)+c = - (3/2)x+ (35/36) log (9e2x-4)+c ∴ A=- (3/2), B= (35/36) and c=any real number

Q. If ∫9ex−4e−x4ex+6e−x​dx=Ax+Blog(9e2x−4)+C, then A = ..., B=... and C=... .

Q. If $\int \frac{4 e ^{x} + 6 e ^{- x}}{9 e ^{x} - 4 e ^{-} x} d x = A x + Bl o g (9 e^{2 x} - 4) + C,$ then A = ..., B=... and C=... .