- e 4 x e 3 x - e 2 x

Let I = - e 4 x e 3 x - e 2 x dx = - e e - e )dx = - x 4 x 3 - x 2 dx = ( x - 1 ) x 2 ( x - 1 ) dx = dx = 3 + C

Integrals — Class 12 Maths Solution

ncert misc SA NCERT Misc.,Q.8,Page.352

Question

$\cfrac{{{e^{5\log x}} - {e^{4\log x}}}}{{{e^{3\log x}} - {e^{2\log x}}}}$

Step-by-step Solution

Let $I = \int {\cfrac{{{e^{5\log x}} - {e^{4\log x}}}}{{{e^{3\log x}} - {e^{2\log x}}}}dx} = \int {\left( {\cfrac{{{e^{\log {x^5}}} - {e^{\log {x^4}}}}}{{{e^{\log {x^3}}} - {e^{\log {x^2}}}}}} \right)dx}$

$= \int {\cfrac{{{x^5} - {x^4}}}{{{x^3} - {x^2}}}dx} = \int {\cfrac{{{x^4}\left( {x - 1} \right)}}{{{x^2}\left( {x - 1} \right)}}} dx = \int {{x^2}dx} = \cfrac{{{x^3}}}{3} + C$

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