Asked by ricky
The following definite integral can be evaluated by subtracting F(B) - F(A), where F(B) and F(A) are found from substituting the limits of integration.
\int_{0}^{4} \frac{1600 x +1200 }{(2 x^2 +3 x +1)^5}dx
After substitution, the upper limit of integration (B) is :
and the lower limit of integration (A) is :
After integrating,
F(B) =
F(A) =
\int_{0}^{4} \frac{1600 x +1200 }{(2 x^2 +3 x +1)^5}dx
After substitution, the upper limit of integration (B) is :
and the lower limit of integration (A) is :
After integrating,
F(B) =
F(A) =
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