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Evaluate the integral.

Expand the quotient by partial fractions:

(x^2 + 9x + 13x + 42) / (x^2 + 9x + 13x + 42) (Simplify your answer)

âˆ«(8x * ln(5x)) dx =

Express the integrand as a sum of partial fractions and evaluate the integrals:

âˆ«(x+3) dx / (2x^3 – 8x)

Rewrite the integrand as the sum of partial fractions:

âˆ«(x+3) dx / (2x^3 – 8x)

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The following integral requires a preliminary step such as long division or a change of variables before using the method of partial fractions Evaluate the following integral:x4 +3 dx +2xFind the partial fraction decomposition of the integrand.x4 +3 1 dx= +2xdxEvaluate the indefinite integral_x4 +3 dx = X” + 2x

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Evaluate the integral using partial fractionsʃ (x + 1) dx / ( x^3 + x^2 – 6x )Format: ʃ A/x + ʃ B/(x – 2) + ʃ C/(x + 3)

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