`int (x+2)/(x^2+5x) dx`
To solve using partial fraction method, the denominator of the integrand should be factored.
`(x+2)/(x^2+5x) = (x + 2)/(x(x+5))`
Then, express it as sum of fractions.
`(x+2)/(x(x+5)) = A/x + B/(x +5)`
To determine the values of A and B, multiply both sides by the LCD of the fractions present.
`x(x+5)*(x+2)/(x(x+5)) = (A/x + B/(x +5))*x(x+5)`
`x+2=A(x+5)+Bx`
Then, assign values to x in which either x or x+5 will become zero.
So,...
`int (x+2)/(x^2+5x) dx`
To solve using partial fraction method, the denominator of the integrand should be factored.
`(x+2)/(x^2+5x) = (x + 2)/(x(x+5))`
Then, express it as sum of fractions.
`(x+2)/(x(x+5)) = A/x + B/(x +5)`
To determine the values of A and B, multiply both sides by the LCD of the fractions present.
`x(x+5)*(x+2)/(x(x+5)) = (A/x + B/(x +5))*x(x+5)`
`x+2=A(x+5)+Bx`
Then, assign values to x in which either x or x+5 will become zero.
So, plug-in x=0 to get the value of A.
`0+2=A(0+5)+B(0)`
`2=5A`
`2/5=A`
Also, plug-in x=-5 to get the value of B.
`-5+2=A(-5+5)+B(-5)`
`-3=A(0)+B(-5)`
`-3=-5B`
`3/5=B`
So the partial fraction decomposition of the integrand is:
`int (x+2)(x^2+5x)dx`
`=int (x+2)/(x(x+5))dx`
`= int (2/(5x) +3/(5(x+5)))dx`
Then, express it as sum of two integrals.
`= int 2/(5x)dx + int 3/(5(x+5))dx`
`= 2/5 int 1/xdx + 3/5 int 1/(x+5)dx`
To take the integral of this, apply the formula `int 1/u du = ln|u|+C` .
`=2/5ln|x| + 3/5ln|x+5| + C`
Therefore, `int (x+2)/(x^2+5x)==2/5ln|x| + 3/5ln|x+5| + C` .
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