How do you use partial fraction decomposition to decompose the fraction to integrate #(7)/(x^2+13x+40)#?

1 Answer
Mar 7, 2018

The integral equals #7/3ln|(x + 5)/(x +8)| + C#

Explanation:

We wish to find factors in the denominator. The trick is to find two numbers that multiply to #40# and add to #13#. Clearly these will be #8# and #5#.

#I = int 7/((x+ 5)(x+ 8))dx#

Now we can decompose in partial fractions.

#A/(x+ 5) + B/(x +8) = 7/((x +5)(x + 8))#

#A(x + 8) + B(x + 5) = 7#

#Ax + 8A + Bx + 5B = 7#

#(A + B)x + (8A + 5B) = 7#

Now we have a system of equations.

#{(A + B = 0), (8A + 5B = 7):}#

Substituting the first equation into the second we see that

#8A + 5(-A) = 7#

#3A = 7#

#A = 7/3#

Now clearly #B = -7/3# because #A+ B =0#. The integral becomes:

#I = int7/(3(x + 5)) - 7/(3(x + 8)) dx#

#I= 7/3ln|x +5| - 7/3ln|x + 8| + C#

#I = 7/3ln|(x + 5)/(x +8)| + C#

Hopefully this helps!