How do you divide #(9x^3+5)div(2x-3)# using long division?

1 Answer
Aug 14, 2018

#9/2 x^2 + 27/4 x + 81/8 + (1947/72)/(2 x - 3)#

Explanation:

First, let's get rid of coefficients and multiply them in later. This yields
#(x^3 + 5/9)/(x-3/2) #

Long division tasks us with asking how many times things go into each other evenly. With polynomials, we just begin with their leading terms.

For this instance, we start with #x^2#, since #x# goes into #x^3# #x^2# times. That means what is left over is
#R = x^3 + 5/9 - x^2(x- 3/2) = 3/2 x^2 + 5/9 #
And therefore, our next value is #3/2 x#, since #x# goes into #3x^2# that many times.
#R' = 3/2 x^2 + 5/9 - 3/2 x (x - 3/2) = 9/4 x + 5/9 #
For our final step, we have #9/4# for the same reasons as above:
#R'' = 9/4 x + 5/9 - 9/4 (x - 3/2) = 5/9 + 27/8 = 273/72 #

Therefore, multiplying back in the #9/2# from the beginning, our final answer is
#9/2 x^2 + 27/4 x + 81/8 + (1947/72)/(2x-3) #