How do you solve #\frac { 2} { 4x + 1} = \frac { - 3} { x - 8}#?

1 Answer
Jul 8, 2018

#x = 13/14#

Explanation:

Given: #2/(4x + 1) = (-3)/(x-8)#

One way is to multiply the equation by the common denominator.

Common denominator #= (4x+1)(x-8)#

#cancel(4x+1)(x-8) * 2/cancel(4x + 1) = (4x+1)cancel(x-8) * (-3)/cancel(x-8)#

This reduces to #" "2(x-8) = -3(4x+1)#

Distribute: #" "2x - 16 = -12x -3#

Add #12x# on both sides: #" "14x - 16 = -3#

Add #16# on both sides: #" "14x = 13#

#x = 13/14#

CHECK:

#2/(4/1 * 13/14 + 1) = 2/(52/14 + 14/14) = 2/(66/14) = 2/1 * 14/66 = 28/66 = 14/33#

#(-3)/(13/14 - 8/1*14/14) = (-3)/(13/14 - 112/14)= (-3)/(-99/14) = 3/1 * 14/99 = 42/99 = 14/33#