How do you solve #\sqrt { 5x + 20} - 7= 2x - 4#?

1 Answer
May 31, 2017

#x = 1#

Explanation:

Given: #sqrt(5x + 20) - 7 = 2x - 4#

Isolate the square root function (radical) by adding #7# to both sides:
#sqrt(5x + 20) = 2x - 4 + 7#

#sqrt(5x + 20) = 2x +3#

Square both sides:

#5x + 20 = (2x+3)^2#

Use #(a + b)^2 = a^2 + 2ab + b^2# to distribute:

#5x + 20 = 4x^2 + 12x + 9#

Subtract #5x and 20# from both sides:

#0 = 4x^2 +7x -11#

Factor to solve:

#(4x + 11)(x - 1) = 0#

#4x + 11 = 0; " " x - 1 - 0#

#4x = -11; " " x = 1#

#x = -11/4#

You always need to check the solutions in the original equation to see if the are actually a valid solution.

CHECK: #x = 1#

#sqrt(5*1 + 20) - 7 = 2*1 - 4#

#sqrt(25) - 7 = 2 - 4#

#5 - 7 = -2#

#-2 = -2# TRUE #x = 1# is a valid solution

CHECK: #x = -11/4#

#sqrt(5*-11/4 + 20) - 7 = 2*-11/4 - 4#

#sqrt(-55/4 + 20) - 7 = -22/4 - 4#

#sqrt(-13.75 + 20) - 7 = -5.5 - 4#

#sqrt(6.25) - 7 = -9.5#

#2.5 - 7 = -9.5#

#-4.5 != -9.5# FALSE, so #x = -11/4# is not a valid solution