True or False? If #(2x-3)(x+5)=8#, then either #2x-3=8# or #x+5=8#.
1 Answer
Aug 19, 2017
False.
Explanation:
You know that
#(2x - 3)(x+5) = 8#
Assuming that you have
#2x - 3 = 8#
you can say that this requires
#x + 5 = 1#
since you need
#overbrace( (2x-3))^(color(blue)(=8)) * overbrace((x+5))^(color(blue)(=1)) = 8#
This implies that you have
#2x - 3 = 8 implies x = 11/2 = 5.5#
which will make
#x + 5 = 5.5 + 5 != 1#
Now, let's assume that
#x + 5 = 8 #
This implies that you must have
#2x - 3 = 1#
since you need
#overbrace( (2x-3))^(color(blue)(=1)) * overbrace((x+5))^(color(blue)(=8)) = 8#
In this case, you have
#x + 5 = 8 implies x = 3#
which will make
#2x - 3 = 2 * 3 - 3 != 1#
Therefore, you can say that for
#(2x-3)(x+5) = 8#
you cannot have
#2x - 3 = 8 " " or " " x + 5 = 8#
