Answer:
Length of AC = 48 units.
Step-by-step explanation:
Given in parallelogram ABCD , diagonals AC and B intersects at a point E.
Length of AE = [tex]x^2-16[/tex] units and CE = 6x.
We have to find the length of AC.
According to the property of parallelogram:
Diagonals are intersecting each other at their midpoint.
Since, E is the midpoint AC ;
so, AE = CE
[tex]x^2-16[/tex] =6x
or we can write this as;
[tex]x^2-6x-16[/tex]=0
[tex]x^2-8x+2x-16[/tex]=0
[tex]x(x-8)+2(x-8)[/tex]=0
[tex](x-8)(x+2)[/tex] = 0
Zero product property states that if ab = 0 , then either a=0 or b =0.
By zero product property, we have;
(x-8) = 0 and (x+2) = 0
x = 8 and x = -2
Since, length x cannot be negative so we ignore x = -2.
then;
x = 8
AC = [tex]x^2-16[/tex] = [tex]8^2 -16 = 64- 16 =48[/tex] units.
Therefore, the length of AC = 48 units.
