The length of AC is 18 ft.
Step-by-step explanation:
By the given diagram,
AM = MB and CN = NB
M and N are the mid points of the sides AB and CB respectively,
Thus, by the mid point theorem,
MN â•‘ AC,
By the alternative interior angle theorem,
∠BMN ≅ ∠BAC
∠BNM ≅ ∠BCA
Thus, by AA similarity postulate,
ΔBMN ≅ ΔBAC
By the property of similar triangles,
![\frac{BM}{BA}=\frac{MN}{AC}](/tpl/images/0491/7300/9f54a.png)
![\frac{BM}{BM+MA}=\frac{MN}{AC}](/tpl/images/0491/7300/d2135.png)
![\frac{4}{4+4}=\frac{9}{AC}](/tpl/images/0491/7300/76241.png)
![\frac{4}{8}=\frac{9}{AC}](/tpl/images/0491/7300/eb2f4.png)
![4AC=72\implies AC = 18\text{ ft}](/tpl/images/0491/7300/27a8f.png)
Thus, The length of AC is 18 ft.