△ABC is an isosceles triangle in which AB = AC = 13 cm. If area of △ADC is 169 m2, then area of △EFB is equal to
324 cm2
In ΔADC and ΔEFB,
∠ACD=∠EBF
(Since base angles of an isosceles triangle are equal)
∠ADC=∠EFB (given 90∘)
ΔADC ∼ ΔEFB (by AA similarity criterion)
So, ar(ΔADC)ar(ΔEFB)=AC2(EB)2
(Since the ratio of the areas of two similar triangles is equal to the square of the ratio of their corresponding sides).
⇒169 cm2ar(ΔEFB)=132(EC+CB)2
⇒169 cm2ar(ΔEFB)=132(8+10)2
⇒ar(ΔEFB)=(18×18)×169(13)2=324 cm2