Question

X and y are mid points of ac and ab qp is parallel to bc and cyq and bxp are straight lines prove that area abp is equal to area acq

Answer 1

use Thales theorem. or Areas of similar triangle theorem

Answer 2

Answer consider a triangle b y x and triangle c y x

these two triangles lie on the same base and between the same parallels

Therefore the area of the two triangles are equal

We have to prove that area of ABP is equal to area of ACQ

Area of a y x is common for the both triangles

We know that area of QA and area of apx are equal

therefore area of triangle cube y + area of a x + area of x y z is equal to the area of a cube + the area of aob

Therefore proved,................

Step-by-step explanation: