Question

More Challenging Questions
Triangle XYZ is an isosceles triangle with XY = XZ, XS bisects LYXZ and meets
YZ at S. Prove that S is the mid point of YZ.​

Answer 1

Answer:

Since, XY=YZ

i. e., ΔXYZ is an isosceles triangle

Also, we know that the angles opposite to equal sides of an isosceles triangle are equal

Thus, if XY=YZ, then ∠Z=∠X.