PQR is a triangle with altitudes QM and RN to sides PR and PQ respectively are
equal. Show that
i) ∆ ≅ ∆
ii) =
Answers
Answer:
Triangle pqr is an isosceles triangle with pq is equal to pr and b and c are point on qr such that q is equal to br show that in) triangle pqr is congruent to prc ii) pb is equal to pr
Step-by-step explanation:
Triangle pqr is an isosceles triangle with pq is equal to pr and b and c are point on qr such that q is equal to br show that in) triangle pqr is congruent to prc ii) pb is equal to prTriangle pqr is an isosceles triangle with pq is equal to pr and b and c are point on qr such that q is equal to br show that in) triangle pqr is congruent to prc ii) pb is equal to prTriangle pqr is an isosceles triangle with pq is equal to pr and b and c are point on qr such that q is equal to br show that in) triangle pqr is congruent to prc ii) pb is equal to prTriangle pqr is an isosceles triangle with pq is equal to pr and b and c are point on qr such that q is equal to br show that in) triangle pqr is congruent to prc ii) pb is equal to prTriangle pqr is an isosceles triangle with pq is equal to pr and b and c are point on qr such that q is equal to br show that in) triangle pqr is congruent to prc ii) pb is equal to pr