hey guys
will be marking brainliest
Q.If the middle point of the base of a triangle is equidistant from its sides , prove that the triangle is isosceles
Answers
Answered by
4
Solution:
In △PQR and △PQS , we have
PR = PS
∠RPQ=∠SPQ (PQ bisects ∠P)
PQ = PQ (common)
△PQR=△PQS (By SAS congruence)
Hence Proved.
Therefore, QR = QS (CPCT
In △PQR and △PQS , we have
PR = PS
∠RPQ=∠SPQ (PQ bisects ∠P)
PQ = PQ (common)
△PQR=△PQS (By SAS congruence)
Hence Proved.
Therefore, QR = QS (CPCT
cool4official:
could u please send the figure
would help
yes I try
thanks
Answered by
2
Answer:
Step-by-step explanation:
In △PQR and △PQS , we have
PR = PS
∠RPQ=∠SPQ (PQ bisects ∠P)
PQ = PQ (common)
△PQR=△PQS (By SAS congruence)
Hence Proved.
Therefore, QR = QS (CPCT
Similar questions