please solve this question
Attachments:
Answers
Answered by
1
Step-by-step explanation:
sorry dear I am somewhat bad in maths
Answered by
0
ANSWER:-
Given:
P is a point on the bisector of ∠ABC. If the line through P, parallel to BA meets BC at Q.
To prove:
Prove that BPQ is an Isosceles triangle.
Proof:
Given that P is the point on the bisector of an ∠ABC, & PQ||AB.
Since,
BP is the bisector of ∠ABC=∠ABP=∠PBC........(1)
Now,
PQ||AB
∠BPQ = ∠ABP......(2) [Alternate Angles]
From (1) & (2), we get;
∠BPQ = ∠PBC
Or
∠BPQ = ∠PBQ
Now,
In ∆BPQ
∠BPQ = ∠PBQ
So,
∆BPQ is an Isosceles triangle.
Hence, proved.
Hope it helps ☺️
Attachments:
Similar questions