explain it, the included side of angle p and angle Q in ∆ pqr is
Answers
Step-by-step explanation:
given : PQR is a triangle
to find : side between \angle P∠P and \angle R∠R
solution :
Included side.
Definition: The common leg of two angles. Usually found in triangles and other polygons, the included side is one that links two angles together. Think of it as being 'included' between two angles.
whereas
The angle made by two lines with a common vertex. When two lines meet at a common point (vertex) the angle between them is called the included angle.
thus ,
The side between \angle P∠P and \angle R∠R is PR
In triangle PQR angle P is equal to 26 and angle R is equal to 68 find the value of angle Q
its Isha
hope i help u
Answer:
Given, ∠A=∠Q, ∠B=∠R
Side AB lies between ∠A and ∠B and side QR lies between ∠Q and ∠R.
Hence, AB should be equal to QR as they are the corresponding sides.
The two triangles to be congruent by ASA rule.