If triangle ABC and triangle PQR are similar triangles such that angle A = 31° and angle R = 69°, then angle Q is?
(a) 70°
(b) 100
(c) 90
(d) 80
pls send with solution
Answers
Answer:
option D will be the correct
∠Q = 80° if ΔABC ~ ΔPQR and ∠A = 31° and ∠R = 69°
Given:
- ΔABC ~ ΔPQR
- ∠A=31°
- ∠R=69°
To Find:
- ∠Q
Solution:
Concept to used:
Corresponding angles of similar triangles are equal
Sum of angles of a triangle is 180°
Step 1:
As ΔABC ~ ΔPQR
∠P = ∠A = 31°
Step 2:
Sum of angles of ΔPQR = 180° and substitute ∠P = 31° , ∠R = 69° and solve for ∠Q.
∠P + ∠Q + ∠R = 180°
=> 31° + ∠Q + 69° = 180°
=> ∠Q + 100° = 180°
=> ∠Q = 180° - 100°
=> ∠Q = 80°
Correct option is (d) 80°
∠Q = 80° if ΔABC ~ ΔPQR and ∠A = 31° and ∠R = 69°
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