•
No spam ✘
Attachments:
Answers
Answered by
4
Answer:
Step-by-step explanation:
∠OPR = ∠OQR = 90° ---- 1
And in ΔOPR and ΔOQR
∠OPR = ∠ OQR = 90° (from equation 1)
OP = OQ (Radii of same circle)
And
OR = OR (common side)
ΔOPR = ΔOQR (ByRHS Congruency)
So, RP = RQ --- 2
And ∠ORP = ∠ORQ --- 3
∠PRQ = ∠ORP + ∠ORQ
Substitute ∠PQR = 120° (given)
And from equation 3 we get
∠ORP + ∠ORP = 120°
2 ∠ORP = 120°
∠ORP = 60°
And we know cos 0 = Adjacent/hypotenuse
So in ΔOPR we get
Cos ∠ORP = PR/OR
Cos 60° = PR/OR
½ = PR/OR (we know cos 60° = ½)
OR = 2PR
OR = PR + PR (substitute value from equation 2 we get)
OR = PR + RQ
Similar questions