Mathematics
In the given figure, PQ is a chord of a circle with center O and PT is the tangent at point P. If angle QPT = 60°, then find angle PRQ where R is a point on the circle.
Answer
From figure,
⇒ ∠QPT + ∠QPA = 180° [Linear pairs]
⇒ ∠QPA = 180° - 60° = 120°.
We know that,
The angle formed between the tangent and the chord through the point of contact of the tangent is equal to the angle formed by the chord in the alternate segment.
∴ ∠PRQ = ∠QPA = 120°.
Hence, ∠PRQ = 120°.
Related Questions
Three coins are tossed once. Find the probability of getting :
(i) 3 heads
(ii) exactly two heads
(iii) atleast 2 heads.
The following table shows a record of the weights, in kilogram, of 100 pupil. Find the mean weight.
Weight Number of pupils 50-53 15 53-56 18 56-59 20 59-62 25 62-65 16 65-68 6 504 metallic cones, each of diameter 3.5 cm and height 3 cm, are melted and recast into a sphere. Find the diameter of sphere so formed.
Solve :
13x - 5 < 15x + 4 < 7x + 12, x ∈ R. Represent the solution set on a real number line.