In the figure, PQ is the tangent from P to the circle QRS with SR as its diameter. If QPR = \(\theta\)o and RQP = \(\phi\)o, which of the following relationships between \(\theta\)o and \(\phi\)o is correct
a
\(\theta\)o + \(\phi\)o = 902
b
\(\phi\)o = 902 - 2\(\theta\)o
c
\(\theta\)o = \(\phi\)o
d
\(\phi\)o = 2\(\theta\)o
e
\(\theta\)o + 2\(\phi\)o
Explanation
Correct Option
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FAECSB7610542
1 year ago
I guess there's a little error there, but I think it should be this way; in the diagram I posted below:
x = ϕ° + θ°, but instead in the solution they did 180° - ϕ° = θ° + ϕ°, which is wrong, if you should look at the diagram below, in ∆QPR,
