S is circle having center at (0,a) and radius b(b<a). A is a variable circle centered at (α,0) and touching circle S, meets the x− axis at M and N. If a point P on the y− axis such that ∠MPN is independent from α, then
A
∠MPN=cos−1(ba)
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B
P≡(0,√a2−b2)
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C
∠MPN=−cos−1(ba)
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D
P≡(0,−√a2−b2)
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Solution
The correct options are A∠MPN=cos−1(ba) BP≡(0,√a2−b2) DP≡(0,−√a2−b2) Let the radius of the variable circle is r
Now, √a2+α2=b+r Let the point P(0,k) We know that, M(α−r,0) and N(α+r,0) Slope of line, MP=kr−α NP=−kr+α Assuming ∠MPN=θtanθ=∣∣
∣
∣
∣∣kr−α+kr+α1−(kr−α⋅kr+α)∣∣
∣
∣
∣∣⇒tanθ=∣∣∣2rkr2−α2−k2∣∣∣⇒tanθ=∣∣
∣∣2k(√a2+α2−b)(√a2+α2−b)2−α2−k2∣∣
∣∣⇒tanθ=∣∣
∣
∣
∣∣k−b⎛⎜
⎜
⎜⎝√a2+α2−b√a2+α2+k2−a2−b22b⎞⎟
⎟
⎟⎠∣∣
∣
∣
∣∣ As θ is independent of α, k2−a2−b22b=−b⇒a2+b2−k2=2b2⇒k=±√a2−b2