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Question

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=cos1(ba)
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B
P(0,a2b2)
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C
MPN=cos1(ba)
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D
P(0,a2b2)
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Solution

The correct options are
A MPN=cos1(ba)
B P(0,a2b2)
D P(0,a2b2)
Let the radius of the variable circle is r

Now,
a2+α2=b+r
Let the point P(0,k)
We know that,
M(αr,0) and N(α+r,0)
Slope of line,
MP=krα
NP=kr+α
Assuming
MPN=θtanθ=∣ ∣ ∣ ∣krα+kr+α1(krαkr+α)∣ ∣ ∣ ∣tanθ=2rkr2α2k2tanθ=∣ ∣2k(a2+α2b)(a2+α2b)2α2k2∣ ∣tanθ=∣ ∣ ∣ ∣kb⎜ ⎜ ⎜a2+α2ba2+α2+k2a2b22b⎟ ⎟ ⎟∣ ∣ ∣ ∣
As θ is independent of α,
k2a2b22b=ba2+b2k2=2b2k=±a2b2

P(0,±a2b2)
Now,
tanθ=kb.tanθ=a2b2bcosθ=baMPN=θ=cos1(ba)

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