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Question
If √1−x2n+√1−y2n=a(xn−yn) then √1−x2n1−y2n.dydx=
If √1−x2n+√1−y2n=a(xn−yn) then √1−x2n1−y2n.dydx=
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Solution
The correct option is C xn−1yn−1
Let xn=sin A;yn=sin B
After simplification, we get
sin−1(xn)−sin−1(yn)=2 cot−1(a)
diff. on both sides w.r.t.'x', we get
nxn−1√1−x2n−1√1−y2n.nyn−1.dydx=0⇒dydx=xn−1yn−1.√1−y2n1−x2n
xn−1yn−1
Let xn=sin A;yn=sin B
After simplification, we get
sin−1(xn)−sin−1(yn)=2 cot−1(a)
diff. on both sides w.r.t.'x', we get
nxn−1√1−x2n−1√1−y2n.nyn−1.dydx=0⇒dydx=xn−1yn−1.√1−y2n1−x2n
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