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Question
If `y = e^(msin^-1x)`, prove that `(1 - x^2) (d^2y)/(dx^2) - x dy/dx = m^2y`
Theorem
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Solution
Given: `y = e^(msin^-1x)`
Differentiating w.r.t. x, we get
`dy/dx = e^(msin^-1x) d/dx (m sin^-1x)`
⇒ `dy/dx = y xx m/sqrt(1 - x^2)` ...(i)
or `sqrt(1 - x^2) dy/dx = my`
Squaring both LHS and RHS,
`(1 - x^2)(dy/dx)^2 = m^2y^2`
Differentiating w.r.t. x,
⇒ `(1 - x^2) xx 2(dy/dx)((d^2y)/dx^2) + (dy/dx)^2 (-2x) = m^2 sqrt(2y) dy/dx`
⇒ `(1 - x^2) (d^2y)/(dx^2) + dy/dx (-x) = m^2y`
⇒ `(1 - x^2) (d^2y)/(dx^2) - x dy/dx = m^2y`
Hence Proved.
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