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प्रश्न
If `x = tan (1/a log y)` then show that `(1 + x^2) (d^2y)/(dx^2) + (2x - a) dy/dx = 0`.
बेरीज
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उत्तर
Given, `x = tan (1/a log y)`
a tan–1x = log y
⇒ `y = e^(a tan^-1x)`
Differentiate w.r.t. x on both sides
⇒ `dy/dx = e^(a tan^-1x) a/(1 + x^2)` ...(i)
⇒ `(1 + x^2) dy/dx = ae^(a tan^-1x)`
Again, differentiate w.r.t. x on both sides
`(1 + x^2) (d^2y)/(dx^2) + 2x dy/dx = ae^(a tan^-1x) * a/(1 + x^2)`
From equation (i),
`(1 + x^2) (d^2y)/(dx^2) + 2x dy/dx = a dy/dx`
⇒ `(1 + x^2) (d^2y)/(dx^2) + (2x - a) dy/dx = 0`
Hence Proved.
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