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प्रश्न
The value of `dy/dx` at x = `π/2`, where y is given by y = `x^sinx + sqrt(x)`, is ______.
पर्याय
`1 + 1/sqrt(2π)`
1
`1/sqrt(2π)`
`1 - 1/sqrt(2π)`
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उत्तर
The value of `dy/dx` at x = `π/2`, where y is given by y = `x^sinx + sqrt(x)`, is `underlinebb(1 + 1/sqrt(2π)`.
Explanation:
Given, y = `x^sinx + sqrt(x)`
Let y1 = xsinx and y2 = `sqrt(x)`
Now, y1 = xsinx
`\implies` log y1 = sin x log x
Differentiating w.r.t. x, we get
`1/y_1 dy_1/dx = cos x log x + 1/x sin x`
`\implies dy_1/dx = x^sinx [cos x log x + 1/x sin x]`
`(dy_1/dx)_(x = π/2) = (π/2)^(sin π/2) [cos π/2 log π/2 + 2/π sin π/2]`
= `π/2 xx 2/π`
= 1
Now, y2 = `sqrt(x)`
`\implies dy_2/dx = 1/(2sqrt(x))`
`(dy_2/dx)_(x = π/2) = 1/(2sqrt(π/2)) = 1/sqrt(2π)`
Since, y = y1 + y2
∴ At x = `π/2, dy/dx`
= `dy_1/dx + dy_2/dx`
`\implies dy/dx = 1 + 1/sqrt(2π)`
