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If x=sinθ and y=sin kθ, then (1-x2)y2-xy1-αy=0, for α=
If x=sinθ and y=sin kθ, then (1-x2)y2-xy1-αy=0, for α=
Updated On: Apr 26, 2024
- k
- -k
- -k2
- k2
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The Correct Option is C
Solution and Explanation
The correct answer is option (C): -k2
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Concepts Used:
Second-Order Derivative
The Second-Order Derivative is the derivative of the first-order derivative of the stated (given) function. For instance, acceleration is the second-order derivative of the distance covered with regard to time and tells us the rate of change of velocity.
As well as the first-order derivative tells us about the slope of the tangent line to the graph of the given function, the second-order derivative explains the shape of the graph and its concavity.
The second-order derivative is shown using \(f’’(x)\text{ or }\frac{d^2y}{dx^2}\).
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