What is the value of (dy/dx)^2 + 1 if x = a sin2θ(1 + cos2θ) and y = a cos2θ(1 – cos2θ)?(a) Tan^2θ(b) Cosec^2θ(c) Cot^2θ(d) Sec^2θThe question was asked in an internship interview.The query is from First Order Derivative in chapter Limits and Derivatives of Mathematics – Class 11

What is the value of (dy/dx)^2 + 1 if x = a sin2θ(1 + cos2θ) and y =

1.	What is the value of (dy/dx)^2 + 1 if x = a sin2θ(1 + cos2θ) and y = a cos2θ(1 – cos2θ)?(a) Tan^2θ(b) Cosec^2θ(c) Cot^2θ(d) Sec^2θThe question was asked in an internship interview.The query is from First Order Derivative in chapter Limits and Derivatives of Mathematics – Class 11
Answer» Correct choice is (d) Sec^2θ Explanation: Here, x = a sin2θ(1 + cos2θ) and y = a cos2θ(1 – cos2θ) => x = 2a cos^2θsin2θ and y = 2a sin^2θcos2θ Now differentiating x and y with RESPECT to θ we get, dx/dθ = 2a[cos^2θ2cos2θ + sin2θ2cos2θ cos2θ] = 4a cosθ (cosθ cos2θ – sinθ sin2θ ) = 4a cosθ cos(θ + 2θ) = 4a cosθ cos3θ dy/dθ = 2a[cos2θ*2cosθ sinθ + sin^2θ (-2sin2θ)] = 4a sinθ (cosθ cos2θ – sinθ sin2θ ) = 4a sinθ cos(θ + 2θ) = 4a sinθ cos3θ Thus, dy/dx = (dy/dθ)/(dx/dθ) = (= 4a cosθ cos3θ)/( 4a sinθ cos3θ) = tanθ So, (dy/dx)^2 + 1 = 1 + tan^2θ = sec^2θ

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