If the normal to the ellipse x^2 + 3y^2 = 12 at the point be inclined at 60° to the major axis, then at what angle does the line joining the curve to the point is inclined to the same axis?(a) 90°(b) 45°(c) 60°(d) 30°I got this question during an online exam.My question is taken from Calculus Application topic in section Application of Calculus of Mathematics – Class 12

If the normal to the ellipse x^2 + 3y^2 = 12 at the point be inclined

1.	If the normal to the ellipse x^2 + 3y^2 = 12 at the point be inclined at 60° to the major axis, then at what angle does the line joining the curve to the point is inclined to the same axis?(a) 90°(b) 45°(c) 60°(d) 30°I got this question during an online exam.My question is taken from Calculus Application topic in section Application of Calculus of Mathematics – Class 12
Answer» Right answer is (d) 30° The best I can explain: Given, x^2 + 3y^2 = 12 Or x^2/12 + y^2/4 = 1 Differentiating both sides of (1) with respect to y we get, 2x(dx/dy) + 32y = 0 Or dx/dy = -3y/x Suppose the normal to the ellipse (1) at the point P(√12cosθ, 2sinθ) makes an angle 60° with the major AXIS. Then, the SLOPE of the normal at P is tan60° Or -[dx/dy]P = tan60° Or -(-(3*2sinθ)/√12cosθ) = √3 Or √3tanθ = √3 Or tanθ = 1 Now the centre of the ellipse (1) is C(0, 0) Therefore, the slope of the line CP is, (2sinθ – 0)/(√12cosθ – 0) = (1/√3)tanθ = 1/√3 [as, tanθ = 1] Therefore, the line CP is inclined at 30° to the major axis.

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