[" Prove that the two parabolas "y^(2)=4...

[" Prove that the two parabolas "y^(2)=4ax" and "x^(2)=4by" intersect (other than the origin) "],[" at an angle of "Tan^(-1)((3a^(13)b^(1/3))/(2(a^(2/3)+b^(2/3))))" (Mar-14) "]

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Prove that two parabolas y_(2)=4ax "and" x^(2)=4by intersect (other than the origin ) at an angle of Tan^(-1)[(3a^(1//3)b^(1//3))/(2(a^(2//3)+b^(2//3)))] .

Prove that the two parabolas y^(2)=4ax and x^(2)=4by intersects at an angle of tan^(1)[(3a^((1)/(3))b^((1)/(3)))/(2(a^((2)/(3))+b^((2)/(3))))]

Find the angle between the parabolas y^2=4a x and x^2=4b y at their point of intersection other than the origin.

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If the tangents to the parabola y^(2)=4ax at (x_(1),y_(1)),(x_(2),y_(2)) intersect at (x_(3),y_(3)) then

The parabolas y^(2)=4ac and x^(2)=4by intersect orthogonally at point P(x_(1),y_(1)) where x_(1),y_(1)!=0 provided (A)b=a^(2)(B)b=a^(3)(C)b^(3)=a^(2)(D) none of these

The parabolas y^2=4ax and x^2=4by intersect orthogonally at point P(x_1,y_1) where x_1,y_1 != 0 provided (A) b=a^2 (B) b=a^3 (C) b^3=a^2 (D) none of these

If the two parabolas y^2 = 4x and y^2 = (x-k) have a common normal other than x-axis, then value of k can be (A) 1 (B) 2 (C) 3 (D) 4

[" Prove that the two parabolas "y^(2)=4ax" and "x^(2)=4by" intersect (other than the origin) "],[" at an angle of "Tan^(-1)((3a^(13)b^(1/3))/(2(a^(2/3)+b^(2/3))))" (Mar-14) "]

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