~If the relation between subnormal SN and subtangent ST at any point S on the curve _(by^(2))=(x+a)^(3) is p(SN)= q(ST)^(2) then (p)/(q) is equal to~

The relation between Q_(3) and P_(75) is

If the subnormal at any point on the curve y =3 ^(1-k). x ^(k) is of constant length the k equals to :

If z = x - iy and z'^(1/3) = p +iq, then 1/(p^2+q^2)(x/p+y/q) is equal to

If z = x - iy and z'^(1/3) = p +iq, then 1/(p^2+q^2)(x/p+y/q) is equal to

If x^(2) - 3x + 2 is factor of x^(4) - px^(2) + q then 2q - p is equal to

If ST and SN are the lengths of subtangents and subnormals respectively to the curve by^2 = (x + 2a)^3. then (ST^2)/(SN) equals (A) 1 (B) (8b)/27 (C) (27b)/8 (D) ((4b)/9)

If in an A.P, S_n=n^2p and S_m=m^2p , then S_p is equal to

A is (-2, 0) and P is any point on the curve given by y^(2)=16x . If Q bisect AP, find the equation of the locus of Q.

Prove the relation, s_t=u + at - 1/2 a.

The curve y=f(x) in the first quadrant is such that the y - intercept of the tangent drawn at any point P is equal to twice the ordinate of P If y=f(x) passes through Q(2, 3) , then the equation of the curve is