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

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

Show that the square of the lengh of the subtangent at any point on the curve by^(2)=(x+a)^(3)( bne0) varies witht the length of the subnormal at that point

Find the length of the tangent, normal, subtangent and subnormal at the point (a,a) on the curve y^(2)=(x^(3))/(2a-x),(a gt 0)

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 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 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 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)

For the curve y^2=(x+a)^3 , the square of the subtangent is ….. Subnormal