If two parabolas y2=4a(x - k) and x2=4a(y - k) have only one common point P, then the coordinates of P are

Question

If two parabolas y2=4a(x - k) and x2=4a(y - k) have only one common point P, then the coordinates of P are (A) (2 k , 2 k) (B) (k , k) (C) (a , 2 k) (D) (k , 2 a)

Tardigrade Admin · Accepted Answer

Parabolas y2=4a(x - k) and x2=4a(y - k) touch each other at the line y=x ( ∵ both parabolas are inverse of each other) ⇒ y=x is the common tangent at P ⇒ we get point P by solving y2=4a(x - k) and y=x ⇒ point of contact P=(2 a , 2 a) ⇒ (2 a)2=4a(2 a - k)⇒ k=a⇒ P=(2 k , 2 k)

Q. If two parabolas $y^{2} = 4 a (x - k)$ and $x^{2} = 4 a (y - k)$ have only one common point $P,$ then the coordinates of $P$ are

$(2 k, 2 k)$

$(k, k)$

$(a, 2 k)$

$(k, 2 a)$

Q. If two parabolas y2=4a(x−k) and x2=4a(y−k) have only one common point P, then the coordinates of P are

(2k,2k)

(k,k)

(a,2k)

(k,2a)

Parabolas y2=4a(x−k) and x2=4a(y−k) touch each other at the line y=x ( ∵ both parabolas are inverse of each other) ⇒y=x is the common tangent at P ⇒ we get point P by solving y2=4a(x−k) and y=x ⇒ point of contact P=(2a,2a) ⇒(2a)2=4a(2a−k)⇒k=a⇒P=(2k,2k)

Q. If two parabolas $y^{2} = 4 a (x - k)$ and $x^{2} = 4 a (y - k)$ have only one common point $P,$ then the coordinates of $P$ are

$(2 k, 2 k)$

$(k, k)$

$(a, 2 k)$

$(k, 2 a)$