Let P be the point on the parabola, y^(2...

Let P be the point on the parabola, `y^(2)=8x` which is at a minimum distance from the center C of the circle , `x^(2)+(y+6)^(2)=1`. Then the equation of the circle, passing through C and having its canter at P is

Text Solution

Verified by Experts

The correct Answer is:

Centre of circle `x^(2) + (y + 6)^(2) = 1` is `C(0, -6)`
Let the coordinates of point P be `(2t^(2), 4t)`
Now, let D = CP
`= sqrt((2t^(2))^(2) + (4 t + 6)^(2))`
`implies D = sqrt(4 t^(4) + 16 t^(2) + 36 + 48 t)`
Squaring on both sides
`implies D^(2) (t) = 4 t^(4) + 16 t^(2) + 48 t + 36`
Let `F (t) = 4 t^(4) + 16 t^(2) + 48 t + 36`
For minimum, `F' (t) = 0`
`implies 16 t^(3) + 32 t + 48 = 0`
`implies t^(3) + 2t + 3 = 0`
`implies (t + 1) (t^(2) - t + 3) = 0 implies t = - 1`
Thus, coordinate of point P are (2, -4)
Now, `CP = sqrt(2^(2) + (-4 + 6)^(2)) = sqrt(4 + 4) = 2 sqrt(2)`
Hence, the required equation of circle is
`(x - 2)^(2) + (y + 4)^(2) = (2 sqrt(2))^(2)`
`implies x^(2) + 4 - 4x + y^(2) + 1 + 8y = 8`
`implies x^(2) + y^(2) - 4x + 8y + 12 = 0`

Similar Questions

Explore conceptually related problems

Let P be the point on the parabola, y^2=8x which is at a minimum distance from the centre C of the circle, x^2+(y+6)^2=1. Then the equation of the circle, passing through C and having its centre at P is : (1) x^2+y^2-4x+8y+12=0 (2) x^2+y^2-x+4y-12=0 (3) x^2+y^2-x/4+2y-24=0 (4) x^2+y^2-4x+9y+18=0

Find the equations of the circles passing through the point (-4,3) and touching the lines x+y=2 and x-y=2

Let S be the focus of the parabola y^2=8x and let PQ be the common chord of the circle x^2+y^2-2x-4y=0 and the given parabola. The area of the triangle PQS is -

If a circle passes through the point (a, b) and cuts the circle x^2 +y^2=k^2 orthogonally, then the equation of the locus of its center is

The point of intersection of the circle x^(2) + y^(2) = 8x and the parabola y^(2) = 4x which lies in the first quadrant is

Let P and Q be distinct points on the parabola y^2 = 2x such that a circle with PQ as diameter passes through the vertex O of the parabola. If P lies in the first quadrant and the area of the triangle Delta OPQ is 3 √2 , then which of the following is (are) the coordinates of P?

Find the parametric form of the equation of the circle x^2+y^2+p x+p y=0.

The equation of a circle is x^2+y^2=4. Find the center of the smallest circle touching the circle and the line x+y=5sqrt(2)

The coordinates of a point on the parabola y^2=8x whose distance from the circle x^2+(y+6)^2=1 is minimum is (2,4) (b) (2,-4) (18 ,-12) (d) (8,8)

Find the greatest distance of the point P(10 ,7) from the circle x^2+y^2-4x-2y-20=0

Let P be the point on the parabola, `y^(2)=8x` which is at a minimum distance from the center C of the circle , `x^(2)+(y+6)^(2)=1`. Then the equation of the circle, passing through C and having its canter at P is

Text Solution

Similar Questions

Recommended Questions