Tangent is drawn at any point `(x_1, y_1)` other than the vertex on the parabola `y^2=4a x` . If tangents are drawn from any point on this tangent to

Question

Tangent is drawn at any point `(x_1, y_1)` other than the vertex on the parabola `y^2=4a x` . If tangents are drawn from any point on this tangent to

Tangent is drawn at any point `(x_1, y_1)` other than the vertex on the parabola `y^2=4a x` . If tangents are drawn from any point on this tangent to the circle `x^2+y^2=a^2` such that all the chords of contact pass through a fixed point `(x_2,y_2),` then `x_1a ,x_2` in GP (b) `(y_1)/2,a ,y_2` are in GP `-4,(y_1)/(y_2),x_1//x_2` are in GP (d) `x_1x_2+y_1y_2=a^2`
A. `x_(1),a,x_(2)` are in GP
B. `(y_(1))/(2),a,y_(2)` are in GP
C. `-4(y_(1))/(y_(2)),(x_(1))/(x_(2))` are in GP
D. `x_(1)x_(2)+y_(1)y_(2)=a^(2)`

Monjur Alahi

5 views

2025-01-04 04:42

1 Answers

Related Questions

If `x_1a n dx_2` are the roots of the equation `e^2 x^(lnx)=x^3` with `x_1> x_2,` then `x_1=2x_2` (b) `x_1=x2 2` `2x_1=x2 2` (d) `x1 2=x2 3`

2 Answers 4 Views

If each of the points `(x-1,4),(-2,y_1)` lies on the line joining the points `(2,-1)a n d(5,-3)` , then the point `P(x_1,y_1)` lies on the line. `6(x+

2 Answers 4 Views

Statement 1 : If from any point `P(x_1, y_1)` on the hyperbola `(x^2)/(a^2)-(y^2)/(b^2)=-1` , tangents are drawn to the hyperbola `(x^2)/(a^2)-(y^2)/(

2 Answers 5 Views

If the point `x_1+t(x_2-x_1),y_1+t(y_2-y_1)` divides the join of `(x_1,y_1)` and `(x_2,y_2)` internally then

2 Answers 5 Views

Tangents are drawn to the parabola `y^2=4a x` at the point where the line `l x+m y+n=0` meets this parabola. Find the point of intersection of these t

2 Answers 5 Views

Tangent is drawn at any point `(p ,q)` on the parabola `y^2=4a xdot` Tangents are drawn from any point on this tangant to the circle `x^2+y^2=a^2` , s

2 Answers 5 Views

Double ordinate `A B` of the parabola `y^2=4a x` subtends an angle `pi/2` at the focus of the parabola. Then the tangents drawn to the parabola at `Aa

2 Answers 6 Views

`y=x+2` is any tangent to the parabola `y^2=8xdot` The point `P` on this tangent is such that the other tangent from it which is perpendicular to it i

2 Answers 6 Views

Normals at two points `(x_1y_1)a n d(x_2, y_2)` of the parabola `y^2=4x` meet again on the parabola, where `x_1+x_2=4.` Then `|y_1+y_2|` is equal to `

2 Answers 4 Views

The endpoints of two normal chords of a parabola are concyclic. Then the tangents at the feet of the normals will intersect at tangent at vertex of th

2 Answers 8 Views

Salim Ahmed Kawsar · Accepted Answer · 2023-02-05T15:29:48+06:00

Correct Answer - B::C::D
2,3,4
Let `(x_(1),y_(1))-=(at^(2),2at)`.
Tangent at this point is `ty=x+at^(2)`.
Any point on this tangent is `((h,(h+at^(2))//t)`.
The chord of contact of this point with respect to the circle
`x^(2)+y^(2)=a^(2)` is
`hx+(h+at^(2))/(t)y=a^(2)`
`or(aty-a^(2))+h(x+(y)/(t))=0`
which is a family of straight lines passing through the point of intersection of
`ty-a=0andx+(y)/(t)=0`
So, the fixed point is `(-a//t^(2),a//t)`. Therefore,
`x_(2)=-(a)/(t^(2)),y_(2)=(a)/(t)`
Clearly, `x_(1)x_(2)=-a^(2),y_(1)y_(2)=2a^(2)`
Also, `(x_(1))/(x_(2))=-t^(4)`
and `(y_(1))/(y_(2))=2t^(2)`
`or4(x_(1))/(x_(2))+((y_(1))/(y_(2)))^(2)=0`