Let the tangents at the points A(4,-11) and B(8,-5) on the circle x2+y2-3 x+10 y-15=0, intersect at the point C. Then the radius of the circle, whose centre is C and the line joining A and B is its tangent, is equal to

Question

Let the tangents at the points A(4,-11) and B(8,-5) on the circle x2+y2-3 x+10 y-15=0, intersect at the point C. Then the radius of the circle, whose centre is C and the line joining A and B is its tangent, is equal to (A) 2 √13 (B) (2 √13/3) (C) √13 (D) (3 √3/4)

Tardigrade Admin · Accepted Answer

Equation of tangent at A (4, -11) on circle is ⇒ 4 x-11 y-3((x+4/2))+10((y-11/2))-15=0 ⇒ 5 x-12 y-152=0 ldots ldots(1) Equation of tangent at B (8,-5) on circle is ⇒ 8 x-5 y-3((x+8/2))+10((y-5/2))-15=0 ⇒ 13 x-104=0 ⇒ x=8 put in (1) ⇒ y =(28/3) r =|(3.8+(2.28/3)-34/√13)|=(2 √13/3)

Q. Let the tangents at the points $A (4, - 11)$ and $B (8, - 5)$ on the circle $x^{2} + y^{2} - 3 x + 10 y - 15 = 0$ , intersect at the point $C$ . Then the radius of the circle, whose centre is $C$ and the line joining $A$ and $B$ is its tangent, is equal to

$213$

$\frac{2 13}{3}$

$13$

$\frac{3 3}{4}$

Q. Let the tangents at the points A(4,−11) and B(8,−5) on the circle x2+y2−3x+10y−15=0, intersect at the point C. Then the radius of the circle, whose centre is C and the line joining A and B is its tangent, is equal to

213​

3213​​

13​

433​​

Q. Let the tangents at the points $A (4, - 11)$ and $B (8, - 5)$ on the circle $x^{2} + y^{2} - 3 x + 10 y - 15 = 0$ , intersect at the point $C$ . Then the radius of the circle, whose centre is $C$ and the line joining $A$ and $B$ is its tangent, is equal to

$213$

$\frac{2 13}{3}$

$13$

$\frac{3 3}{4}$