Two equal circle touch each other externally at C and AB is a common tangent to the circle. Then. `angleACB=…….`.

Three circles touch each other externally. The tangents at their point of contact meet at a point whose distance from a point of contact is 4. Then, the ratio of their product of radii to the sum of the radii is

In the given figure, two circles with centres A and B touch each other internally at point C. If AC = 8 cm and AB = 3cm, find the area of the shaded region.

In the given figure, PA and PB are tangent to the circle from an external point P. CD is another tangent touching the circle at Q. If PA=12cm and QC=QD=3cm, then find PC+PD.

AB is a chord of a circle with centre O, AC is a diameter and AT is the tangent at A as shown in the figure. Prove that angleBAT=angleACB .

Fill in the blanks (i) A tangent to a circle touches it in …... Point (s). (ii) A line intersecting a circle in two points is called a ….. (iii) Number of tangents can be drawn to a circle parallel to the given tangent is …. (iv) The common point of a Tangent to a circle and the circle is called ..... (v) We can draw ..... tangents to a given circle. (vi) A circle can have ..... parallel tangents at the most.

Three circles each of radius 1, touch one another externally and they lie between two parallel lines. The minimum possible distance between the lines is

In the given figure, two circles with centres A and B touch each other at C bisects the common tangent at P and Q.

Point a lies in the exterior of a circle with centre P and radius 7cm. A tangent through. A touches the circle at B . If AB =24 cm . Find PA.

Two different non-parallel lines meet the circle abs(z)=r . One of them at points a and b and the other which is tangent to the circle at c. Show that the point of intersection of two lines is (2c^(-1)-a^(-1)-b^(-1))/(c^(-2)-a^(-1)b^(-1)) .