(4) In the following figure, if TP and TQ are two touches on a circle with center 0 The lines are such that ZPOQ - 110 °, then the value of ZPTQ will be: Miri Mee Adhi 1. Block all (A) Prove that (B) Prove that 001100 Product of radius of base (C) If sin 3A-

If a line intersects two concenteric circles (circles with the same centre) with center O at A,B,C and D, prove that AB=CD (see figure).

In the given figure, two circles with centres O and O' touch externally at a point A. A line through A is drawn to intersect these circles at B and C. Prove that the tangents at B and C are parallel.

In the given figure, AR and RT are tangents to the circle with center O . B is the mid point of QS . If AOBT is a straight line, then which of the following is/are true? (1) OA=OR (2) OQTS is a cyclic quadrilateral (3) SQ=AR (4) All of these.

In Fig. 10.20, the sides A B ,\ B C and C A of triangle A B C touch a circle with centre O and radius r at P ,\ Q and R respectively. (FIGURE) Prove that: 1) AB + CQ = AC + BQ

A line is tangent to a circle if the length of perpendicular from the centre of the circle to the line is equal to the radius of the circle. For all values of theta the lines (x-3) cos theta + (y-4) sin theta = 1 touch the circle having radius. (A) 2 (B) 1 (C) 5 (D) none of these

A line is tangent to a circle if the length of perpendicular from the centre of the circle to the line is equal to the radius of the circle. For all values of theta the lines (x-3) cos theta + (y-4) sin theta = 1 touch the circle having radius. (A) 2 (B) 1 (C) 5 (D) none of these

In the figure, two circles with centers O and P intersect each other at points D and C. Line AB intersects the circle with centre O at points A and B and touches the circle with centre P at point E. Prove /_ADE+/_BCE=180^(@) .

In Fig. 10.20, the sides A B ,\ B C and C A of triangle A B C touch a circle with centre O and radius r at P ,\ Q and R respectively. (FIGURE) Prove that: 1) AB + CQ = AC + BQ 2) Area (ABC) = (r/2)*(Perimeter of ABC)

A variable triangle A B C is circumscribed about a fixed circle of unit radius. Side B C always touches the circle at D and has fixed direction. If B and C vary in such a way that (BD) (CD)=2, then locus of vertex A will be a straight line. (a)parallel to side BC (b)perpendicular to side BC (c)making an angle (pi/6) with BC (d) making an angle sin^(-1)(2/3) with B C