the sum of the areas of two circles with radii R1 and R2 is equal to the area ofa circle of radius R, then

If the sum of the areas of two circles with radii R1 and R2 is equal to the area ofa circle of radius R, then(A) R1 + R 2 = R (B) 21R + 22R = R 2(C) R1 + R 2 < R (D) 2 2 21 2R R R

Two equal circles of radius r intersect such that each passes through the centre of the other. The length of common chord of the circles is

(i) Area enclosed by two concentric circles with radius R and r respectively such that R > r is π(R2 – r2).(ii) The length of tangents drawn from an external point to a circle are not equal.(iii) There is one and only one tangent at any point on the circumference of a circle.(iv) Ratio of the area of the sector of a circle with central angle 90° to the area of that circle is 1 : 4.A (i)-F, (ii)-F, (iii)-F, (iv)-F B (i)-F, (ii)-T, (iii)-F, (iv)-F C (i)-T, (ii)-F, (iii)-T, (iv)-T D (i)-T, (ii)-T, (iii)-T, (iv)-T

The area of circle A is equal to the sum of the area of two small circles with diameters of 6cm and 8cm. Then the diameter of circle A will be? 5 10 15 20

The areas of two sectors of two different circles with equal corresponding arc lengths are equal. Is this statement true? Why?