If the arcs of the same length in two circles of radii `r_1 and r_2` respectively subtend angle `pi/3 and 120^@` at the centre ,then the value of `(r_1+r_2)/(r_1-r_2)` will be

If r/(r_1)=(r_2)/(r_3), then

If theta_1,theta_2, theta_3 radians be the angles subtended by the arcs of lengths l_1,l_2,l_3 at the centres of the circle whose radii are r_1,r_2,r_3 respectively then show that the angle subtended at the centre by the arc of length (l_1+l_2+l_3) of a circle whose radius is (r_1+r_2+r_3) will be (r_1theta_1+r_2theta_2+r_3theta_3)/(r_1+r_2+r_3) radian.

If 16C_r=^16C_(2r+1) then the value of r will be

In any triangle ABC, find the least value of (r_(1) r_(2)r_(3))/(r^3)

In any triangle, the minimum value of r_1r_2r_3//r^3 is equal to

The circles having radii r_1 and r_2 intersect orthogonally. Length of their common chord is

In DeltaABC, the value of ((r_1+r_2)(r_2+r_3)(r_3+r_1))/(R(s)^(2) is