A cone is made from a circular sheet of radius `sqrt3` by cutting out a sector and giving the cut edges of the remaining piece together. The maximum volume attainable for the cone is (A) `pi/3` (B) `pi/6` (C) `(2pi)/3` (D) `3sqrt(3)pi`

A cone is made from a circular sheet of radius sqrt(3) by cutting out a sector and giving the cut edges of the remaining piece together .The maximum volume attainable for the cone is

A cone is made from a circular sheet of radius sqrt(3) by cutting out a sector and keeping the cut edges of the remaining piece together. If the maximum volume attainable for the cone is (p pi)/(q) .(where p/q is in its lowest form).Then the value of p+q is

In the sides of a triangle are in the ratio 1:sqrt(3):2, then the measure of its greatest angle is (a) pi/6 (b) pi/3 (c) pi/2 (d) (2pi)/3

The value of sin^(-1)(-sqrt(3)/2)\ is: (A) (-pi)/3 (B) (-2pi)/3 (C) (4pi)/3 (D) (5pi)/3

If slant height of a right circular cone is 3 cm then the maximum volume of cone is (a) 2sqrt(3) pi cm^(3) (b) 4sqrt(3) pi cm^(3) (c) (2+sqrt(3)) pi cm^(3) (d) (2-sqrt(3)) pi cm^(3)

If slant height of a right circular cone is 3 cm then the maximum volume of cone is (a) 2sqrt(3) pi cm^(3) (b) 4sqrt(3) pi cm^(3) (c) (2+sqrt(3)) pi cm^(3) (d) (2-sqrt(3)) pi cm^(3)

tan^(-1)sqrt(3)-sec^(-1)(-2) is equal to(A) pi (B) -pi/3 (C) pi/3 (D) (2pi)/3

tan^(-1)sqrt(3)-sec^(-1)(-2) is equal to(a) pi (B) -pi/3 (C) pi/3 (D) (2pi)/3

The maximum volume (in cu.m) of the right circular cone having slant height 3 m is a) 3sqrt3 pi b) 6pi c) 2sqrt3pi d) 4/3pi

Principal value of cot^-1(-1/(sqrt3)) is a) pi/3 b) -pi/3 c) pi/6 d) 2pi/3