The largest area of the trapezium inscribed in a semi-circle or radius `R ,` if the lower base is on the diameter, is `(3sqrt(3))/4R^2` (b) `(sqrt(3))/2R^2` `(3sqrt(3))/8R^2` (d) `R^2`

The largest area of the trapezium inscribed in a semi-circle or radius R , if the lower base is on the diameter, is (a) (3sqrt(3))/4R^2 (b) (sqrt(3))/2R^2 (3sqrt(3))/8R^2 (d) R^2

The largest area of the trapezium inscribed in a semi-circle or radius R , if the lower base is on the diameter, is (a) (3sqrt(3))/4R^2 (b) (sqrt(3))/2R^2 (3sqrt(3))/8R^2 (d) R^2

The largest area of the trapezium inscribed in a semi-circle or radius R , if the lower base is on the diameter, is (a) (3sqrt(3))/4R^2 (b) (sqrt(3))/2R^2 (c) (3sqrt(3))/8R^2 (d) R^2

The laregest area of a trapezium inscibed in a semi - circle of radius R , if the lower base in on the diameter , is

The largest area of the trapezium inscribed in a semi-circle or radius R, if the lower base is on the diameter is (3sqrt(3))/(4)R^(2)( b) (sqrt(3))/(2)R^(2)(3sqrt(3))/(8)R^(2) (d) R^(2)

The area of the largest triangle that can be inscribed in a semi-circle of radius r is

The maximum area of a triangle inscribed in a circle is a circle of radius r is (3sqrt3)/4r^2 sq. units

Three circles of radius 1 cm are circumscribed by a circle of radius r, as shown in the figure. Find the value of r? (a) sqrt(3) + 1 (b) (2+sqrt(3))/(sqrt(3)) (c) (sqrt(3) + 2)/(sqrt(2)) (d) 2 + sqrt(3)

Show that the rectangle of maximm area that can be inscribed in a circle of radius r is a square of side sqrt2 r