If in two circles, arcs of the same length substend angles `60^(@) and 75^(@)` at the centre, find the ratio of their radii.

If in two circles, arcs of the same length substend angles of 60^(@) and 75^(@) at their centres, then the ratio of their radii is-

If ars of the same lengths in two circles subtend angles 65^(@) and 110^(@) at the centre, find the ratio of their radii.

If arcs of same length in two circles subtend angles of 60^0 and 75^0 at their centers, find the ratios of their radii.

If arcs of same length in two circles subtend angles of 30^0a n d45^0 at their centers, find the ratios of their radii.

In two circles two arc of same length makes an angle 30^@ and 60^@ respectively at the centre. The ratio of the radii of two circle is

In a circle, if an arc of 220 cm length subtends and angle of measure 60^@ at the centre, then determine the radius of the circle

In a circle, if an arc of 220 cm length subtends an angle of measure 63^@ at the centre, then determine the radius of the circle.

Prove that the lengths of the chord of a circle which subtends an angle 108^(@) at the centre is equal to the sum of the lenths of the chords which subtend angles 36^(@) and 60^(@) at the centre of the same circle.

Two identical charged particles enter a uniform magnetic field with the same speed but at angles 30^(@) and 60^(@) with the field. Let a, b and c be the ratios of their time periods, radii and pitches of the helical paths. Then

If the are of length 330cm. Of a circle makes an angle. 42^@ at the centre, then the radius of the circle is