If the sum of the roots of the equation `sin^(2)theta=k,(0ltk lt 1)` lying in `[0,2pi]` is equal to the angles of a n-sided regular polygon, then the value of n is

If theta is the internal angle of n sided regular polygon,then sin theta is equal to:

If each interior angle is double of each exterior angle of a regular polygon with n sides, then the value of n is

The limit of the interior angle of a regular polygon of n sides as n rarroo is

Four times the sum of the roots of the equation sin2x+5sinx+5cosx+1=0 in the interval [0,50pi] is n pi, where n is equal to

The sum of values of theta satisfying the equation 1+cos^(4)theta=sin^(4)theta ; theta in[0,2 pi] ,is

If 1+2sin x+3sin^(2)x+4sin^(3)x+... upto infinite terms = 4 and number of solutions of the equation in [ (-3pi)/(2), 4pi] is k. Sum of all internal angles of a k-sided regular polygon is

If a root of the equation n^(2)sin^(2)x-2sinx-(2n+1)=0 lies in [0,pi//2] the minimum positive integer value of n is