Determine the smallest positive value of `x` which satisfy the equation `sqrt(1+sin2x)-sqrt(2)cos3x=0`

For the equation 2x^(2)-6sqrt(2)x-1=0

Solve the equation 3sqrt((x+3))-sqrt((x-2))=7

Samllest positive angle satisfying the equation cos^(2)x+cos^(2) 2x+cos^(2)3x=1 , is

If 0 le x le 2pi , then the number of real values of x, which satisfy the equation cos x + cos 2x + cos 3x + cos 4x=0 , is

Integrate the functions sqrt(sin2x)cos2x

The roots of the equation x^(2)-2sqrt(3)x+3=0 are

The value of x , 0 le x le (pi)/2 which satisfy the equation 81^( sin^(2)x)+81^(cos^(2)x)=30 are

If alpha be the smallest positive root of the equation sqrt(sin(1-x))=sqrt(cos x) , then the approximate integral value of alpha must be .

The sum of values of x satisfying the equation (31+8sqrt(15))^((x^2)-3)+1=(32+8sqrt(15))^((x^2)-3) is

The number of values of y in [-2pi,2pi] satisfying the equation abs(sin2x)+abs(cos2x)=abs(siny) is