In the interval `[-pi/2,pi/2] `the equation `log_(sin theta)(cos 2 theta)=2` has

The number of values of theta in the interval (-pi/2,pi/2) such that theta != npi/5 for ninN and tan theta = cot 5theta as well as sin2theta = cos 4theta is

If 0lt=thetalt=pi and the system of equations x=(sin theta)y+(cos theta)z y=z+(cos theta) x z=(sin theta) x+y has a non-trivial solution then (8theta)/(pi) is equal to

Let theta in (pi//4,pi//2), then Statement I (cos theta)^(sin theta ) lt ( cos theta )^(cos theta ) lt ( sin theta )^(cos theta ) Statement II The equation e^(sin theta )-e^(-sin theta )=4 ha a unique solution.

For theta in (0,pi/2) , let L=(sin theta)^(sin theta)+(cosec theta)^(cosec theta) and M=(sin)^(cosec theta)+(cosec theta)^(sin theta) , then -

Find the general solution of the equation 5cos^(2)theta+7sin^(2)theta-6=0 .

Let p,qin N and q gt p , the number of solutions of the equation q|sin theta |=p|cos theta| in the interval [0,2pi] is

For theta in(0,pi/2) , the maximum value of sin(theta+pi/6)+cos(theta+pi/6) is attained at theta =

0 lt theta lt (pi)/(2) then the minimum value of sin^(3) theta + cosec^(3) theta is……

The two legs of a right triangle are sin theta +sin ((3pi)/2-theta) and cos theta -cos( (3pi)/2-theta) The length of its hypotenuse is

The value of theta , lying between theta =0 and theta=(pi)/(2) and satisfying the equation . |{:(1+ cos^(2 ) theta , sin^(2) theta , 4 sin 4 theta ),(cos^(2) theta , 1+sin^2 theta , 4 sin 4 theta ),(cos^(2) theta , sin^(2) theta , 1+ 4 sin 4 theta ):}|=0 , is