Find real `theta` such that
`(3+2i sin theta)/(1-2i sin theta)` is purely real.

The real value of theta for which the expression (1+I cos theta)/(1-2i cos theta) is a real number is

The real value of alpha for which the expression (1-sin alpha)/(1+2i sin alpha) is purely real is

Prove that , sin theta + sin 2theta + ……+ sin n theta = ( (sin( n theta/(2)) sin ((n+1)/(2))theta))/(sin theta/2) , for all n in N .

For which value of an acute angle theta ,(i) ( cos theta )/( 1-sin theta ) +(cos theta )/( 1+sin theta ) =4 is true ? For which value of 0^(@) le theta le 90 ^(@) , above equation is not defined?

Equation of the line passing through the point ( a cos^(3) theta , a sin^(3) theta ) and perpendicular to the line x sec theta + y cosec theta = a is x cos theta - y sin theta = cos 2 theta .

The possible values of theta in (0,pi) such that sin (theta) + sin (4theta) + sin(7theta) = 0 are

If sec theta=13/12 , find sin theta and cot theta .

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.

z=i+sqrt(3)=r(cos theta+sin theta)

if alpha and beta the roots of z+ (1)/(z) =2 (cos theta + i sin theta ) where 0 lt theta lt pi and i =sqrt(-1) show that |alpha - i |= | beta -i|