If the point `(sin theta,(1)/(sqrt(2)))` lies exterior to both the parabolas `y^(2)=|x|` .Then theta can belong to

Range of values of k for which the point (k,-1) is exterior to both the parabolas y^(2)=|x| is

Find the range of values of lambda for which the point (lambda,-1) is exterior to both the parabolas y^(2)=|x|

If x^(2)-2x+sin^(2)theta=0 then x belongs to

If sin theta=(sqrt(3))/(2), cos theta=-(1)/(2) then theta lies in

If sin theta =-(1)/sqrt(2) and tan theta=1 then theta lies in which quadrant

If the point (1+cos theta,sin theta) lies between the region corresponding to the acute angle between the lines 3y=x and 6y=x, then

If the points (-2,0),(-1,(1)/(sqrt(3))) and (cos theta,sin theta) are collinear then the number of value of theta is :

If it is not possible to draw any tangent from the point (1/4, 1) to the parabola y^(2)=4xcostheta+sin^(2)theta , then theta belongs to