The values of `sintheta_(1), cos^(2)theta_(2)` and `tan theta_(3)` are given as `0.5, -0.5` and `3` (not in order), for some angles `theta_(1), theta_(2)` and `theta_(3)`. Choose incorrect statement.

The values of sintheta_(1), cos^(2)theta_(2) and tan theta_(3) are given as .^(1)//_(2), -.^(1)//_(2) and 3 (not in order), for some angles theta_(1), theta_(2) and theta_(3) . Choose incorrect statement.A

theta_(1),theta_(2),theta_(3) are angles of 1^(st) quadrant if tan theta_(1) = cos theta_(1), tan theta_(2) = cosec theta_(2), cos theta_(3)=theta_(3) . Which of the following is not true ?

Find the values of cos theta and tan theta when sin theta =-3/5 and pi < theta < (3pi)/2

Prove that cos theta (tan theta +2) (2tan theta +1) = 2 sec theta + 5 sin theta

If sintheta_(1)+sintheta_(2)+sintheta_(3)=3, then cos theta_(1)+cos theta_(2)+cos theta_(3)=

If 0 lt theta_(2) lt theta_(1) lt pi/4, cos (theta_(1) + theta_(2)) = 3/5 and cos(theta_(1)-theta_(2))=4/5 , then sintheta_(1) sintheta_(2) equal to

Three identical solid spheres (1, 2 and 3) are allowed to roll down from three inclined plane of angles theta_(1), theta_(2) and theta_(3) respectively starting at time t = 0, where theta_(1) gt theta_(2) gt theta_(3) , then

If sintheta_(1)+sintheta_(2)+sintheta_(3)=3 , then cos theta_(1)+cos theta_(2)+cos theta_(3)=

If (cos(theta_(1)-theta_(2)))/(cos(theta_(1)+theta_(2)))+(cos(theta_(3)+theta_(4)))/(cos(theta_(3)-theta_(4)))=0, then tantheta_(1)tan theta_(2)tan theta_(3)tan theta_(4)=

Let z_(1),z_(2) and z_(3) be three points on |z|=1 . If theta_(1), theta_(2) and theta_(3) be the arguments of z_(1),z_(2),z_(3) respectively, then cos(theta_(1)-theta_(2))+cos(theta_(2)-theta_(3))+cos(theta_(3)-theta_(1))