The vertices of a variable triangle are (3, 4). (5 cos , 5 sin 8), and (5 sin 0, -5 cos 6), where 0 € R. The locus of its orthocenter is

Vertices of a variable triangle are (3, 4), (5 cos theta, 5 sin theta) and (5 sin theta, -5 cos theta) , where theta in R . Locus of its orthocentre is

Vertices of a variable triangle are (3, 4), (5 cos theta, 5 sin theta) and (5 sin theta, -5 cos theta) , where theta in R . Locus of its orthocentre is

Vertices of a variable triangle are (3, 4), (5 cos theta, 5 sin theta) and (5 sin theta, -5 cos theta) , where theta in R . Locus of its orthocentre is

Vertices of a variable triangle are (3, 4), (5 cos theta, 5 sin theta) and (5 sin theta, -5 cos theta) , where theta in R . Locus of its orthocentre is

Vertices of a triangle are (3,4),(5cos theta,5sin theta) and (-5sin theta,5cos theta). Then locus of orthocentre of thetriangle is -

Vertices of a variable triangle are (3,4);(5cos theta,5sin theta) and (5sin theta,-5cos theta) where theta is a parameter then the locus of its circumcentre is

Vertices of a variable triangle are (5,12),(13cos theta,13sin theta) and (13sin theta-13cos theta), Where theta in R. Locus of itt's orthocentre is:

Vertices of a variable triangle are A (3,4),B(5costheta, 5sintheta) and C (5sintheta,-5costheta) where theta is a parameter then, find the locus of its orthocentre.

The diameter of the nine point circle of the triangle with vertices (3, 4), (5 cos theta, 5 sin theta) and (5 sin theta, -5 cos theta) , where theta in R , is

The diameter of the nine point circle of the triangle with vertices (3, 4), (5 cos theta, 5 sin theta) and (5 sin theta, -5 cos theta) , where theta in R , is