Vertices of a variable triangle are `(3,4), (5 cos theta,5 sin theta) and (5 sin theta, -5 cos theta),` where `theta in RR`. Locus of it's 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 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 (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 (3,4);(5cos theta,5sin theta) and (5sin theta,-5cos theta) where theta is a parameter then the locus of its circumcentre is

The vertices of a triangle are (1,sqrt(3)),(2cos theta,2sin theta) and (2sin theta,-2cos theta) where theta in R. The locus of orthocentre of the triangle is

The vertices of a triangle are (1,sqrt(3)),(2cos theta,2sin theta) and (2sin theta,-2cos theta) where theta in R. The locus of orthocentre of the triangle is

The vertices of a triangle are (1,sqrt(3)),(2cos theta,2sin theta) and (2sin theta,-2cos theta) where theta in R. The locus of orthocentre of the triangle 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