Find the locus of the centroid of a triangle whose vertices are `(a cos t, a sin t), (b sin t,-b cos t)` and `(1, 0)`, where 't' is the parameter.

Locus of centroid of the triangle whose vertices are (a cos t, a sin t), (b sin t, - b cos t) and (1, 0), where is a

Locus of centroid of the triangle whose vertices are (a cos t, a sin t), (b sin t, -b cos t) and (1, 0), where t is a parameter, is :

Locus of centroid of the triangle whose vertices are (a cos t, a sin t),(b sin t , - b cos 1) and (1, 0), where 't' is a parameter, is :

Locus of centroid of the triangle whose vertices are (a cos t, a sin t ) , (b sin t - b cos t ) and (1, 0) where t is a parameter, is

Locus of centroid of the triangle whose vertices are (a cos t , a sin t) , ( b sin t, -b cos t ) and(1,0), where t is a parameter, is-

Locus of centroid of the triangle whose vertices are (a cos t, a sin t ) , (b sin t - b cos t ) and (1, 0) where t is a parameter, is

Prove that the locus of the centroid of the triangle whose vertices are (a cos t,a sin t),(b sin t,-b cos t), and (1,0), where t is a parameter,is circle.

Locus of centroid of the triangle whose vertices are (a cost, a sint), (b sint,b cost) and (1, 0), where t is a parameter, is