`A=(2,5),B=(4,-11) ` and the locus of `'C'` is `9x+7y+4=0` then the locus of the centroid of `ABC ` is

A=(2,5),B=(4,-11) and the locus of ^ prime C' is 9x+7y+4=0 then the locus of the centroid of ABC is

A=(1,2),B(3,4) and the locus of C is 2x+3y=5 then the locus of the centroid of Delta ABC is

If the vertices P and Q of a triangle PQR are given by (2,5) and (4,-11), respectively, and the point R moves along the line N given by 9x+7y+4=0 ,then the locus of the centroid of triangle PQR is a straight line parallel to PQ (b) QR (c) RP (d) N

Ba n dC are fixed points having coordinates (3, 0) and (-3,0), respectively. If the vertical angle B A C is 90^0 , then the locus of the centroid of A B C has equation. (a)x^2+y^2=1 (b) x^2+y^2=2 (c)9(x^2+y^2)=1 (d) 9(x^2+y^2)=4

If t is parameter, A=(aSect,b tan t) and B=(-atant,b,Sect) , O=(0,0) then the locus of the centroid of Delta OAB is x^(2)+10xy+25y^(2)+ax+by=0 then b-5a=

Statement 1:A(0,0),B(cos x, sin x),C(-sin x, cos x) are vertices of a triangle then the locus of the centroid of triangle is 9x^2+9y^2=4 Statement II : The locus of the point (acos x, bsin x) is x^(2)/a^(2)+y^(2)/b^(2)=1 . Which of the above statement is correct:

If theta is parameter, A=(a cos theta,a sin theta) and B=(b sin theta,-b cos theta)C=(1,0) then the locus of the centroid of Delta ABC

The normals at point A and B on y^(2)=4ax meet the parabola at C on the same parabola then the locus of orthocenter of triangle ABC is