A variable line cuts X-axis at A, Y -axix at B, where OA = a, OB = b (O as origin) such that `a^(2)+b^(2)=1`.
Find the locus of
centroid of `Delta OAB`

A variable line cuts x-axis at A, y-axis at B where OA = a, OB =b (O as origin) such that then the locus of circumcentre of DeltaOAB is-

If t is parameter, A=(a sec t,b tan t) and B=(-a tan t,b sec t) ,O=(0,0), then the locus of the centroid of Delta OAB 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 t is parameter,A=(a sec t,b tan t) and B=(-a tan t,b sec t),O=(0,0) then be locus of the centroid of Delta OAB is

If t is parameter,A=(a sec t,b tan t) and B=(-a tan t,b sec t),O=(0,0) then be locus of the centroid of Delta OAB is

(i) A variable plane, which remains at a constant distance '3p' from the origin cuts the co-ordinate axes at A, B, C. Show that the locus of the centroid of the triangle ABC is : (1)/(x^(2)) + (1)/(y^(2)) + (1)/(z^(2)) = (1)/(p^(2)) . (ii) A variable is at a constant distance 'p' from the origin and meets the axes in A, B, C respectively, then show that locus of the centroid of th triangle ABC is : (1)/(x^(2)) + (1)/(y^(2)) + (1)/(z^(2)) = (9)/(p^(2)).

A variable plane cutting coordinate axes in A, B, C is at a constant distance from the origin. Then the locus of centroid of the triangleABC is

A variable plane which remains at a constant distance 3p from the origin cuts the coordinate axes at A,B,C. Show that the locus of the centroid of triangle ABC is (1)/(x^(2))+(1)/(y^(2))+(1)/(z^(2))=(1)/(p^(2))

ABC is a variable triangle such that A is (1, 2),and B and C on the line y=x+lambda(lambda is a variable).Then the locus of the orthocentre of Delta ABC is x+y=0 (b) x-y=0x^(2)+y^(2)=4( d )x+y=3