If in triangle `A B C ,A-=(1,10),` circumcentre `-=(-1/3,2/3)` and orthocentre `-=((11)/3,4/3)` then the co-ordinates of mid-point of side opposite to `A` is `(1,-(11)/3)` (b) (1, 5 ) (c) `(1,-3)` (d) (1, 6)

If in triangle ABC, A=(1, 10), circumcentre= (-1/3, 2/3) and orthocentre= (11/3,4/3) then the co-ordinates of mid-point of side opposite to A is:

If a triangle A B C ,A-=(1,10), circumcenter -=(-1/3,2/3), and orthocentre -=((11)/3,4/3) , then the coordinates of the midpoint of the side opposite to A are

If in triangle ABC,A-=(1,10) circumcentre -=(-(1)/(3),(2)/(3)) and orthocentre -=((11)/(3),(4)/(3)) then the co-ordinates of mid-point of side opposite to A is (1,-(11)/(3))(1,5)(c)(1,-3)(1,6)

If a triangle A B C ,A-=(1,10), circumcenter -=(-1/3,2/3), and orthocentre -=((11)/3,4/3) , then the coordinates of the midpoint of the side opposite to A are (1,-(11)/3) (b) (1,5) (1,-3) (d) (1,6)

If a triangle A B C ,A-=(1,10), circumcenter -=(-1/3,2/3), and orthocentre -=((11)/4,4/3) , then the coordinates of the midpoint of the side opposite to A are (1,-(11)/3) (b) (1,5) (1,-3) (d) (1,6)

If a triangle ABC,A-=(1,10), circumcenter -=(-(1)/(3),(2)/(3)), and orthocentre -=((11)/(4),(4)/(3)) then the coordinates of the midpoint of the side opposite to A are (1,-(11)/(3))(b)(1,5)(1,-3)(d)(1,6)

(1)If in triangle ABC,A=(1,10) circumcentre (-(1)/(3),(2)/(3)) and orthocentre ((11)/(3),(4)/(3)) then the co-ordinates of mid-point of side opposite to A is (2)A line BC,CA and AB of the triangle ABC in P(x_(1),y_(1)),Q(x_(2)y_(2)),R(x_(3),y_(3)) respectively, then:

If a triangle has its orthocentre at (1,1) and circumcentre at (3/2,3/4) then the coordinate of the centroid of triangle is

If the coordinates of the mid-points of the sides of a triangle are (1,1),(2,-3) and (3,4). Find its centroid.

If the coordinates of the mid-points of the sides of a triangle are (1,1),(2,-3)a n d(3,4) . Find its centroid.