Verify, whether D is the mid point of AG.

Let P\ a n d\ Q be any two points. Find the coordinates of the point R\ which divides P Q externally in the ratio 2:1 and verify that Q is the mid point of P R .

Find the coordinates of the point R which divides the join of P(0,0,0) and Q(4,-1,-2) in the ratio 1:2 externally and verify that P is the mid point of RQ.

A B C is a triangle in which D is the mid-point of B C and E is the mid-point of A D . Prove that area of B E D = 1/4 area of ABC.

A B C is a triangle in which D is the mid-point of BC and E is the mid-point of A D . Prove that area of triangle B E D=1/4area \ of triangle A B C . GIVEN : A triangle A B C ,D is the mid-point of B C and E is the mid-point of the median A D . TO PROVE : a r( triangle B E D)=1/4a r(triangle A B C)dot

A B C is a triangle in which D is the mid-point of B C and E is the mid-point of A Ddot Prove that area of B E D=1/4a r e aof A B Cdot

A B C is a triangle in which D is the mid-point of B C ,\ E\ a n d\ F are mid-points of D C\ a n d\ A E respectively. If area of A B C is 16\ c m^2, find the area of D E F

ABC and BDE are two equilateral triangles such that D is the mid-point of BC. Then, ar (DeltaBDE) = (1)/(4) ar (DeltaABC) .

Show that the line segments joining the points (4, 7, 8), (-1, -2, 1) and (2, 3, 4), (1, 2, 5) intersect. Verify whether the four points concyclic.

In Figure, line segment A B is parallel to another line segment C D . O is the mid-point of A D . Show that: (i) AOB~= D O C (ii) O is also the mid-point of B Cdot

In Figure, line segments A B is parallel to another line segment C DdotO is the mid-point of A Ddot Show that: O is also the mid-point of B D