If a point C lies between two points A and B such that AC = BC, then prove that `AC=1/2AB`. Explain by drawing the figure.

A point C lies between two points A and B such that AC = BC, then AC=1/2AB . Point C is called a midpoint of line segment AB. Prove that every line segment has one and only one midpoint.

If C is a point on the line segment joining A (-3, 4) and B (2, 1) such that AC = 2BC, then the co-ordinates of C are :

In DeltaABC,if AC=8, BC=7 and D lies between A and B such that AD=2, BD=4, then the length CD equals

In the fig. AC>AB and D is the point on AC such that AB=AD. Show that BC>CD

In the fig. we have X and Y are the mid points of AC and BC and AX=CY. Show that AC=BC

In Fig. D is a point on side BC of triangleABC such that (BD)/(CD) = (AB)/(AC) . Prove that AD is the bisector of angleBAC .

In the fig. prove that: AD+AB+BC+CD>2AC.

In Fig. , ABCD is a parallelogram in which P is the mid-point of DC and Q is a point on AC such that CQ = 1/4AC . If PQ produced meets BC at R, prove that R is a mid-point of BC.

In Fig. , ABCD is a parallelogram in which P is the mid-point of DC and Q is a point on AC such that CQ = 1/4AC . If PQ produced meets BC at R, prove that R is a mid-point of BC.