ABCD is a square EF is parallel to BD. R is the mid-point of EF. Prove that :
(i) `BE = DF`
(ii) AR bisects angle BAD
(iii) If AR produced it will pass through C.

In the figure,ABCD is a square and EF is parallel to BD.R is the mid-point of EF.Prove that (i) BE=DF( ii) AR bisects /_BAD and (iii) If AR is produced it will pass through C.

In parallelogram ABCD,E is the mid-point of side AB and CE bisects angle BCD.Provethat: (i) AE=AD(i) DE bisects /_ADC and (ili) Angle DEC is a right angle.

ABCD is a square. E and F are respectively the mid-points of BC and CD. If R is the mid-point of EF, prove that ar (DeltaAER) = ar (DeltaAFR) .

ABCD is a parallelogram. X and Y are mid-points of BC and CD. Prove that ar(triangleAXY)=3/8ar(||^[gm] ABCD)

AC and BD are chords of a circle which bisect each other.Prove that (i) AC and BD are diameters (ii) ABCD is a rectangle

In parallelogram ABCD, X and Y are mid-points of opposite sides AB and DC respectively. Prove that: (i)AX=YC (ii) AX is parallel to YC (iii)AXCY is parallelogram

AC and BD are chords of a circle which bisect each other.Prove that (i) AC and BD are diameters (ii) ABCD is a rectangle.

ABCD is a quadrilateral in which AD = BC and /_DAB = /_CBA Prove that (i) DeltaABD ~= DeltaBAC (ii) BD = AC (iii) /_ ABD = /_BAC

In Figure,ABCD isa trapezium in which side AB is a parallel to side DC and E is the mid- point of side AD. If F is a point on the side BC such that the segment EF is paralle side DC. Prove that F is the mid point of BC and EF=(1)/(2)(AB+DC)

In the figure ABCD is a trapezium in which side AB is parallel to side DC and E is the midpoint of side AD.If F is a point on the side BC such that the line segment EF is parallel to DC.Prove that Fis the mid-point of B BC and EF=(1)/(2)(AB+DC)