In the given figure, `BC = 8 cm and AD = 4 cm. AD || BC`, find the area of `DeltaEBC`

In the given figure , DE //BC and AD : AB= 2 : 5 Find : ( " area of " Delta ADE) /( " area of " Delta ABC) ( ii) (" area of " Delta ABC)/( " area of trapezium DBCE" )

In the adjoining figure, AB = 8 cm, DM = 6 cm and BC = 6 cm . Find the length of DN

In the given figure, if DE || BC, AE = 8 cm, EC = 2 cm and BC = 6 cm, then find DE

In the given figure, DE||BC and (AD)/(DB)=2/3 if AE=3.7 cm , find EC.

A triangle ABC is such that AD is perpendicular to BC and E is a point on DC. Also. Given that BD= 2 cm, DE = 4 cm, and EC = 8 cm. Find the ratio of the areas of Delta ABC , Delta ADE and Delta AEC.

In the given figure DE||BC and AD:DB =5:4 Find the ratio ar (Delta DEF) : ar (Delta CFB)

In the given figure, AB, BC and CA are tangents to the given circle. If AB= 12cm, BC= 8cm and AC= 10cm, find the length of AD, BE= CF

In the figure given figure AB = 9cm, PA = 7.5 cm and PC = 5 cm. Chords AD and BC intersect at P. (i) Prove that DeltaPAB~DeltaPCD (ii) Find the length of CD. (iii) Find area of DeltaPAB : are of DeltaPCD

In DeltaABC,angleABC=angleDAC , AB = 8 cm, AC = 4 cm and AD = 5 cm. (iii) Find area of DeltaACD : area of DeltaABC .

In the given figure, ABCD is a square of side 21 cm. AC and BD are two diagonals of the square. Two semi circles are drawn with AD and BC as diameters. Find the area of the shaded region (Take pi=22/(7) )