`Delta ABC ~ Delta DEF`. BC = 3cm, EF = 4cm and area of `Delta ABC = 54 cm^(2)`. Determine the area of `Delta DEF`.

In Delta ABC , AB = 20 cm, BC = 21 cm and the perimeter of Delta ABC = 70 cm. Find the area of Delta ABC using Heron's formula.

In a Delta ABC, a =2b and |A-B| =(pi)/(3). Determine the angleC.

In Delta ABC , right angle is at B,AB = 5cm and angle ACB =30^(@) Determine the lengths of the sides BC and AC.

In the adjacent figure. AC = 6 cm, AB = 5 cm and angleBAC = 30^(@) . Find the area of the triangle.

Delta ABC is an isosceles triangle in which BC = 8 cm and AB = AC = 5 cm. Then, area of Delta ABC = …………….cm^(2) .

Draw a Delta ABC with AB = 6 cm, BC = 4 cm and angle B = 45 ^(@). Then construct a triangle similar to Delta ABC whose sides are 3/4 of the corresponding sides of Delta ABC.

Draw Delta ABC with AB = 6 cm, BC = 8 cm and angle B = 90^(@). Then, construct another triangle similar to Delta ABC whose sides are (3)/(4) of the corresponding sides of Delta ABC.

ABC is a triangle and PQ is a straight line meeting AB in P and AC in Q. If AP = 1 cm, BP = 3cm, AQ = 1.5 cm and CQ = 4.5 cm, prove that area of Delta APQ = (1)/(16) ( area of Delta ABC ).

Given that Delta ABC ~ Delta PQR , CM and RN are respectively the medians of Delta ABC and Delta PQR . Prove that (i) Delta AMC ~ Delta PNR (ii) (CM)/(RN) = (AB)/(PQ) (iii) Delta CMB ~ Delta RNQ

Draw a Delta ABC with AB= 6 cm, BC = 5 cm and angle B = 45 ^(@). Then construct a triangle similar to Delta ABC whose sides are 3/4 of the corresponding sides of Delta ABC.