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A rhombus shaped field has green grass for 18 cows to graze. If each side of the rhombus is 30 m and its longer diagonal is 48 m, how much area of grass field will each cow be getting?
Let ABCD be a rhombus-shaped field.
For ΔBCD,
Semi-perimeter, 
= 54 m
By Heron’s formula,
Area of triangle
Therefore, area of ΔBCD
Area of field = 2 × Area of ΔBCD
= (2 × 432) m2 = 864 m2
Area for grazing for 1 cow 
= 48 m2
Each cow will get 48 m2 area of grass field.
A triangle and a parallelogram have the same base and the same area. If the sides of the triangle are 26 cm, 28 cm and 30 cm, and the parallelogram stands on the base 28 cm, find the height of the parallelogram.
For triangle
Perimeter of triangle = (26 + 28 + 30) cm = 84 cm
2s = 84 cm
s = 42 cm
By Heron’s formula,
Area of triangle
Area of triangle
= 336 cm2
Let the height of the parallelogram be h.
Area of parallelogram = Area of triangle
h × 28 cm = 336 cm2
h = 12 cm
Therefore, the height of the parallelogram is 12 cm.
A park, in the shape of a quadrilateral ABCD, has ∠ C = AB = 9 m, BC = 12 m, CD = 5 m and AD = 8 m. How much area does it occupy?
Let us join BD.
In ΔBCD, applying Pythagoras theorem,
BD2 = BC2 + CD2
= (12)2 + (5)2
= 144 + 25
BD2 = 169
BD = 13 m
Area of ΔBCD
For ΔABD,
By Heron’s formula,
Area of triangle
Area of ΔABD 
Area of the park = Area of ΔABD + Area of ΔBCD
= 35.496 + 30 m2 = 65.496 m2 = 65.5 m2 ( Approximate Value)
Find the area of a quadrilateral ABCD in which AB = 3 cm, BC = 4 cm, CD = 4 cm, DA = 5 cm and AC = 5 cm.
For ΔABC,
AC2 = AB2 + BC2
(5)2 = (3)2 + (4)2
Therefore, ΔABC is a right-angled triangle, right-angled at point B.
Area of ΔABC
For ΔADC,
Perimeter = 2s = AC + CD + DA = (5 + 4 + 5) cm = 14 cm
s = 7 cm
By Heron’s formula,
Area of triangle
Area of ABCD = Area of ΔABC + Area of ΔACD
= (6 + 9.166) cm2 = 15.166 cm2 = 15.2 cm2 ( Approximate Value)
An umbrella is made by stitching 10 triangular pieces of cloth of two different colours (see Figure), each piece measuring 20 cm, 50 cm and 50 cm. How much cloth of each
colour is required for the umbrella?
For each triangular piece,
Semi-perimeter, 
By Heron’s formula,
Area of triangle
Since there are 5 triangular pieces made of two different coloured cloths,
Area of each cloth required
A floral design on a floor is made up of 16 tiles which are triangular, the sides of the triangle being 9 cm, 28 cm and 35 cm (see Figure). Find the cost of polishing the tiles at the rate of 50p per .
It can be observed that
Semi-perimeter of each triangular-shaped tile, 
By Heron’s formula,
Area of triangle
Area of each tile 
= (36 × 2.45) cm2
= 88.2 cm2
Area of 16 tiles = (16 × 88.2) cm2= 1411.2 cm2
Cost of polishing per cm2 area = 50 p
Cost of polishing 1411.2 cm2 area = Rs (1411.2 × 0.50) = Rs 705.60
Therefore, it will cost Rs 705.60 while polishing all the tiles
Radha made a picture of an aeroplane with coloured paper as shown in Figure. Find the total area of the paper used.
For finding the area of the paper used, determine the area of each part separately and then find the sum of the areas to get the area of used paper.
For region I (Triangle)
Length of the sides of the triangle section I = a=5cm, b=1cm and c=5cm
Semi Perimeter of the triangle,
s =( a+b+c)/2
s=(5 + 5 + 1)/2= 11/2cm
Semi perimeter = 11/2 cm = 5.5cm
Using heron’s formula,
Area of section I = √s (s-a) (s-b) (s-c)
= √5.5(5.5 – 5) (5.5 – 5) (5.5 – 1) cm²
= √5.5 × 0.5 × 0.5 × 4.5 cm²
= √5.5 × 0.5 × 0.5 × 4.5 cm²
= 0.75√11 cm²= 0.75 ×3.32 cm²
= 2.49 cm² (approx)
Section II( rectangle)
Length of the sides of the rectangle of section II = 6.5cm and 1cm
Area of section II = l ×b= 6.5 × 1
= 6.5cm²
Section III is an isosceles trapezium
In ? AMD
AD = 1cm (given)
AM + NB = AB – MN = 1cm
Therefore, AM = 0.5cm
Now,AD² =AM² +MD²
MD²= 1² – 0.5²
MD²= 1- 0.25= 0.75
MD = √0.75= √75/100=√3/4cm
Now, area of trapezium = ½(sum of parallel sides)×height
=½×(AB+DC)×MD
=½×(2+1)×√3/4
= ½(3)×√(3/4)= ½×3×√3×2=(3/4)√3
= (3/4)×1.73= 1.30cm²(approx)
[√3=1.73....]
Hence, area of trapezium = 1.30cm²
Section IV and V are 2 congruent right angled triangles with base 6cm and height 1.5cm
Area of region IV and V = 2 (½ × 6 × 1.5)cm² = 9cm²
Total area of the paper used = Area I + Area II + Area III + (Area IV + Area V) = (2.49+ 6.5 + 1.30 + 9)
= 19.3 cm² (approx)
A kite in the shape of a square with a diagonal 32 cm and an isosceles triangle of base
8 cm and sides 6 cm each is to be made of three different shades as shown in Figure. How much paper of each shade has been used in it?
A kite is in the shape of square thats why ; diagonals are equal and divided in to two equal halfs
∴area of 1st part is in shape of triangle base 32cm and height 16cm
Area of square 
(base x height)
=16×16
=256 sq.cm
Therefore, the area of paper required in each shape is 256 cm2.
Similarly area of 2nd part also 256 sq.cm
Area of 3rd part using with heron's formula
Area of triangle
a=8cm
b=6cm
c=6cm
S=a+b+c/2
=8+6+6/2
= 20/2
=10cm
Area of IIIrd triangle
Area of paper required for IIIrd shade = 17.92 cm2
Total area is 256+256+17.92
( approximately)
A field is in the shape of a trapezium whose parallel sides are 25 m and 10 m. The non-parallel sides are 14 m and 13 m. Find the area of the field.
Draw a line BE parallel to AD and draw a perpendicular BF on CD.
It can be observed that ABED is a parallelogram.
BE = AD = 13 m
ED = AB = 10 m
EC = 25 − ED = 15 m
For ΔBEC,
Semi-perimeter, 
By Heron’s formula,
Area of triangle
Area of ΔBEC 
m2= 84 m2
Area of ΔBEC 
⇒ 84 = 12 × 15 × BF⇒ BF = 16815 = 11.2 m⇒ 84 = 12 × 15 × BF⇒ BF = 16815 = 11.2 m
Area of ABED = BF × DE = 11.2 × 10 = 112 m2
Area of the field = 84 + 112 = 196 m2
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