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A copper wire when bent in the form of a square encloses an area of 121 cm^{2}. If the same wire is bent in the form of a circle, it encloses an area equal to? 
A) 121 cm^{2} B) 144 cm^{2 } C) 154 cm^{2} D) 168 cm^{2} Correct Answer : 154 cm^{2} Explanation : As is given, area of square = a^{2} = 121 cm^{2} length of the wire = Perimeter of square of side a = 4a = 4*11 = 44cm Let the radius of circle be r cm. Then, Now, Area of circle = πr^{2} = (22/7) *7*7 = 154 cm^{2} 
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There is a path made around a circular park. If the difference of external and internal perimeters is 132 meter, then the width of the path is: 
A) 22 m
B) 20 m
C) 21 m
D) 24 m
Correct Answer : 21 m Explanation : Let the inner and outer radii be r and R meters. 
The base of rightangled triangle is 5 meters and hypotenuse is 13 meters . Its area will be ? 
A) 25 m^{2}
B) 28 m^{2}
C) 30 m^{2}
D) 24 m^{2}
Correct Answer : 30 m^{2} Explanation : Hypotenuse = √(base^{2}+height^{2}) Area of the triangle = 1/2(base*height) 
If the side of a square is increased by 25%, then how much percent does its area get increased ? 
A) 125 B) 156.25 C) 50 D) 56.25 Correct Answer : 56.25 Explanation : Let side of square is 100 m^{2} Then, side = 10 m increased side by 25 Then, new side = 125 % of 10 ⇒ (125/100) x 10 ⇒ 12.5 m Increase in area = (12.5)^{2}  (10)^{2} m^{2} 
if the side of a square be increased by 4 cms. The area increased by 60 sq. cms . The side of the square is ? 
A) 12 cm B) 13 cm C) 14 cm D) 5.5 cm Correct Answer : 5.5 cm Explanation : Let each side = x cm 
If the diameters of a circle is increased by 100% . Its area is increased by ? 
A) 100% B) 200% C) 300% D) 400% Correct Answer : 300% Explanation : Area of circle = πd^{2}/4 diameters increased by 100%, then new area = π(2d)^{2} /4 => πd^{2} increase percent =[(3πd^{2}/4) / ( πd^{2}/4) ]*100 % 
Find the area of a triangle whose sides measure 8 cm, 10 cm and 12 cm? 
A) 8√63 sq cm B) 5√63 sq cm C) 6√53 sq cm D) 7√93 sq cm Correct Answer : 5√63 sq cm Explanation : Area of triangle = √[s(sa)(sb)(sc)] there s = (a+b+c)/2 let, a = 8 cm, b = 10 cm and c = 12 cm so,Area of triangle = √s(s  a) (s  b) (s  c) 

One side of a parallelogram is 8.06 cm and its perpendicular distance from opposite side is 2.08 cm. What is the approximate area of the parallelogram? 
A) 12.56 cm^{2} B) 14.56 cm^{2} C) 16.76 cm^{2} D) 22.56 cm^{2} Correct Answer : 16.76 cm^{2} Explanation : Area of parallelogram = base x height 
Find the area of a rectangle having 15m length and 8m breadth? 
A) 120 sq m B) 111 sq m C) 115 sq m D) 125 sq m Correct Answer : 120 sq m Explanation : Area of Rectangle= Length x Breadth 
The length of the side of a square is represented by x+2. The length of the side of an equilateral triangle is 2x. If the square and the equilateral triangle have equal perimeter, then the value of x is _______? 
A) 4 B) 5 C) 6 D) 8 Correct Answer : 4 Explanation : Since the side of the square is x + 2, its perimeter = 4 (x + 2) = 4x + 8 

The perimeters of two squares are 160cm and 164cm. Find the perimeter of a third square whose area is equal to the difference of the areas of the two squares(in cm). 
A) 81
B) 60
C) 36
D) 9
Correct Answer : 36 Explanation : Perimeter of Square = 4 * length of a side The perimeters of two squares are 160cm and 164cm , Area of third squre = 41^{2}  40^{2} = 81 sq cm required perimeter = 4*9 = 36 cm 
The sides of a triangle are in the ratio 3:4:5. The perimeter of the triangle is 24cm. The area (in cm^{2}) of the triangle is: 
A) 39
B) 26
C) 24
D) 32
Correct Answer : 24 Explanation : Perimeter = (a+b+c) ,there a,b,c are the sides of a triangle let's the sides of triangle are 3 cm, 4 cm, and 5 cm in length , then So Area = √[s(sa)(sb)(sc)] there s = (a+b+c)/2 = 12/2 =6 hence Area may be 6 or multiple of 6 that is 6, 12 , 24 ...because sides are given in ratio 
In a rhombus of side 10 cm, one of diagonals is 16 cm long. The length of In a rhombus of side 10 cm, one of diagonals is 16 cm long. The length of the second diagonal is ? 
A) 16 cm
B) 12 cm
C) 18 cm
D) 20 cm
Correct Answer : 12 cm Explanation : The diagonals meet in the middle at a right angle. 
One diagonal and perimeter of a rhombus are 24 cm and 52 cm respectively. The area of rhombus will be? 
A) 60 cm^{2}
B) 120 cm^{2}
C) 100 cm^{2}
D) 30 cm^{2}
Correct Answer : 120 cm^{2} Explanation :
Area of the roumbus = (product of diagonals)/2 in the right angel AOB

ABCD is a square of side X cm. Its side is increased by 30%. What is the change in its area? 
A) 60%
B) 62.5%
C) 63%
D) 69%
Correct Answer : 69% Explanation : Let side = X cm increased side by 30 then, new side = 130 % of X ⇒ (130/100) *X ⇒ 1.3X cm Increase in area = (1.3*X)^{2}  (X)^{2} cm^{2} 
The sides of a triangle a, b, c are such that 2a = 3b = 4c and its perimeter is 208 cm. What is the length of the longest side? 
A) 48cm
B) 96cm
C) 64cm
D) 54cm
Correct Answer : 96cm Explanation : Let 2a = 3b = 4c = x the perimeter of a triangle is sum of its side Perimeter = 6x+4x+3x Length of the longest side = 6x = 6 x 16 = 96. 
What is the longest side of a rectangle which has a perimeter of 70 units and an area of 276 square units? 
A) 12 units
B) 18 units
C) 23 units
D) 36 units
Correct Answer : 23 units Explanation : let Length =L and Width=W Perimeter = 2(L + W) = 70 Area = WL = 276 Therefore, the sides of the rectangle are 23 and 12 