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Find the volume of a sphere whose radius is
(i) 7 cm (ii) 0.63 m
i) Radius of the sphere(r) = 7 cm
Volume of the sphere = 4/3πr³
= (4/3 × 22/7 × 7 × 7 × 7) cm³
=(88×7×49)/3×7 cm³
=4312/3 cm³
= 1437 cm³
Volume of the sphere =1437 cm³
(ii) Given:
Radius of the sphere(r) = 0.63 m
ii) Volume of the sphere = 4/3πr³
= (4/3 × 22/7 × 0.63 × 0.63 × 0.63) m³
= 4×22×.09×.21× 0.63 m³
= 1.0478 m³
Volume of the sphere =1.0478 m³
A dome of a building is in the form of a hemisphere. From inside, it was white-washed at the cost of Rs 498.96. If the cost of white-washing is Rs 2.00 per square meter, find the
(i) inside surface area of the dome,
(ii) volume of the air inside the dome. 
(i) 249.48 square metre
(ii) 39.69 cubic metre
Twenty seven solid iron spheres, each of radius r and surface area S are melted to form a sphere with surface area S'. Find the
(i) radius r' of the new sphere, (ii) ratio of S and S'.
(i) r' = 3r
(ii) 1/9
Find the volume of a sphere whose radius is
(i) 7 cm
(ii) 0.63 m
(i) Radius of sphere = 7 cm
Volume of sphere = 
Therefore, the volume of the sphere is 1437
cm3.
(ii) Radius of sphere = 0.63 m
Volume of sphere =
Therefore, the volume of the sphere is 1.05 m3 (approximately).
Find the amount of water displaced by a solid spherical ball of diameter
(i) 28 cm
(ii) 0.21 m
(i) Radius (r) of ball = 
Volume of ball = 
Therefore, the volume of the sphere is 
cm3.
(ii)Radius (r) of ball = 
= 0.105 m
Volume of ball =
Therefore, the volume of the sphere is 0.004851 m3.
The diameter of a metallic ball is 4.2 cm. What is the mass of the ball, if the density of
the metal is 8.9 g per ?
Radius (r) of metallic ball = 
Volume of metallic ball = 
Mass = Density × Volume
= (8.9 × 38.808) g
= 345.3912 g
Hence, the mass of the ball is 345.39 g (approximately)
The diameter of the moon is approximately one-fourth of the diameter of the earth.
What fraction of the volume of the earth is the volume of the moon?
Let the diameter of earth be d. Therefore, the radius of earth will be 
.
Diameter of moon will be 
and the radius of moon will be 
.
Volume of moon = 
Volume of earth = 
Therefore, the volume of moon is 
of the volume of earth.
How many litres of milk can a hemispherical bowl of diameter 10.5 cm hold?
Radius (r) of hemispherical bowl = 
= 5.25 cm
Volume of hemispherical bowl = 
= 303.1875 cm3
Capacity of the bowl =
Therefore, the volume of the hemispherical bowl is 0.303 litre.
A hemispherical tank is made up of an iron sheet 1 cm thick. If the inner radius is 1 m,
then find the volume of the iron used to make the tank.
Thickness of iron sheet: 1cm
Inner radius of tank (r): 1m or 100 cm.
Volume of iron used to build the tank= (1/2) x (Outer volume of tank - Inner volume of tank.)
Outer radius of tank (R) = (100+1) cm= 101cm
Outer volume of tank =
Similarly, inner volume =
Therefore, (Outer volume) - (inner volume) =
= 12575.62 cc.
Therefore, volume of iron used
= (1/2)x 126975.62 cc
= 63487.81 cc.
Find the volume of a sphere whose surface area is 154
Let radius of sphere be r.
Surface area of sphere = 154 cm2
⇒ 4πr2 = 154 cm2
Volume of sphere = 
Therefore, the volume of the sphere is 
cm3.
A dome of a building is in the form of a hemisphere. From inside, it was white-washed
at the cost of Rs.4989.60. If the cost of white-washing is Rs. 20 per square metre, find the
(i) inside surface area of the dome,
(ii) volume of the air inside the dome.
(i) Total cost of white washing = Rs.4989.60
Rate= Rs. 20/ sq.metre.
Therefore, CSA of the inner side of dome = 
= 249.48 sq.metre.
(ii) Let the inner radius of the hemispherical dome be r.
CSA of inner side of dome = 249.48 m2
2πr2 = 249.48 m2
⇒ r = 6.3 m
Volume of air inside the dome = Volume of hemispherical dome
= 523.908 m3
= 523.9 m3 (approximately)
Therefore, the volume of air inside the dome is 523.9 m3.
Twenty seven solid iron spheres, each of radius r and surface area S are melted to
form a sphere with surface area S′. Find the
(i) radius r ′ of the new sphere,
(ii) ratio of S and S′.
(i)Radius of 1 solid iron sphere = r
Volume of 1 solid iron sphere 
Volume of 27 solid iron spheres 
27 solid iron spheres are melted to form 1 iron sphere. Therefore, the volume of this iron sphere will be equal to the volume of 27 solid iron spheres. Let the radius of this new sphere be r'.
Volume of new solid iron sphere 
(ii) Surface area of 1 solid iron sphere of radius r = 4πr2
Surface area of iron sphere of radius r' = 4π (r')2
= 4 π (3r)2 = 36 πr2
A capsule of medicine is in the shape of a sphere of diameter 3.5 mm. How much
medicine (in ) is needed to fill this capsule?
Diameter of sphere capsule(d)= 3.5mm
Therefore, radius of the sphere(r)= 1.75mm.
Volume of a sphere = 4/3π
So,
Volume of spherical capsule 
= 
= 22.458 mm3
= 22.46 mm3 (approximately)
Therefore, the amount of medicine that would be needed to fill the capsule would be 22.46
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