A hemispherical bowl of internal radius of 60 cm is full of some liquid. This liquid is to be filled into a number of cylindrical bottles each of radius 4 cm and height 8 cm. The number of bottles needed is. About the author Nevaeh
Step-by-step explanation: According to the problom Given that Radius of hemispherical bowl = 9 cm Hence the volume of bowl = 3 2 πr 2 Implies that = 3 2 × 7 22 ×9×9×9 Implies that =1527.42cm 3 Since height of the bottle (h) = 4cm and Diameter of the cylindrical bottles=3cm Implies that radius = 1.5cm Hence , the volume of the cylindrical bolltle = πr 2 h == 7 22 ×1.5×1.5×4cm 3 Let the number of bottle be (n) Implies that =n× 7 22 ×9×9×9 implies that =n= 3×1.5×1.5×4 2 ×9×9×9 implies that n=5 Hence the number of bottle is 54. Reply
Step-by-step explanation:
According to the problom
Given that
Radius of hemispherical bowl = 9 cm
Hence the volume of bowl =
3
2
πr
2
Implies that
=
3
2
×
7
22
×9×9×9
Implies that
=1527.42cm
3
Since height of the bottle (h) = 4cm
and Diameter of the cylindrical bottles=3cm
Implies that
radius = 1.5cm
Hence ,
the volume of the cylindrical bolltle = πr
2
h
==
7
22
×1.5×1.5×4cm
3
Let the number of bottle be (n)
Implies that
=n×
7
22
×9×9×9
implies that
=n=
3×1.5×1.5×4
2
×9×9×9
implies that
n=5
Hence the number of bottle is 54.
Step-by-step explanation:
n=1125
hope this would help you