Volumes of common solids 247
- A sphere has a diameter of 6cm. Determine
its volume and surface area. - If the volume of a sphere is 566cm^3 , find its
radius. - A pyramid having a square base has a per-
pendicular height of 25cm and a volume of
75cm^3. Determine, in centimetres, thelength
of each side of the base. - A cone has a base diameter of 16mm and a
perpendicular height of 40mm. Find its vol-
ume correct to the nearest cubic millimetre. - Determine (a) the volume and (b) the surface
area of a sphere of radius 40mm. - The volume of a sphere is 325cm^3. Deter-
mine its diameter. - Given the radius of the earth is 6380km,
calculate, in engineering notation
(a) its surface area in km^2.
(b) its volume in km^3.- An ingot whose volume is 1.5m^3 is to be
made into ball bearings whose radii are
8 .0cm. How many bearings willbe produced
from the ingot, assuming 5% wastage?
27.3 Summary of volumes and surface
areas of common solids
A summary of volumes and surface areas of regular
solids is shown in Table 27.1.
Table 27.1 Volumes and surface areas of regular
solids
Rectangular prism
(or cuboid)h
bl Volume=l×b×h
Surface area= 2 (bh+hl+lb)CylinderhrVolume=πr^2 h
Total surface area= 2 πrh+ 2 πr^2Triangular prismIbhVolume=1
2bhlSurface area=area of each end+
area of three sidesPyramidhAVolume=1
3×A×h
Total surface area=
sum of areas of triangles
forming sides+area of baseConehrl
Volume=1
3πr^2 hCurved surface area=πrl
Total surface area=πrl+πr^2Spherer Volume=4
3πr^3
Surface area= 4 πr^227.4 More complex volumes and surface areas
Here are some worked problems involving more com-
plex and composite solids.Problem 16. A wooden section is shown in
Figure 27.14. Find (a) its volume in m^3 and
(b) its total surface area