Surface Area and Volume of Solids
Surface Area and Volume of Solids
Understanding how to calculate the surface area and volume of 3D shapes is essential in geometry. Volume measures the amount of space inside a solid, while Surface Area measures the total area of the solid's outer surfaces.
Prisms and Cylinders
Prisms and cylinders have two parallel, congruent bases.
- Prism:
- Volume: V=Bh
- Surface Area: SA=2B+Ph (Where B is the base area, P is the base perimeter, and h is the height)
- Cylinder:
- Volume: V=ฯr2h
- Surface Area: SA=2ฯr2+2ฯrh
Pyramids and Cones
Pyramids and cones have one base and taper to a point (apex).
- Pyramid:
- Volume: V=31โBh
- Surface Area: SA=B+21โPl (Where l is the slant height)
- Cone:
- Volume: V=31โฯr2h
- Surface Area: SA=ฯr2+ฯrl (Slant height l=r2+h2โ)
Spheres
A sphere is perfectly round, with every point on its surface equidistant from the center.
- Volume: V=34โฯr3
- Surface Area: SA=4ฯr2
Composite Solids
Composite solids are made by combining two or more basic shapes.
- To find the volume, simply add (or subtract) the volumes of the individual solids.
- To find the surface area, add the surface areas of the exposed faces. Be careful not to include the hidden areas where the shapes overlap!
Example Problems
Example 1: Find the volume and surface area of a cone with radius 5 and height 12.
- First, find the slant height (l) using the Pythagorean theorem: l=r2+h2โ=52+122โ=25+144โ=169โ=13
- Calculate Volume: V=31โฯr2h=31โฯ(25)(12)=100ฯ
- Calculate Surface Area: SA=ฯr2+ฯrl=ฯ(25)+ฯ(5)(13)=25ฯ+65ฯ=90ฯ
Example 2: A sphere has a surface area of 100ฯ. Find its volume.
- Find the radius using the surface area formula: 4ฯr2=100ฯ r2=25โนr=5
- Calculate Volume: V=34โฯr3=34โฯ(5)3=3500ฯโ