Lesson 15

The cone and cylinder have the same height, and the radii of their bases are equal.

 Here is a method for quickly sketching a cone: 

• Draw an oval.
• Draw a point centered above the oval.
• Connect the edges of the oval to the point.
• Which parts of your drawing would be hidden
  behind the object? Make these parts dashed lines.

A cone and cylinder have the same height and their bases are congruent circles.

 

1. Here is a cylinder and cone that have the same height and the same base area.

   What is the volume of each figure? Express your answers in terms of \(\pi\).

   

   

2. Here is a cone.
   1. What is the area of the base? Express your answer in terms of \(\pi\).
   2. What is the volume of the cone? Express your answer in terms of \(\pi\).

   

   

3. A cone-shaped popcorn cup has a radius of 5 centimeters and a height of 9 centimeters. How many cubic centimeters of popcorn can the cup hold? Use 3.14 as an approximation for \(\pi\), and give a numerical answer.

 

If a cone and a cylinder have the same base and the same height, then the volume of the cone is \(\frac{1}{3}\) of the volume of the cylinder. For example, the cylinder and cone shown here both have a base with radius 3 feet and a height of 7 feet.

If the radius for both is \(r\) and the height for both is \(h\), then the volume of the cylinder is \(\pi r^2h\). That means that the volume, \(V\), of the cone is \(\displaystyle V=\frac{1}{3}\pi r^2h\)