All Pre-Algebra Resources
Example Questions
Example Question #11 : Volume Of A Pyramid
Find the volume of a pyramid with a length of 2, width of 6, and a height of 9.
Write the formula for the volume of a pyramid.
Substitute the given length, width, and height.
Rewrite the inside the parentheses as a factor of .
Cancel the fraction with the three and multiply the terms to get the volume.
Example Question #12 : Volume Of A Pyramid
Find the volume of a pyramid if the dimensions of the length, width, and height are , respectively.
Write the volume formula for a pyramid.
Plug in the dimensions.
Cancel out the three on the numerator and denominator.
Multiply.
Example Question #13 : Volume Of A Pyramid
Find the volume of a pyramid with a length of 6cm, a width that is half the length, and a height that is two times the length.
The formula for volume of a pyramid is
where l is the length, w is the width, and h is the height. We know the length is 6cm. The width is half the length, so the width is 3cm. The height is two times the length, so the height is 12cm. Using this information, we substitute. We get
Example Question #1 : Volume Of A Cone
The standard waffle cone at Cream Canyon Ice Cream Parlor has a diameter of 4 inches. If the height of the cone is 1.5 times the diameter, what is the volume of the cone?
We must first recall the formula for the volume of a cone.
where is the radius and is the height. The problem is that we are not provided with either the height or the radius. However, we are told that the height is 1.5 times the diameter. Since the diameter is 4 inches, we can calculate . Thus the height of the cone is 6 inches. We must also recall that the radius of a circle (such as the top of an ice cream cone) is simply half the diameter. Therefore, if the diameter is 4 inches, the radius is 2 inches. We now have all of the essential ingredients for volume.
Since our measurements were all in inches, our volume will be in cubic inches. Therefore, the volume of our ice cream cone is . Now all we need is a scoop or two of our favorite flavor.
Example Question #2 : Volume Of A Cone
Which of the following is the volume of the above cone?
cubic centimeters
cubic centimeters
cubic centimeters
cubic centimeters
cubic centimeters
cubic centimeters
The volume of a cone whose height is and whose base has radius is defined by the formula
.
Set :
cubic centimeters.
Example Question #1 : Volume Of A Cone
The volume of a cone whose height is three times the radius of its base is one cubic yard. Give its radius in inches.
The volume of a cone with base radius and height is
The height is three times this, or . Therefore, the formula becomes
Set this volume equal to one and solve for :
This is the radius in yards; since the radius in inches is requested, multiply by 36.
Example Question #1 : Volume Of A Cone
What is the volume of a cone with a radius of two and a height of three?
Write the formula to find the volume of the cone.
Substitute the radius and height.
Example Question #2 : Volume Of A Cone
What is the volume of a cone with a radius of 5 and a height of 6?
Write the formula to find the volume of a cone.
Substitute the dimensions and solve.
Example Question #3 : Volume Of A Cone
Find the volume of a cone with a base area of and a height of .
The base of a cone has a circular cross section. Given the base area, there is no need to determine the radius.
Write the formula for the volume of a cone.
The term represents the base area of the circle.
Substitute all the given values into the volume formula.
Example Question #2 : Volume Of A Cone
What is the volume of a cone with diameter of 2 and a height of 10?
Write the formula for the volume of a cone.
The radius is half the diameter.
Substitute the radius and the height.