Advanced Geometry : How to find the surface area of a tetrahedron

Study concepts, example questions & explanations for Advanced Geometry

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Example Questions

Example Question #61 : Advanced Geometry

In terms of , find the surface area of a regular tetrahedron with side lengths .

Possible Answers:

Correct answer:

Explanation:

Use the following formula to find the surface area of a regular tetrahedron.

Now, substitute in the value of the side length into the equation.

Example Question #62 : Advanced Geometry

Find the surface area of a regular tetrahedron with a side length of .

Possible Answers:

Correct answer:

Explanation:

Use the following formula to find the surface area of a regular tetrahedron.

Now, substitute in the value of the side length into the equation.

Example Question #13 : How To Find The Surface Area Of A Tetrahedron

In terms of , find the surface area of a regular tetrahedron with a side length of .

Possible Answers:

Correct answer:

Explanation:

Use the following formula to find the surface area of a regular tetrahedron.

Now, substitute in the value of the side length into the equation.

Example Question #14 : How To Find The Surface Area Of A Tetrahedron

The surface area of a regular tetrahedron is . If each side length is , find the value of .

Possible Answers:

Correct answer:

Explanation:

Use the following formula to find the surface area of a regular tetrahedron.

Now, substitute in the value of the side length into the equation.

Now, solve for .

Example Question #1 : How To Find The Surface Area Of A Tetrahedron

If the edge length of a tetrahedron is , what is the surface area of the tetrahedron?

Possible Answers:

Correct answer:

Explanation:

Write the formula for finding the surface area of a tetrahedron.

Substitute the edge and solve.

Example Question #1 : How To Find The Surface Area Of A Tetrahedron

Each of the faces of a regular tetrahedron has a base of  and a height of . What is the surface area of this tetrahedron?

Possible Answers:

Correct answer:

Explanation:

The surface area is the area of all of the faces of the tetrahedron. To begin, we must find the area of one of the faces. Because a tetrahedron is made up of triangles, we simply plug the given values for base and height into the formula for the area of a triangle:

Therefore, the area of one of the faces of the tetrahedron is . However, because a tetrahedron has 4 faces, in order to find the surface area, we must multiply this number by 4:

Therefore, the surface area of the tetrahedron is .

Example Question #2 : Tetrahedrons

What is the surface area of a regular tetrahedron with a slant height of ?

Possible Answers:

Cannot be determined

Correct answer:

Explanation:

If this is a regular tetrahedron, then all four triangles are equilateral triangles. 

If the slant height is , then that equates to the height of any of the triangles being .

In order to solve for the surface area, we can use the formula

where  in this case is the measure of the edge.

The problem has not given the edge; however, it has provided information that will allow us to solve for the edge and therefore the surface area. 

Picture an equilateral triangle with a height .
Tetrahedron

 

Drawing in the height will divide the equilateral triangle into two 30/60/90 right triangles. Because this is an equilateral triangle, we can deduce that finding the measure of the hypotenuse will suffice to solve for the edge length (). 

In order to solve for the hypotenuse of one of the right triangles, either trig functions or the rules of the special 30/60/90 triangle can be used. 

Using trig functions, one option is using .

Rearranging the equation to solve for

Now that  has been solved for, it can be substituted into the surface area equation.

Example Question #1 : Tetrahedrons

What is the surface area of a regular tetrahedron when its volume is 27?

Possible Answers:

Correct answer:

Explanation:

The problem is essentially asking us to go from a three-dimensional measurement to a two-dimensional one. In order to approach the problem, it's helpful to see how volume and surface area are related. 

This can be done by comparing the formulas for surface area and volume:

 

We can see that both calculation revolve around the edge length.

That means, if we can solve for  (edge length) using volume, we can solve for the surface area. 

Now that we know , we can substitute this value in for the surface area formula:

Example Question #15 : How To Find The Surface Area Of A Tetrahedron

Give the surface area of a regular tetrahedron with edges of length 60.

Possible Answers:

Correct answer:

Explanation:

A tetrahedron comprises four triangular surfaces; if the tetrahedron is regular, then each surface is an equilateral triangle. The area of an equilateral triangle with sides of length  can be computed using the formula

;

The total surface area of the tetrahedron is four times this, or

Set  and substitute:

.

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