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Advanced Geometry : How to find the length of an edge

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Example Questions

Example Question #44 : Solid Geometry

In order for the height of a regular tetrahedron to be one, what should the lengths of the sides be?

Possible Answers:

$\sqrt{\frac{3}{2}}$

$\sqrt{\frac{2}{3}}$

$\frac{4}{9}$

Correct answer:

$\sqrt{\frac{3}{2}}$

Explanation:

The formula for the height of a regular tetrahedron is $h=\sqrt{\frac{2}{3}}\cdot s$ , where s is the length of the sides.

In this case we want h to be 1, so we need something that multiplies to 1 with $\sqrt{\frac{2}{3}}$ .

We know that $\frac{2}{3}\cdot \frac{3}{2}=1$ , so then we know that

$\sqrt{\frac{2}{3}}\cdot \sqrt{\frac{3}{2}}=\sqrt{1}$ , which equals 1.

Therefore s should be

$\sqrt{\frac{3}{2}}$ .

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Example Question #11 : How To Find The Length Of An Edge

The volume of a regular tetrahedron is $\sqrt{200}$ . Find the length of one side.

Possible Answers:

$2\sqrt[3]{20}$

$2\sqrt{30}$

$6\sqrt{400}$

$2\sqrt[3]{15}$

Correct answer:

$2\sqrt[3]{15}$

Explanation:

The formula for the volume of a regular tetrahedron is $V = \frac{s^3 }{6\sqrt{2}}$ .

In this case we know that the volume, V, is $\sqrt{200}$ , so we can plug that in to solve for s, the length of each edge:

$\sqrt{200}=\frac{s^3}{6\sqrt{2}}$ [multiply both sides by $6\sqrt{2}$ ]

$6\sqrt{400}=s^3$ [evaluate $\sqrt{400}=20$ and multiply]

120 = s^3 [take the cube root of each side]

$\sqrt[3]{120} = s$ .

We can simplify this by factoring 120 as the product of 8 times 15. Since the cube root of 8 is 2, we get:

$2\sqrt[3]{15}$ .

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Example Question #51 : Solid Geometry

A regular tetrahedron has surface area 1,000. Which of the following comes closest to the length of one edge?

Possible Answers:

Correct answer:

Explanation:

A regular tetrahedron has six congruent edges and, as its faces, four congruent equilateral triangles. If we let be the length of one edge, each face has as its area

$A = \frac{s^{2} \sqrt{3}}{4}$ ;

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

S = 4A

$S = 4 \cdot \frac{s^{2} \sqrt{3}}{4}$

$S = s^{2} \sqrt{3}$

Set S = 1,000 and solve for :

$s^{2} \sqrt{3} = 1,000$

Divide by $\sqrt{3}$ :

$\frac{s^{2} \sqrt{3} }{ \sqrt{3} }= \frac{1,000}{ \sqrt{3} }$

$s^{2} = \frac{1,000}{1.7321 }$

$s^{2} \approx 577.3503$

Take the square root of both sides:

$s \approx \sqrt{577.3503}$

$s \approx 24.0281$

Of the given choices, 20 comes closest.

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Example Question #14 : Tetrahedrons

Tetra

The above figure shows a triangular pyramid, or tetrahedron, on the three-dimensional coordinate axes. The tetrahedron has volume 1,000. Which of the following is closest to the value of ?

Possible Answers:

Correct answer:

Explanation:

If we take the triangle on the -plane to be the base of the pyramid, this base has legs both of length ; its area is half the product of the lengths which is

$B = \frac{1}{2} ab = \frac{1}{2} r ^{2}$

Its height is the length of the side along the -axis, which is also of length .

The volume of a pyramid is equal to one third the product of its height and the area of its base, so

$V = \frac{1}{3} \cdot r \cdot \frac{1}{2} r ^{2}$

$= \frac{1}{3} \cdot \frac{1}{2}\cdot r \cdot r ^{2}$

$= \frac{1}{6} r ^{3}$

Setting the volume equal to 1,000, we can solve for :

$\frac{1}{6} r ^{3} = 1,000$

Multiply both sides by 6:

$6\cdot \frac{1}{6} r ^{3} =6\cdot 1,000$

$r ^{3} =6 ,000$

Take the cube root of both sides:

$r =\sqrt[3]{6 ,000}$

$r \approx 18.2$

The closest choice is 20.

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Advanced Geometry : How to find the length of an edge

Study concepts, example questions & explanations for Advanced Geometry

All Advanced Geometry Resources

Example Questions

Example Question #44 : Solid Geometry

Example Question #11 : How To Find The Length Of An Edge

Example Question #51 : Solid Geometry

Example Question #14 : Tetrahedrons

All Advanced Geometry Resources

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