10. Modeling in 2 & 3 Dimensions

10.02 Cross sections of solids

10.03 Prisms and cylinders

10.04 Cones and pyramids

Lesson

Practice

10.05 Spheres

10.06 Similarity in 2D and 3D figures

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United States of America Virginia

Geometry

10.04 Cones and pyramids

Lesson

Practice

Ideas

Volume of cones
Volume of pyramids
Surface area of cones and pyramids

Volume of cones

While a cylinder is formed by a pair of congruent circles joined by a curved surface, a cone is formed from a single circle with a curved surface that meets itself at the apex (or vertex).

Right cone

A cone in which the apex lies directly above the center of the base

A cone with a dashed line segment drawn from the vertex of the cone to the center of the base. The angle the segment makes with the base is shown to be a right angle.

Exploration

Use the button to pour liquid from the cone into the cylinder.

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How many times does the liquid in the cone fill the cylinder?
How do you think the formula for the volume of a cone will relate to the formula for the volume of a cylinder?

The volume of a cone is exactly one-third the volume of a cylinder formed from the same base with the same perpendicular height. That is, the volume of a cone is given by the general formula:

\displaystyle V = \frac{1}{3}Bh

\bm{B}

area of the base

\bm{h}

perpendicular height

We can rewrite this formula more specifically for cones as:

A right cone with radius r and height h. The area A is equal to pi r squared.

\begin{aligned} \text{Volume} &= \frac{1}{3} \text{Area of Base} \cdot \text{Height} \\ V &= \dfrac{1}{3} \pi r^{2} h \end{aligned}where r is the radius of the base and h is the perpendicular height of the cone.

Examples

Example 1

Find the volume of this cone and round your answer to two decimal places.

Worked Solution

Create a strategy

We can find the volume of the cone using the formula V=\dfrac{1}{3}\pi r^{2}h.

Apply the idea

We are given the radius, r=2, and height, h=6. We can substitute these into the formula to find the volume of the cone.

\displaystyle V	\displaystyle =	\displaystyle \frac{1}{3}\pi r^{2}h	Write the formula
	\displaystyle =	\displaystyle \dfrac{1}{3}\cdot \pi \cdot 2^{2}\cdot 6	Substitute the values
	\displaystyle =	\displaystyle 25.13 \text{ cm}^{2}	Evaluate and round

Example 2

A cone is sawed in half to create the following solid:

Half of a cone (cut from vertex to base) with 5cm diameter and 11 cm slant height.

What is the volume of the solid?

Worked Solution

Create a strategy

Calculate the volume of the original cone, then take half the volume. We need the height of the cone, so use the Pythagorean theorem with the height of the slanted lateral face as the hypotenuse and the radius of the base as the length of the triangle's short leg.

Apply the idea

First, we'll find the height of the cone:

\displaystyle a^{2}+b^{2}	\displaystyle =	\displaystyle c^{2}	Pythagorean theorem
\displaystyle 5^{2}+b^{2}	\displaystyle =	\displaystyle 11^{2}	Substitute a=5 and c=11
\displaystyle 25+b^{2}	\displaystyle =	\displaystyle 121	Evaluate the exponents
\displaystyle b^{2}	\displaystyle =	\displaystyle 96	Subtract 25 from both sides
\displaystyle b	\displaystyle =	\displaystyle \sqrt{96}	Evaluate the square root of both sides

The height of the cone is \sqrt{96 } \text{ cm}.

Now, we need the area of the base of the original cone. We know that the radius of the base is 5 \text{ cm}, so the area of the base is \pi \left(5 ^{2} \right) = 25 \pi \text{ cm}^{2}.

We can calculate the volume of the original cone as follows:

\displaystyle V	\displaystyle =	\displaystyle \frac{1}{3}Bh	Volume of a cone
	\displaystyle =	\displaystyle \frac{1}{3} \left( 25 \pi \right) \left( \sqrt{96} \right)	Substitute B= 25 \pi and h = \sqrt{96}
	\displaystyle \approx	\displaystyle 256.50997	Evaluate the multiplication

Finally, since the cone was sawed in half, we can take half of the total cone of the original cone to be approximately 128.25 \text{ cm} ^{3}.

Example 3

A cone has a volume of 160 \text{ mm}^{3}. If the perpendicular height and radius of the cone are equal in length, find the radius r in mm. Round your answer to two decimal places.

Worked Solution

Create a strategy

The volume of a cone is found by V=\dfrac{1}{3}\pi r^{2}h.

Since the perpendicular height and radius are the same, the volume is equal to:

\displaystyle V	\displaystyle =	\displaystyle \dfrac{1}{3}\pi r^{2}h	Volume of a cone
	\displaystyle =	\displaystyle \frac{1}{3} \pi r^{3}	Substitute h=r

Apply the idea

We are given the volume is 160 \text{ mm}^{3}, so we can substitute this into our equation and solve for r.

Solving for r, we have

\displaystyle 160	\displaystyle =	\displaystyle \frac{1}{3}\pi r^{3}	Substitute V=160
\displaystyle 480	\displaystyle =	\displaystyle \pi r^{3}	Multiply 3 on both sides
\displaystyle \frac{480}{\pi}	\displaystyle =	\displaystyle \frac{\pi r^{3}}{\pi}	Divide \pi on both sides
\displaystyle r^{3}	\displaystyle =	\displaystyle \frac{480}{\pi}	Evaluate the division
\displaystyle \sqrt[3]{r^{3}}	\displaystyle =	\displaystyle \sqrt[3]{\frac{480}{\pi}}	Take the cube root of both sides of the equation
\displaystyle r	\displaystyle =	\displaystyle 5.35 \text{ mm}	Evaluate

Reflect and check

Let's check our answer by finding the volume of the cone using 5.35 \text{ mm} for the radius and height:

\displaystyle \frac{1}{3}\pi r^{2} h	\displaystyle =	\displaystyle \frac{1}{3}\pi \left(5.35\right)^{2} \left(5.35\right)	Substitute 5.35 for r and h
	\displaystyle =	\displaystyle 160.28	Evaluate

Notice that this volume is slightly differently from the given volume of 160 \text{ mm}^{3}. This is because we rounded r to two decimal places. Rounding can introduce slight differences in values, especially those involving \pi and cube roots. It's important to consider the effects of rounding when stating or checking answers.

Example 4

An ice cream shop currently has one size ice cream cone. They are adding a new, larger size option.

The new cone will have 2 times the volume of the original cone.
The height of the new cone will remain the same as the height of the original cone.

How does the new radius compare to the radius of the original cone?

Worked Solution

Create a strategy

We can set up an equation given the following:

The volume of a cone is given by V=\dfrac{1}{3} \pi r^{2}h.
The height of both cones remains the same.
The new cone has 2 times the volume of the original cone.

Let's denote the radius of the original cone as r and the new cone as r_{\text{new}}.

Apply the idea

Let the volume of the original cone be V=\dfrac{1}{3}\pi r^{2}h.

Let the volume of the new cone be V_{\text{new}}=\dfrac{1}{3}\pi r_{\text{new}}^{2}h.

Since the new cone has twice the volume of the original cone, we can say V_{\text{new}}=2\cdot\left(\dfrac{1}{3}\pi r^{2}h\right). We can use the expressions for V_{\text{new}} to write and solve an equation.

\displaystyle \dfrac{1}{3}\pi r_{\text{new}}^{2}h	\displaystyle =	\displaystyle 2\cdot\left(\dfrac{1}{3}\pi r^{2}h\right)	Equate the expressions for the volume of the new cone
\displaystyle r_{\text{new}}^{2}	\displaystyle =	\displaystyle 2\cdot\left( r^{2}\right)	Divide both sides by \dfrac{1}{3}\pi h
\displaystyle r_{\text{new}}	\displaystyle =	\displaystyle \sqrt{2}\cdot r	Square root both sides

So, the length of the radius of the new cone is \sqrt{2} times the length of the radius of the original cone.

Reflect and check

To verify that r_{\text{new}}=\sqrt{2} \cdot r, we can calculate the volumes of both cones and see if the new cone's volume is twice of the original cone's volume.

As an example, let's set r=1 \text{ in}, h=2 \text{ in}, and \pi=3.14.

Let's first calculate the volume of the original cone:

\displaystyle \text{Volume of the original cone}	\displaystyle =	\displaystyle \frac{1}{3} \left(3.14\right) \left(1\right)^{2} \left(2\right)	Substitute r=1, h=2, and \pi=3.14
	\displaystyle =	\displaystyle 2.09\text{ in}^{3}	Evaluate and round to two decimal places

Let's calculate the volume of the new cone. Note that the radius of the new cone is \sqrt{2} times the length of the radius of the original cone:

\displaystyle \text{Volume of the new cone}	\displaystyle =	\displaystyle \frac{1}{3} \left(3.14\right) \left(\sqrt{2} \cdot 1 \right)^{2} \left(2\right)	Substitute r=\sqrt{2}, h=2, and \pi=3.14
	\displaystyle =	\displaystyle 4.19\text{ in}^{3}	Evaluate and round to two decimal places

\dfrac{\text{Volume of the new cone}}{\text{Volume of the original cone}}=\dfrac{4.19 \text{ in}^{3}} { 2.09\text{ in}^{3} } \approx 2

This verifies that the new cone's radius is indeed 2 times the original. The slight discrepancy is due to rounding.

Idea summary

The volume of a cone can be found by taking one-third the volume of a cylinder with the same base area and height. The formula for the volume of a cone is given by:

\displaystyle V = \frac{1}{3}Bh

\bm{B}

area of the base

\bm{h}

perpendicular height

This can be rewritten specifically for cones as:

\displaystyle V = \frac{1}{3} \pi r^{2} h

\bm{r}

radius of the base

\bm{h}

perpendicular height

Volume of pyramids

A pyramid is a figure formed from a polygonal base and a set of triangular faces. The triangular faces connect to one side of the base and all join together at the apex.

Rectangular pyramid

A pyramid with a rectangular base

Triangular pyramid

A pyramid with a triangular base

Exploration

Drag the sliders to fold the pyramids in to the cube and change the size of the figure.

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How many pyramids fit into the prism?
If the volume of a prism is found using the formula V=Bh, how do you think we can find the volume of a pyramid?

Similarly to the volume of a cylinder and a cone, the volume of a pyramid is also calculated by taking one-third the volume of a prism that has the same height and base area.

\displaystyle V = \frac{1}{3}Bh

\bm{B}

area of the base

\bm{h}

perpendicular height

A more specific formula is dependent on the shape of the base.

Examples

Example 5

The Pyramid of Giza is a square pyramid, that is 280 Egyptian royal cubits high and has a base length of 440 Egyptian royal cubits. What is the volume of the Pyramid of Giza?

Worked Solution

Create a strategy

First we find the area of the base, then we can use that to find the volume. Since this solid is a square pyramid, the base is a square.

Apply the idea

Finding the area of the base, we have:

\displaystyle B	\displaystyle =	\displaystyle \text{side length}^{2}	Area of a square
	\displaystyle =	\displaystyle 440^{2}	Substitute the side length
	\displaystyle =	\displaystyle 193\,600	Simplify

We can now use this to calculate the volume:

\displaystyle V	\displaystyle =	\displaystyle \frac{1}{3}Bh	Volume of a pyramid
	\displaystyle =	\displaystyle \frac{1}{3} \cdot 193\,600 \cdot 280	Substitute known values
	\displaystyle =	\displaystyle 18\,069\,333 \frac{1}{3}	Simplify

So the volume of the Pyramid of Giza is 18 \, 069 \, 333 \dfrac{1}{3} cubic Egyptian royal cubits.

Example 6

A small square pyramid of height 4 \text{ cm} was removed from the top of a large square pyramid of height 8 \text{ cm} forming the solid shown. Find the exact volume of the solid.

A square based pyramid with its top removed. the height of the removed part is 4cm and its base side is 4cm. The remaining portion of the pyramid has a height of 4cm and base side of 8cm.

Worked Solution

Create a strategy

Subtract the volume of the smaller pyramid from the volume of the larger pyramid.

Apply the idea

Start by calculating the volume of the larger pyramid. We have

\displaystyle V	\displaystyle =	\displaystyle \frac{1}{3}Bh	Volume of a pyramid
	\displaystyle =	\displaystyle \frac{1}{3} \left(64 \right) \left(8 \right)	Substitute B=64 for the area of the base and h=8 for the height of the larger pyramid
	\displaystyle =	\displaystyle \frac{512}{3}	Evaluate the multiplication

The volume of the larger pyramid is exactly \dfrac{512}{3} \text{ cm}^3.

Now we can calculate the volume of the smaller pyramid. We have

\displaystyle V	\displaystyle =	\displaystyle \frac{1}{3}Bh	Volume of a pyramid
	\displaystyle =	\displaystyle \frac{1}{3} \left(16 \right) \left(4 \right)	Substitute B=16 for the area of the base and h=4 for the height of the smaller pyramid
	\displaystyle =	\displaystyle \frac{64}{3}	Evaluate the multiplication

The volume of the smaller pyramid is exactly \dfrac{64}{3} \text{ cm}^3.

The volume of the solid after removing the smaller pyramid is \dfrac{512}{3} \text{ cm}^3 - \dfrac{64}{3} \text{ cm}^{3} = \dfrac{448}{3} \text{ cm}^{3}.

Reflect and check

We could choose to leave the solution in exact form, since the directions do not specify rounding requirements, or we could simplify the solution and round to a measure we find appropriate.

Example 7

The height and base side of a triangular pyramid are tripled. The triangular base is equilateral. Determine the effect this has on the volume of the pyramid.

A triangular based pyramid with height of 24in and base side of 20 in. The height of the triangular base is 17.3 in.

Worked Solution

Create a strategy

To determine the effect on the volume, recall that the volume of a triangular pyramid is given by V = \dfrac{1}{3}BH, where B is the area of the triangular base and H is the perpendicular height.

We can calculate B using the triangle area formula A=\dfrac{1}{2}bh, where b is the base and h is the height of the triangle.

We can determine the effect on the volume by tripling the perpendicular height and the base side, calculating the new volume, then dividing the new volume by the original volume.

Apply the idea

We are given the following:

Perpendicular height of the pyramid \left(H\right)=24 \text{ in}
Base side \left(b\right) = 20\text{ in}
Height of the triangular base \left(h\right) = 17.3\text{ in}

Let's calculate the original volume:

\displaystyle V_{\text{original}}	\displaystyle =	\displaystyle \frac{1}{3}BH	Volume of a right pyramid
	\displaystyle =	\displaystyle \frac{1}{3} \left(\frac{1}{2}bh \right)H	Substitute B=\dfrac{1}{2}bh
	\displaystyle =	\displaystyle \frac{1}{3} \left(\frac{1}{2}\left(20\right)\left(17.3\right) \right) \left(24\right)	Substitute b=20, \,h=17.3, and H=24
	\displaystyle =	\displaystyle 1384 \text{ in}^{3}	Evaluate

Let's calculate the new volume using the tripled dimensions:

Perpendicular height of the pyramid \left(H\right)=72 \text{ in}
Base side \left(b\right) = 60\text{ in}
Height of the triangular base \left(h\right) = 51.9\text{ in}

\displaystyle V_{\text{new}}	\displaystyle =	\displaystyle \frac{1}{3}BH	Volume of a right pyramid
	\displaystyle =	\displaystyle \frac{1}{3} \left(\frac{1}{2}bh \right)H	Substitute B=\dfrac{1}{2}bh
	\displaystyle =	\displaystyle \frac{1}{3} \left(\frac{1}{2}\left(60\right)\left(51.9\right) \right) \left(72\right)	Substitute b=60, \,h=51.9, and H=72
	\displaystyle =	\displaystyle 37\,368 \text{ in}^{3}	Evaluate

The effect of on the volume is:

\frac{V_{\text{new}}}{V_{\text{original}}}=\frac{37\,368\text{ in}^{3}}{1384\text{ in}^{3}}=27

Scaling the pyramid's height and base side length by a factor of 3 causes the volume to increase by a factor of 27.

Reflect and check

Tripling the height and base of the original pyramid, a, results in a new pyramid, b, that maintains proportional dimensions with the original. These two pyramids are similar figures, and the ratio between their volumes is a^{3}:b^{3}.

So, increasing the dimensions of the orignal triangle by a factor of 3 results in the volume being multiplied by 3^{3} or 27.

Idea summary

The volume of a pyramid can be found by taking one-third the volume of a prism with the same base area and height. The formula for the volume of a pyramid is given by:

\displaystyle V = \frac{1}{3}Bh

\bm{B}

area of the base

\bm{h}

perpendicular height

Surface area of cones and pyramids

Similar to prisms, we can consider the nets of pyramids and cones to determine their surface area and lateral surface area.

Exploration

Flatten the cone using the sliders and then straighten the arc and dissect the sector created by the lateral face of the cone. Use the sliders to explore what happens.

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The formula for the lateral surface area of a cone is given by LA=\pi r h_s, where r is the radius of the base of the cone and h_s is the slant height of the cone. How does this formula relate to the area of the rearranged lateral face on the cone?

The surface area of a pyramid or cone is the sum of the area of the base and the area of the lateral face. The formula can be written generally as:

\displaystyle SA=LA+B

\bm{LA}

lateral area

\bm{B}

area of base

The net of a square pyramid with a square base and four triangles.

For a pyramid, the lateral area can be found by calculating the area of each of the triangular faces.

For a cone we must find the area of the circular base and add that to the area of the sector that creates the lateral face.

A cone with radius R, height H, and slant height L, and its net made up of a circle with radius R and a sector with radius L.

\text{Area of the sector}=\pi l^{2} \cdot \frac{r}{l}=\pi rl

We can then combine this area with the area of the circular base to get a formula for the surface area of a cone given by:

\begin{aligned} \text{Surface area of right cone} &= \text{Area of base} + \text{Area of sector} \\ SA &= \pi r^2 + \pi r l \end{aligned} where r is the cone's base radius and l is the slant height.

Examples

Example 8

Consider the diagram of the right square pyramid and its net shown:

A right square pyramid with slant height 'l' and base side 'b'.

Net of a right square pyramid with slant height 'l' and base side 'b'.

Let b= the base of each triangle and l= the height of each triangle.

Explain a process for finding the surface area of the square pyramid.

Worked Solution

Apply the idea

To find the surface area of the square pyramid, we will need to calculate the sum of the area of the pyramid's base and the area of the pyramid's lateral faces.

First, we find the area of the base of the pyramid.

Then, we find the area of the lateral faces of the pyramid. Since the base of this pyramid is a square, which is a regular polygon, each of the lateral face triangles are congruent. So, we can calculate the area of one of the faces and multiply that by the number of faces on the pyramid.

Together, these areas make up the entire surface area of the square pyramid, which is the area of its net.

Reflect and check

We could use the given dimensions to write an expression for the surface area of the given pyramid.

For this pyramid, the area of the base, B, is B=b \cdot b or B=b^{2}.

Then the area of each triangle, A, is A=\dfrac{1}{2}bl. Since there are 4 faces, we multiply the area of the triangular face by 4.

Therefore, the total surface area of the square pyramid can be expressed as \\\\ SA=b^{2} + 4 \left(\dfrac{1}{2}bl \right) or SA=B + 4A.

Now, consider the regular right octagonal pyramid shown below, where a= the distance from the midpoint of a side of the base to the center of the base:

Right octagonal based pyramid with 'a' as the distance from the midpoint of a side of the base to the center of the base, and 'l' as the distance from the center of the base of each triangular side to the apex.

Draw the net of the right octagonal pyramid and describe how to find the surface area of the pyramid.

Worked Solution

Create a strategy

We can draw the net of the octagonal pyramid the same way as the net in part (a) is drawn, or we can imagine unraveling the lateral faces of the pyramid and drawing them side by side.

Apply the idea

Net of the octagonal based pyramid with 'b' as the base, 'a' as the distance from the center of the base to the midpoint of the side, and 'l' as the distance from the midpoint of the base of the triangular side to its apex.

For this pyramid, we will again need to calculate the area of the base and the lateral surface area.

We can find the area of the base by cutting the octagon into eight congruent triangles, and then finding the sum of the area of each triangle. For the lateral surface area, we can calculate the area of one triangle and multiply by eight triangles. Together, the base area and lateral surface area make up the surface area of the pyramid.

Reflect and check

We could use the given dimensions to write an expression for the surface area of the given pyramid. This would summarise our description algebraically

For this pyramid, the area of the base, B, can be calculated by finding the total area of the 8 congruent triangles formed by joining the corners of the base to its center B=8 \left(\dfrac{1}{2}b\cdot a\right) or B=4ab.

Then the area of each triangular face, A, is A=\dfrac{1}{2}bl. Since there are 8 faces, we multiply the area of the triangular face by 8.

Therefore, the total surface area of the octagonal pyramid can be expressed as: SA=4ab + 4bl or SA=B + 8A.

Write a formula for finding the surface area of a regular, right n-gon pyramid. Explain your reasoning.

Worked Solution

Create a strategy

For any pyramid, we know that the net we need the area from will have a base and lateral faces that we need the sum of.

Apply the idea

If we let B= the area of the base and A= the area of one of the lateral face triangles, we can say that the surface area, SA, is equivalent to the sum of the area of the base and the area of the lateral faces. For any n-gon, the number of lateral faces is equal to the number of sides of the polygon.

A formula for the surface area of any pyramid is SA= B+ nA.

Reflect and check

We can express the formula above in different forms depending on the dimensions given in a problem. For example, if we are given the following dimensions:

b - the base of each triangular face
l - the height of each triangular face
a - the distance from the midpoint of a side of the base to the center of the base

Then the formula can also be expressed in terms of these parameters. We have the area of the base, B, will be n triangles of base b and height a. Hence, B=n\left(\dfrac{1}{2}ab\right). And the area of each face is A=\dfrac{1}{2}bl.

So, the total surface area is SA=n\left(\dfrac{1}{2}ab\right)+n\left(\dfrac{1}{2}bl\right), which could also be expressed as SA=\dfrac{nb}{2}\left(a+l\right).

Example 9

What is the surface area of the following cone?

A cone with radius of 3cm and height of 9cm

Worked Solution

Create a strategy

Calculate the slant height of the cone using the Pythagorean theorem, then use the formula for the surface area of a cone to calculate the surface area.

Apply the idea

The slant height of the cone can be found using the Pythagorean theorem as follows:

\displaystyle a^{2}+b^{2}	\displaystyle =	\displaystyle c^{2}	Pythagorean theorem
\displaystyle 3^{2} + 9^{2}	\displaystyle =	\displaystyle c^{2}	Substitute a=3 and b=9
\displaystyle 90	\displaystyle =	\displaystyle c^{2}	Evaluate the exponents and addition
\displaystyle \sqrt{90}	\displaystyle =	\displaystyle c	Evaluate the square root of both sides

The slant height of the cone is \sqrt{90} \text{ cm}.

Now, we can calculate the surface area as follows:

\displaystyle SA	\displaystyle =	\displaystyle \pi r^{2}+ \pi rl	Surface area of a cone
	\displaystyle =	\displaystyle \left(\pi \cdot 3^{2} \right) + \left( \pi \cdot 3 \cdot \sqrt{90} \right)	Substitute r=3 and l = \sqrt{90}
	\displaystyle =	\displaystyle 37.46 \pi	Evaluate the exponent, square root, multiplication, and addition

The surface area of the cone is 37.46 \pi \text{ cm}^2.

Example 10

The Pyramid of Giza is a square pyramid, that is 280 Egyptian royal cubits high and has a base length of 440 Egyptian royal cubits. What is the surface area of the exposed walls of Pyramid of Giza?

Worked Solution

Create a strategy

We will need the height of a lateral face of the pyramid to calculate the lateral surface area. First, find the height of one lateral face using the Pythagorean theorem, then calculate the surface area of the pyramid. The diagram that follows shows the dimensions of the Pyramid of Giza:

A pyramid with height labeled as '280 Egyptian royal cubits, lateral height 'l', and the distance from the center of the base to the midpoint of the side labeled '220 Egyptian royal cubits'.

Apply the idea

First, we'll use the height and half the length of the base as the legs in the Pythagorean theorem:

\displaystyle a^{2} + b^{2}	\displaystyle =	\displaystyle c^{2}	Pythagorean theorem
\displaystyle 220^{2}+280^{2}	\displaystyle =	\displaystyle c^{2}	Substitute a=220 andb=280
\displaystyle 126\,800	\displaystyle =	\displaystyle c^{2}	Evaluate the exponents and addition
\displaystyle \sqrt{126\,800}	\displaystyle =	\displaystyle c	Evaluate the square root of both sides

The height of one lateral face of the pyramid is exactly \sqrt{126\,800} Egyptian royal cubits.

We can use this to calculate the area of one of the faces of the Pyramid of Giza as follows:

\displaystyle A	\displaystyle =	\displaystyle \frac{1}{2}bh	Area of a triangle
	\displaystyle =	\displaystyle \frac{1}{2} \left(440 \right) \left(\sqrt{126\,800} \right)	Substitute b=440 and h= \sqrt{126\,800}
	\displaystyle =	\displaystyle \left(220 \right) \left(\sqrt{126\,800} \right)	Evaluate the multiplication

The area of one of the faces of the Pyramid of Giza is \left(220 \right) \left(\sqrt{126\, 800} \right)\text{ Egyptian royal cubits}^{2}, so the area of all four lateral faces is \left(880 \right) \left(\sqrt{126\,800} \right) \text{ Egyptian royal cubits}^{2} .

\displaystyle LA	\displaystyle =	\displaystyle \left(880 \right) \left(\sqrt{126\,800} \right)
\displaystyle LA	\displaystyle =	\displaystyle 313\,359.0911

The surface area of the exposed walls of Pyramid of Giza to the nearest square royal cubit is 313\,359 \text{ Egyptian royal cubits}^2.

Reflect and check

The actual length of an Egyptian royal cubit is about 20 \text{ in}, consider how the surface area compares to area of a football field. Note that we did not simplify the square root until the final calculation in order to preserve the precision of the length.

Example 11

A decorative lampshade is designed in the shape of a right circular cone with an original height of 8\text{ in} and a radius of 4\text{ in}. To fit a larger lamp base, the height of the lampshade is increased by 6\text{ in}. Determine the new total surface area of the cone.

Provide your answer rounded to the nearest whole number.

Worked Solution

Create a strategy

To find the new total surface area of the cone, we first calculate the slant height using the Pythagorean theorem, given the new height and the radius.

Remember that the decorative lampshade shaped as a right circular cone has no base. We only need to calculate the lateral surface area A_{\text{lateral}}=\pi r l, where r is the radius and l is the slant height.

Apply the idea

The new height of the cone is: 8\text{ in} + 6\text{ in} = 14\text{ in}

The slant height l of the cone is

l = \sqrt{\left(14\right)^{2} + \left(4\right)^{2}} = \sqrt{196 + 16} = \sqrt{212}

Using \pi \approx 3.14, calculate the lateral surface area:

\displaystyle A_{\text{lateral}}	\displaystyle =	\displaystyle \pi\cdot r\cdot l	Formula for lateral surface area
	\displaystyle =	\displaystyle \pi \cdot 4 \cdot \sqrt{212}	Substitute known values
	\displaystyle \approx	\displaystyle 183 \text{ in}^{2}	Evaluate

Idea summary

The surface area of a cone or pyramid can be calculated using the formula:

\displaystyle SA=LA+B

\bm{LA}

lateral area

\bm{B}

area of base

Outcomes

G.DF.1

The student will create models and solve problems, including those in context, involving surface area and volume of rectangular and triangular prisms, cylinders, cones, pyramids, and spheres.

G.DF.1b

Create models and solve problems, including those in context, involving surface area of threedimensional figures, as well as composite three-dimensional figures.

G.DF.1c

Solve multistep problems, including those in context, involving volume of three-dimensional figures, as well as composite three-dimensional figures.

G.DF.1d

Determine unknown measurements of three-dimensional figures using information such as length of a side, area of a face, or volume.

G.DF.2

The student will determine the effect of changing one or more dimensions of a three-dimensional geometric figure and describe the relationship between the original and changed figure.

G.DF.2a

Describe how changes in one or more dimensions of a figure affect other derived measures (perimeter, area, total surface area, and volume) of the figure.

G.DF.2b

Describe how changes in surface area and/or volume of a figure affect the measures of one or more dimensions of the figure.

G.DF.2c

Solve problems, including those in context, involving changing the dimensions or derived measures of a three-dimensional figure.

10.04 Cones and pyramids

Ideas

Volume of cones

Exploration

Examples

Example 1

Example 2

Example 3

Example 4

Volume of pyramids

Exploration

Examples

Example 5

Example 6

Example 7

Surface area of cones and pyramids

Exploration

Examples

Example 8

Example 9

Example 10

Example 11

Outcomes

G.DF.1

G.DF.1b

G.DF.1c

G.DF.1d

G.DF.2

G.DF.2a

G.DF.2b

G.DF.2c

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