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Solids of Revolution: Volumes by Disks Main Concept A solid of revolution is a solid three-dimensional figure created by rotating a subregion of the xy -plane around a straight line, usually the x -axis or the y -axis. Assuming there is a single function. 11.2 Solids of Revolution (Discs) Test Prep. Title: C11 HW Key.pdf Author: sean.mcconnell Created Date: 4/4/2018 2:46:16 PM.
Solids of Revolutions - Volume. Added Apr 30, 2016 by dannymntya in Mathematics. Calculate volumes of revolved solid between the curves, the limits, and the axis of. Textbook solution for Calculus 10th Edition Ron Larson Chapter 11.2 Problem 39E. We have step-by-step solutions for your textbooks written by Bartleby experts! 57095-11.2-39E-Question-Digital.docx Finding the Equation of a Sphere In Exercises 37-40, find the standard equation of the sphere. Definite Integral, Integral Calculus, Rotation, Solids or 3D Shapes, Volume Creatung a solid through rotation of a graph round the x- or y-axis. Exercise Visualize the solid of revolution which is determined by the rotation of the sine function between 0 and 2π.
In this section, we use definite integrals to find volumes of three-dimensional solids. We consider three approaches—slicing, disks, and washers—for finding these volumes, depending on the characteristics of the solid.Volume and the Slicing Method
Just as area is the numerical measure of a two-dimensional region, volume is the numerical measure of a three-dimensional solid. Most of us have computed volumes of solids by using basic geometric formulas. The volume of a rectangular solid, for example, can be computed by multiplying length, width, and height: (V=lwh.) The formulas for the volumes of:
*a sphere
[V_{sphere}=dfrac{4}{3}πr^3,]
*a cone
[V_{cone}=dfrac{1}{3}πr^2h]
*and a pyramid
[V_{pyramid}=dfrac{1}{3}Ah]
have also been introduced. Although some of these formulas were derived using geometry alone, all these formulas can be obtained by using integration.
We can also calculate the volume of a cylinder. Although most of us think of a cylinder as having a circular base, such as a soup can or a metal rod, in mathematics the word cylinder has a more general meaning. To discuss cylinders in this more general context, we first need to define some vocabulary.
We define thecross-sectionof a solid to be the intersection of a plane with the solid. A cylinder is defined as any solid that can be generated by translating a plane region along a line perpendicular to the region, called the axis of the cylinder. Thus, all cross-sections perpendicular to the axis of a cylinder are identical. The solid shown in Figure is an example of a cylinder with a noncircular base. To calculate the volume of a cylinder, then, we simply multiply the area of the cross-section by the height of the cylinder: (V=A⋅h.) In the case of a right circular cylinder (soup can), this becomes (V=πr^2h.)
If a solid does not have a constant cross-section (and it is not one of the other basic solids), we may not have a formula for its volume. In this case, we can use a definite integral to calculate the volume of the solid. We do this by slicing the solid into pieces, estimating the volume of each slice, and then adding those estimated volumes together. The slices should all be parallel to one another, and when we put all the slices together, we should get the whole solid. Consider, for example, the solid S shown in Figure, extending along the x-axis.
We want to divide (S) into slices perpendicular to the x-axis. As we see later in the chapter, there may be times when we want to slice the solid in some other direction—say, with slices perpendicular to the y-axis. The decision of which way to slice the solid is very important. If we make the wrong choice, the computations can get quite messy. Later in the chapter, we examine some of these situations in detail and look at how to decide which way to slice the solid. For the purposes of this section, however, we use slices perpendicular to the x-axis.
Because the cross-sectional area is not constant, we let (A(x)) represent the area of the cross-section at point x. Now let (P={x_0,x_1…,X_n}) be a regular partition of ([a,b]), and for (i=1,2,…n), let (S_i) represent the slice of (S) stretching from (x_{i−1}) to (x_i). The following figure shows the sliced solid with (n=3).
Finally, for (i=1,2,…n,) let (x^∗_i) be an arbitrary point in ([x_{i−1},x_i]). Then the volume of slice (S_i) can be estimated by (V(S_i)≈A(x^∗_i)Δx). Adding these approximations together, we see the volume of the entire solid (S) can be approximated by
[V(S)≈sum_{i=1}^nA(x^∗_i)Δx.]
By now, we can recognize this as a Riemann sum, and our next step is to take the limit as (n→∞.) Then we have
[V(S)=lim_{n→∞}sum_{i=1}^nA(x^∗_i)Δx=∫^a_bA(x)dx.]
The technique we have just described is called the slicing method. To apply it, we use the following strategy.
Problem-Solving Strategy: Finding Volumes by the Slicing Method
*Examine the solid and determine the shape of a cross-section of the solid. It is often helpful to draw a picture if one is not provided.
*Determine a formula for the area of the cross-section.
*Integrate the area formula over the appropriate interval to get the volume.
Recall that in this section, we assume the slices are perpendicular to the x-axis. Therefore, the area formula is in terms of x and the limits of integration lie on the x-axis. However, the problem-solving strategy shown here is valid regardless of how we choose to slice the solid.
Example (PageIndex{1}): Deriving the Formula for the Volume of a Pyramid
We know from geometry that the formula for the volume of a pyramid is (V=dfrac{1}{3}Ah). If the pyramid has a square base, this becomes (V=dfrac{1}{3}a^2h), where a denotes the length of one side of the base. We are going to use the slicing method to derive this formula.
Solution
We want to apply the slicing method to a pyramid with a square base. To set up the integral, consider the pyramid shown in Figure, oriented along the x-axis.
We first want to determine the shape of a cross-section of the pyramid. We are know the base is a square, so the cross-sections are squares as well (step 1). Now we want to determine a formula for the area of one of these cross-sectional squares. Looking at Figure(b), and using a proportion, since these are similar triangles, we have
[dfrac{s}{a}=dfrac{x}{h}]
or
[s=dfrac{ax}{h}.]
Therefore, the area of one of the cross-sectional squares is
[A(x)=s^2=(dfrac{ax}{h})^2 (step2).]
Then we find the volume of the pyramid by integrating from (0) to (h) (step 3):
[V=∫_0^hA(x)dx=∫_0^h(dfrac{ax}{h})^2dx=dfrac{a^2}{h^2}∫_0^hx^2dx=left.[dfrac{a^2}{h^2}(dfrac{1}{3}x^3)]right|^h_0=dfrac{1}{3}a^2h.]
This is the formula we were looking for.
Exercise (PageIndex{1})
Use the slicing method to derive the formula [V=dfrac{1}{3}πr^2h] for the volume of a circular cone.Hint
Use similar triangles, as in the Example. Consider what the shape of a slice is.Answer
First, we want to determine the shape of a cross section of this circular cone. As the name states, we expect the cross section to be a circle. Knowing the formula for the area of a circle, (A_{Circle}=pi r^2), we can now find the value of r using similar triangles. This process was used above to solve for a pyramid with a square base.
Notice the ratio of similar triangles is: [dfrac{r}{R}=dfrac{x}{h}.]
or [r=dfrac{Rx}{h}.]
Substituting into the formula for area we get: [A(x) = pi r^2 = pi (dfrac{Rx}{h})^2.]
Now, if we consider this circle as a very, very thin disc, with thickness (dx) and radius (r), where (r=dfrac{Rx}{h}).
We can write an equation for the volume of this very, very thin disc. [dV=pi (dfrac{Rx}{h})^2dx.]
Taking the complete distance of the cone from base to point as (h) we can establish bounds for integration and solve for the area of the cone. [V=int_{0}^{h}A(x)dx=pidfrac{R^2}{h^2}int_{0}^{h}x^2dx=Big[pidfrac{R^2}{h^2}(dfrac{1}{3}x^3)Big]_0^h=dfrac{1}{3} pi R^2h]Solids of Revolution
If a region in a plane is revolved around a line in that plane, the resulting solid is called a solid of revolution, as shown in the following figure.
Solids of revolution are common in mechanical applications, such as machine parts produced by a lathe. We spend the rest of this section looking at solids of this type. The next example uses the slicing method to calculate the volume of a solid of revolution.
Example (PageIndex{2}): Using the Slicing Method to find the Volume of a Solid of Revolution
Use the slicing method to find the volume of the solid of revolution bounded by the graphs of (f(x)=x^2−4x+5,x=1),and (x=4,) and rotated about the x-axis.
Solution
Using the problem-solving strategy, we first sketch the graph of the quadratic function over the interval ([1,4]) as shown in the following figure.
Next, revolve the region around the x-axis, as shown in the following figure.
Since the solid was formed by revolving the region around the x-axis, the cross-sections are circles (step 1). The area of the cross-section, then, is the area of a circle, and the radius of the circle is given by (f(x).) Use the formula for the area of the circle:
[A(x)=πr^2=π[f(x)]^2=π(x^2−4x+5)^2(step 2).]
The volume, then, is (step 3)
[begin{align} V &=∫^a_hA(x)dx &=∫^4_1π(x^2−4x+5)^2dx &=π∫^4_1(x^4−8x^3+26x^2−40x+25)dx &=left. πleft(dfrac{x^5}{5}−2x^4+dfrac{26x^3}{3}−20x^2+25xright)right|^4_1 &=dfrac{78}{5}π end{align}]
The volume is (78π/5.)
Exercise (PageIndex{2})
Use the method of slicing to find the volume of the solid of revolution formed by revolving the region between the graph of the function (f(x)=1/x) and the x-axis over the interval ([1,2]) around the x-axis. See the following figure.Hint
Use the problem-solving strategy presented earlier. Always consider the dimensions for the disk. What is the radius?Answer
Since the solid was formed by revolving about the x-axis, the cross sections will be circles. The ares of the cross section is that of a circle. with the radius being (f(x)). The area can be written as follows:[A(x)=pi r^2=pi Big(dfrac{1}{x}Big)^2=pi Big(dfrac{1}{x^2}Big)].
Expressing this as a volume for a thin disc we get: [dV=pi Big(dfrac{1}{x^2}Big)dx]
Now taking the definite integral within the interval [1,2] we can solve for the volume of the solid.[V=piint_1^2Big(dfrac{1}{x^2}Big)dx=pi Big[-dfrac{1}{x}Big]_1^2=pi [-dfrac{1}{2}+1]=dfrac{pi}{2}]The Disk Method
When we use the slicing method with solids of revolution, it is often called the disk method because, for solids of revolution, the slices used to over approximate the volume of the solid are disks. To see this, consider the solid of revolution generated by revolving the region between the graph of the function (f(x)=(x−1)^2+1) and the x-axis over the interval ([−1,3]) around the x-axis. The graph of the function and a representative disk are shown in Figure(a) and (b). The region of revolution and the resulting solid are shown in Figure(c) and (d).
Figure (PageIndex{8}): (e) A dynamic version of this solid of revolution generated using CalcPlot3D.
We already used the formal Riemann sum development of the volume formula when we developed the slicing method. We know that [∫_a^b A(x),dx.nonumber]
The only difference with the disk method is that we know the formula for the cross-sectional area ahead of time; it is the area of a circle. This gives the following rule.
The Disk Method
Let (f(x)) be continuous and nonnegative. Define (R) as the region bounded above by the graph of (f(x)), below by the (x)-axis, on the left by the line (x=a), and on the right by the line (x=b). Then, the volume of the solid of revolution formed by revolving (R) around the (x)-axis is given by
[V=∫^b_aπ[f(x)]^2,dx.]
The volume of the solid we have been studying (Figure (PageIndex{8})) is given by
[begin{align*} V &=∫^b_aπleft[f(x)right]^2,dx &=∫^3_{−1}πbig[(x−1)^2+1big]^2,dx=π∫^3_{−1}big[(x−1)^4+2(x−1)^2+1big]^2,dx &=πleft.Big[frac{1}{5}(x−1)^5+frac{2}{3}(x−1)^3+xBig]right|^3_{−1} &=πleft[left(frac{32}{5}+frac{16}{3}+3right)−left(−frac{32}{5}−frac{16}{3}−1right)right] &=frac{412π}{15},text{units}^3. end{align*}]
Let’s look at some examples.
Example (PageIndex{3}): Using the Disk Method to Find the Volume of a Solid of Revolution 1
Use the disk method to find the volume of the solid of revolution generated by rotating the region between the graph of (f(x)=sqrt{x}) and the x-axis over the interval ([1,4]) around the x-axis.
Solution
The graphs of the function and the solid of revolution are shown in the following figure.
We have
(V=∫^b_aπ[f(x)]^2dx)
(=∫^4_1π[sqrt{x}]^2dx=π∫^4_1xdx)
(=dfrac{π}{2}x^2|^4_1=dfrac{15π}{2})
The volume is ((15π)/2) units3.
Exercise (PageIndex{3})
Use the disk method to find the volume of the solid of revolution generated by rotating the region between the graph of (f(x)=sqrt{4−x}) and the x-axis over the interval ([0,4]) around the x-axis.Hint
Use the procedure from Example. Always draw a picture for yourself. What are the dimensions of the disk? What is its Thickness? Radius?Answer
The first step in the solution of this problem involves identifying the radius of our disc. In this problem the radius is (f(x)=sqrt{4-x}). Using this radius we can use the formula for the area of a circle, radius (f(x)). This resulting area is: [A(x)=pi (sqrt{4-x})^2]
And from this area we can write the formula for the volume of a thin disk with thickness (dx):[dV=pi (sqrt{4-x})^2dx=pi (4-x)dx]
Taking the definite integral in the interval, [0,4] we get:[V=pi int_0^4(4-x)dx=pi Big[4x-dfrac{1}{2}x^2Big]_0^4=8pi,units^3]
So far, our examples have all concerned regions revolved around the x-axis, but we can generate a solid of revolution by revolving a plane region around any horizontal or vertical line. In the next example, we look at a solid of revolution that has been generated by revolving a region around the y-axis. The mechanics of the disk method are nearly the same as when the x-axis is the axis of revolution, but we express the function in terms of (y) and we integrate with respect to y as well. This is summarized in the following rule.
Rule: The Disk Method for Solids of Revolution around the y-axis
Let (g(y)) be continuous and nonnegative. Define (Q) as the region bounded on the right by the graph of (g(y)), on the left by the y-axis, below by the line (y=c), and above by the line (y=d). Then, the volume of the solid of revolution formed by revolving (Q) around the y-axis is given by
[V=∫^d_cπ[g(y)]^2,dy.]
The next example shows how this rule works in practice.
Example (PageIndex{4}): Using the Disk Method to Find the Volume of a Solid of Revolution 2
Let (R) be the region bounded by the graph of (g(y)=sqrt{4−y}) and the y-axis over the y-axis interval ([0,4]). Use the disk method to find the volume of the solid of revolution generated by rotating (R) around the y-axis.
Solution
The figure shows the function and a representative disk that can be used to estimate the volume. Notice that since we are revolving the function around the y-axis, the disks are horizontal, rather than vertical.
The region to be revolved and the full solid of revolution are depicted in the following figure.
To find the volume, we integrate with respect to (y) We obtain
(V=∫^d_cπ[g(y)]^2,dy=∫^4_0π[sqrt{4−y}]^2,dy=π∫^4_0(4−y),dy=π[4y−dfrac{y^2}{2}]|^4_0=8π.)
The volume is (8π units^3).
Exercise (PageIndex{4})
Use the disk method to find the volume of the solid of revolution generated by rotating the region between the graph of (g(y)=y) and the y-axis over the interval ([1,4]) around the y-axis.Hint
Use the procedure from Example. What axis is the solid revolving about? Draw the disk a slice makes. What is its radius?Answer
Knowing that the solid is rotating around the y-axis we can use the same method as the previous examples. However, in this problem we use (g(y)) as our radius. This gives us an equation for area:[A(y)=pi y^2]
From the area we can establish a volume of a disk with thickness (dy) (This is (dy) because the rotation occurs about the y-axis and the thickness of the disk will be parallel to the rotation axis) The volume equation is:[dV=pi y^2dy]
Taking the definite integral over the interval [1,4]:[V=pi int_1^4y^2dy=pi Big[dfrac{1}{3}y^3Big]_1^4=21pi]The Washer Method
Some solids of revolution have cavities in the middle; they are not solid all the way to the axis of revolution. Sometimes, this is just a result of the way the region of revolution is shaped with respect to the axis of revolution. In other cases, cavities arise when the region of revolution is defined as the region between the graphs of two functions. A third way this can happen is when an axis of revolution other than the x-axis or y-axis is selected.
When the solid of revolution has a cavity in the middle, the slices used to approximate the volume are not disks, but washers (disks with holes in the center). For example, consider the region bounded above by the graph of the function (f(x)=sqrt{x}) and below by the graph of the function (g(x)=1) over the interval ([1,4]). When this region is revolved around the x-axis, the result is a solid with a cavity in the middle, and the slices are washers. The graph of the function and a representative washer are shown in Figure(a) and (b). The region of revolution and the resulting solid are shown in Figure(c) and (d).
Figure (PageIndex{12}): (e) A dynamic version of this solid of revolution generated using CalcPlot3D.
The cross-sectional area, then, is the area of the outer circle less the area of the inner circle. In this case,
(A(x)=π(sqrt{x})^2−π(1)^2=π(x−1).)
Then the volume of the solid is
(V=∫^b_aA(x)dx=∫^4_1π(x−1)dx=π[dfrac{x^2}{2}−x]|^4_1=dfrac{9}{2}πunits^3).
Generalizing this process gives the washer method.
Rule: The Washer Method
Suppose (f(x)) and (g(x)) are continuous, nonnegative functions such that (f(x)≥g(x)) over ([a,b]). Let (R) denote the region bounded above by the graph of (f(x)), below by the graph of (g(x)), on the left by the line (x=a), and on the right by the line (x=b). Then, the volume of the solid of revolution formed by revolving (R) around the x-axis is given by
[V=∫^b_aπ[(f(x))^2−(g(x))^2]dx.]
Example (PageIndex{5}): Using the Washer Method
Find the volume of a solid of revolution formed by revolving the region bounded above by the graph of (f(x)=x) and below by the graph of (g(x)=1/x) over the interval ([1,4]) around the x-axis.
Solution
The graphs of the functions and the solid of revolution are shown in the following figure.
We have
[begin{align*} V &=∫^b_aπbig[(f(x))^2−(g(x))^2big],dx=π∫^4_1left[x^2−left(frac{1}{x}right)^2right],dx &=πleft.left[frac{x^3}{3}+frac{1}{x}right]right|^4_1 &=dfrac{81π}{4},text{units}^3. end{align*}]
Figure (PageIndex{13}): (c) A dynamic version of this solid of revolution generated using CalcPlot3D.
Exercise (PageIndex{5})
Find the volume of a solid of revolution formed by revolving
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Solids of Revolution: Volumes by Disks Main Concept A solid of revolution is a solid three-dimensional figure created by rotating a subregion of the xy -plane around a straight line, usually the x -axis or the y -axis. Assuming there is a single function. 11.2 Solids of Revolution (Discs) Test Prep. Title: C11 HW Key.pdf Author: sean.mcconnell Created Date: 4/4/2018 2:46:16 PM.
Solids of Revolutions - Volume. Added Apr 30, 2016 by dannymntya in Mathematics. Calculate volumes of revolved solid between the curves, the limits, and the axis of. Textbook solution for Calculus 10th Edition Ron Larson Chapter 11.2 Problem 39E. We have step-by-step solutions for your textbooks written by Bartleby experts! 57095-11.2-39E-Question-Digital.docx Finding the Equation of a Sphere In Exercises 37-40, find the standard equation of the sphere. Definite Integral, Integral Calculus, Rotation, Solids or 3D Shapes, Volume Creatung a solid through rotation of a graph round the x- or y-axis. Exercise Visualize the solid of revolution which is determined by the rotation of the sine function between 0 and 2π.
In this section, we use definite integrals to find volumes of three-dimensional solids. We consider three approaches—slicing, disks, and washers—for finding these volumes, depending on the characteristics of the solid.Volume and the Slicing Method
Just as area is the numerical measure of a two-dimensional region, volume is the numerical measure of a three-dimensional solid. Most of us have computed volumes of solids by using basic geometric formulas. The volume of a rectangular solid, for example, can be computed by multiplying length, width, and height: (V=lwh.) The formulas for the volumes of:
*a sphere
[V_{sphere}=dfrac{4}{3}πr^3,]
*a cone
[V_{cone}=dfrac{1}{3}πr^2h]
*and a pyramid
[V_{pyramid}=dfrac{1}{3}Ah]
have also been introduced. Although some of these formulas were derived using geometry alone, all these formulas can be obtained by using integration.
We can also calculate the volume of a cylinder. Although most of us think of a cylinder as having a circular base, such as a soup can or a metal rod, in mathematics the word cylinder has a more general meaning. To discuss cylinders in this more general context, we first need to define some vocabulary.
We define thecross-sectionof a solid to be the intersection of a plane with the solid. A cylinder is defined as any solid that can be generated by translating a plane region along a line perpendicular to the region, called the axis of the cylinder. Thus, all cross-sections perpendicular to the axis of a cylinder are identical. The solid shown in Figure is an example of a cylinder with a noncircular base. To calculate the volume of a cylinder, then, we simply multiply the area of the cross-section by the height of the cylinder: (V=A⋅h.) In the case of a right circular cylinder (soup can), this becomes (V=πr^2h.)
If a solid does not have a constant cross-section (and it is not one of the other basic solids), we may not have a formula for its volume. In this case, we can use a definite integral to calculate the volume of the solid. We do this by slicing the solid into pieces, estimating the volume of each slice, and then adding those estimated volumes together. The slices should all be parallel to one another, and when we put all the slices together, we should get the whole solid. Consider, for example, the solid S shown in Figure, extending along the x-axis.
We want to divide (S) into slices perpendicular to the x-axis. As we see later in the chapter, there may be times when we want to slice the solid in some other direction—say, with slices perpendicular to the y-axis. The decision of which way to slice the solid is very important. If we make the wrong choice, the computations can get quite messy. Later in the chapter, we examine some of these situations in detail and look at how to decide which way to slice the solid. For the purposes of this section, however, we use slices perpendicular to the x-axis.
Because the cross-sectional area is not constant, we let (A(x)) represent the area of the cross-section at point x. Now let (P={x_0,x_1…,X_n}) be a regular partition of ([a,b]), and for (i=1,2,…n), let (S_i) represent the slice of (S) stretching from (x_{i−1}) to (x_i). The following figure shows the sliced solid with (n=3).
Finally, for (i=1,2,…n,) let (x^∗_i) be an arbitrary point in ([x_{i−1},x_i]). Then the volume of slice (S_i) can be estimated by (V(S_i)≈A(x^∗_i)Δx). Adding these approximations together, we see the volume of the entire solid (S) can be approximated by
[V(S)≈sum_{i=1}^nA(x^∗_i)Δx.]
By now, we can recognize this as a Riemann sum, and our next step is to take the limit as (n→∞.) Then we have
[V(S)=lim_{n→∞}sum_{i=1}^nA(x^∗_i)Δx=∫^a_bA(x)dx.]
The technique we have just described is called the slicing method. To apply it, we use the following strategy.
Problem-Solving Strategy: Finding Volumes by the Slicing Method
*Examine the solid and determine the shape of a cross-section of the solid. It is often helpful to draw a picture if one is not provided.
*Determine a formula for the area of the cross-section.
*Integrate the area formula over the appropriate interval to get the volume.
Recall that in this section, we assume the slices are perpendicular to the x-axis. Therefore, the area formula is in terms of x and the limits of integration lie on the x-axis. However, the problem-solving strategy shown here is valid regardless of how we choose to slice the solid.
Example (PageIndex{1}): Deriving the Formula for the Volume of a Pyramid
We know from geometry that the formula for the volume of a pyramid is (V=dfrac{1}{3}Ah). If the pyramid has a square base, this becomes (V=dfrac{1}{3}a^2h), where a denotes the length of one side of the base. We are going to use the slicing method to derive this formula.
Solution
We want to apply the slicing method to a pyramid with a square base. To set up the integral, consider the pyramid shown in Figure, oriented along the x-axis.
We first want to determine the shape of a cross-section of the pyramid. We are know the base is a square, so the cross-sections are squares as well (step 1). Now we want to determine a formula for the area of one of these cross-sectional squares. Looking at Figure(b), and using a proportion, since these are similar triangles, we have
[dfrac{s}{a}=dfrac{x}{h}]
or
[s=dfrac{ax}{h}.]
Therefore, the area of one of the cross-sectional squares is
[A(x)=s^2=(dfrac{ax}{h})^2 (step2).]
Then we find the volume of the pyramid by integrating from (0) to (h) (step 3):
[V=∫_0^hA(x)dx=∫_0^h(dfrac{ax}{h})^2dx=dfrac{a^2}{h^2}∫_0^hx^2dx=left.[dfrac{a^2}{h^2}(dfrac{1}{3}x^3)]right|^h_0=dfrac{1}{3}a^2h.]
This is the formula we were looking for.
Exercise (PageIndex{1})
Use the slicing method to derive the formula [V=dfrac{1}{3}πr^2h] for the volume of a circular cone.Hint
Use similar triangles, as in the Example. Consider what the shape of a slice is.Answer
First, we want to determine the shape of a cross section of this circular cone. As the name states, we expect the cross section to be a circle. Knowing the formula for the area of a circle, (A_{Circle}=pi r^2), we can now find the value of r using similar triangles. This process was used above to solve for a pyramid with a square base.
Notice the ratio of similar triangles is: [dfrac{r}{R}=dfrac{x}{h}.]
or [r=dfrac{Rx}{h}.]
Substituting into the formula for area we get: [A(x) = pi r^2 = pi (dfrac{Rx}{h})^2.]
Now, if we consider this circle as a very, very thin disc, with thickness (dx) and radius (r), where (r=dfrac{Rx}{h}).
We can write an equation for the volume of this very, very thin disc. [dV=pi (dfrac{Rx}{h})^2dx.]
Taking the complete distance of the cone from base to point as (h) we can establish bounds for integration and solve for the area of the cone. [V=int_{0}^{h}A(x)dx=pidfrac{R^2}{h^2}int_{0}^{h}x^2dx=Big[pidfrac{R^2}{h^2}(dfrac{1}{3}x^3)Big]_0^h=dfrac{1}{3} pi R^2h]Solids of Revolution
If a region in a plane is revolved around a line in that plane, the resulting solid is called a solid of revolution, as shown in the following figure.
Solids of revolution are common in mechanical applications, such as machine parts produced by a lathe. We spend the rest of this section looking at solids of this type. The next example uses the slicing method to calculate the volume of a solid of revolution.
Example (PageIndex{2}): Using the Slicing Method to find the Volume of a Solid of Revolution
Use the slicing method to find the volume of the solid of revolution bounded by the graphs of (f(x)=x^2−4x+5,x=1),and (x=4,) and rotated about the x-axis.
Solution
Using the problem-solving strategy, we first sketch the graph of the quadratic function over the interval ([1,4]) as shown in the following figure.
Next, revolve the region around the x-axis, as shown in the following figure.
Since the solid was formed by revolving the region around the x-axis, the cross-sections are circles (step 1). The area of the cross-section, then, is the area of a circle, and the radius of the circle is given by (f(x).) Use the formula for the area of the circle:
[A(x)=πr^2=π[f(x)]^2=π(x^2−4x+5)^2(step 2).]
The volume, then, is (step 3)
[begin{align} V &=∫^a_hA(x)dx &=∫^4_1π(x^2−4x+5)^2dx &=π∫^4_1(x^4−8x^3+26x^2−40x+25)dx &=left. πleft(dfrac{x^5}{5}−2x^4+dfrac{26x^3}{3}−20x^2+25xright)right|^4_1 &=dfrac{78}{5}π end{align}]
The volume is (78π/5.)
Exercise (PageIndex{2})
Use the method of slicing to find the volume of the solid of revolution formed by revolving the region between the graph of the function (f(x)=1/x) and the x-axis over the interval ([1,2]) around the x-axis. See the following figure.Hint
Use the problem-solving strategy presented earlier. Always consider the dimensions for the disk. What is the radius?Answer
Since the solid was formed by revolving about the x-axis, the cross sections will be circles. The ares of the cross section is that of a circle. with the radius being (f(x)). The area can be written as follows:[A(x)=pi r^2=pi Big(dfrac{1}{x}Big)^2=pi Big(dfrac{1}{x^2}Big)].
Expressing this as a volume for a thin disc we get: [dV=pi Big(dfrac{1}{x^2}Big)dx]
Now taking the definite integral within the interval [1,2] we can solve for the volume of the solid.[V=piint_1^2Big(dfrac{1}{x^2}Big)dx=pi Big[-dfrac{1}{x}Big]_1^2=pi [-dfrac{1}{2}+1]=dfrac{pi}{2}]The Disk Method
When we use the slicing method with solids of revolution, it is often called the disk method because, for solids of revolution, the slices used to over approximate the volume of the solid are disks. To see this, consider the solid of revolution generated by revolving the region between the graph of the function (f(x)=(x−1)^2+1) and the x-axis over the interval ([−1,3]) around the x-axis. The graph of the function and a representative disk are shown in Figure(a) and (b). The region of revolution and the resulting solid are shown in Figure(c) and (d).
Figure (PageIndex{8}): (e) A dynamic version of this solid of revolution generated using CalcPlot3D.
We already used the formal Riemann sum development of the volume formula when we developed the slicing method. We know that [∫_a^b A(x),dx.nonumber]
The only difference with the disk method is that we know the formula for the cross-sectional area ahead of time; it is the area of a circle. This gives the following rule.
The Disk Method
Let (f(x)) be continuous and nonnegative. Define (R) as the region bounded above by the graph of (f(x)), below by the (x)-axis, on the left by the line (x=a), and on the right by the line (x=b). Then, the volume of the solid of revolution formed by revolving (R) around the (x)-axis is given by
[V=∫^b_aπ[f(x)]^2,dx.]
The volume of the solid we have been studying (Figure (PageIndex{8})) is given by
[begin{align*} V &=∫^b_aπleft[f(x)right]^2,dx &=∫^3_{−1}πbig[(x−1)^2+1big]^2,dx=π∫^3_{−1}big[(x−1)^4+2(x−1)^2+1big]^2,dx &=πleft.Big[frac{1}{5}(x−1)^5+frac{2}{3}(x−1)^3+xBig]right|^3_{−1} &=πleft[left(frac{32}{5}+frac{16}{3}+3right)−left(−frac{32}{5}−frac{16}{3}−1right)right] &=frac{412π}{15},text{units}^3. end{align*}]
Let’s look at some examples.
Example (PageIndex{3}): Using the Disk Method to Find the Volume of a Solid of Revolution 1
Use the disk method to find the volume of the solid of revolution generated by rotating the region between the graph of (f(x)=sqrt{x}) and the x-axis over the interval ([1,4]) around the x-axis.
Solution
The graphs of the function and the solid of revolution are shown in the following figure.
We have
(V=∫^b_aπ[f(x)]^2dx)
(=∫^4_1π[sqrt{x}]^2dx=π∫^4_1xdx)
(=dfrac{π}{2}x^2|^4_1=dfrac{15π}{2})
The volume is ((15π)/2) units3.
Exercise (PageIndex{3})
Use the disk method to find the volume of the solid of revolution generated by rotating the region between the graph of (f(x)=sqrt{4−x}) and the x-axis over the interval ([0,4]) around the x-axis.Hint
Use the procedure from Example. Always draw a picture for yourself. What are the dimensions of the disk? What is its Thickness? Radius?Answer
The first step in the solution of this problem involves identifying the radius of our disc. In this problem the radius is (f(x)=sqrt{4-x}). Using this radius we can use the formula for the area of a circle, radius (f(x)). This resulting area is: [A(x)=pi (sqrt{4-x})^2]
And from this area we can write the formula for the volume of a thin disk with thickness (dx):[dV=pi (sqrt{4-x})^2dx=pi (4-x)dx]
Taking the definite integral in the interval, [0,4] we get:[V=pi int_0^4(4-x)dx=pi Big[4x-dfrac{1}{2}x^2Big]_0^4=8pi,units^3]
So far, our examples have all concerned regions revolved around the x-axis, but we can generate a solid of revolution by revolving a plane region around any horizontal or vertical line. In the next example, we look at a solid of revolution that has been generated by revolving a region around the y-axis. The mechanics of the disk method are nearly the same as when the x-axis is the axis of revolution, but we express the function in terms of (y) and we integrate with respect to y as well. This is summarized in the following rule.
Rule: The Disk Method for Solids of Revolution around the y-axis
Let (g(y)) be continuous and nonnegative. Define (Q) as the region bounded on the right by the graph of (g(y)), on the left by the y-axis, below by the line (y=c), and above by the line (y=d). Then, the volume of the solid of revolution formed by revolving (Q) around the y-axis is given by
[V=∫^d_cπ[g(y)]^2,dy.]
The next example shows how this rule works in practice.
Example (PageIndex{4}): Using the Disk Method to Find the Volume of a Solid of Revolution 2
Let (R) be the region bounded by the graph of (g(y)=sqrt{4−y}) and the y-axis over the y-axis interval ([0,4]). Use the disk method to find the volume of the solid of revolution generated by rotating (R) around the y-axis.
Solution
The figure shows the function and a representative disk that can be used to estimate the volume. Notice that since we are revolving the function around the y-axis, the disks are horizontal, rather than vertical.
The region to be revolved and the full solid of revolution are depicted in the following figure.
To find the volume, we integrate with respect to (y) We obtain
(V=∫^d_cπ[g(y)]^2,dy=∫^4_0π[sqrt{4−y}]^2,dy=π∫^4_0(4−y),dy=π[4y−dfrac{y^2}{2}]|^4_0=8π.)
The volume is (8π units^3).
Exercise (PageIndex{4})
Use the disk method to find the volume of the solid of revolution generated by rotating the region between the graph of (g(y)=y) and the y-axis over the interval ([1,4]) around the y-axis.Hint
Use the procedure from Example. What axis is the solid revolving about? Draw the disk a slice makes. What is its radius?Answer
Knowing that the solid is rotating around the y-axis we can use the same method as the previous examples. However, in this problem we use (g(y)) as our radius. This gives us an equation for area:[A(y)=pi y^2]
From the area we can establish a volume of a disk with thickness (dy) (This is (dy) because the rotation occurs about the y-axis and the thickness of the disk will be parallel to the rotation axis) The volume equation is:[dV=pi y^2dy]
Taking the definite integral over the interval [1,4]:[V=pi int_1^4y^2dy=pi Big[dfrac{1}{3}y^3Big]_1^4=21pi]The Washer Method
Some solids of revolution have cavities in the middle; they are not solid all the way to the axis of revolution. Sometimes, this is just a result of the way the region of revolution is shaped with respect to the axis of revolution. In other cases, cavities arise when the region of revolution is defined as the region between the graphs of two functions. A third way this can happen is when an axis of revolution other than the x-axis or y-axis is selected.
When the solid of revolution has a cavity in the middle, the slices used to approximate the volume are not disks, but washers (disks with holes in the center). For example, consider the region bounded above by the graph of the function (f(x)=sqrt{x}) and below by the graph of the function (g(x)=1) over the interval ([1,4]). When this region is revolved around the x-axis, the result is a solid with a cavity in the middle, and the slices are washers. The graph of the function and a representative washer are shown in Figure(a) and (b). The region of revolution and the resulting solid are shown in Figure(c) and (d).
Figure (PageIndex{12}): (e) A dynamic version of this solid of revolution generated using CalcPlot3D.
The cross-sectional area, then, is the area of the outer circle less the area of the inner circle. In this case,
(A(x)=π(sqrt{x})^2−π(1)^2=π(x−1).)
Then the volume of the solid is
(V=∫^b_aA(x)dx=∫^4_1π(x−1)dx=π[dfrac{x^2}{2}−x]|^4_1=dfrac{9}{2}πunits^3).
Generalizing this process gives the washer method.
Rule: The Washer Method
Suppose (f(x)) and (g(x)) are continuous, nonnegative functions such that (f(x)≥g(x)) over ([a,b]). Let (R) denote the region bounded above by the graph of (f(x)), below by the graph of (g(x)), on the left by the line (x=a), and on the right by the line (x=b). Then, the volume of the solid of revolution formed by revolving (R) around the x-axis is given by
[V=∫^b_aπ[(f(x))^2−(g(x))^2]dx.]
Example (PageIndex{5}): Using the Washer Method
Find the volume of a solid of revolution formed by revolving the region bounded above by the graph of (f(x)=x) and below by the graph of (g(x)=1/x) over the interval ([1,4]) around the x-axis.
Solution
The graphs of the functions and the solid of revolution are shown in the following figure.
We have
[begin{align*} V &=∫^b_aπbig[(f(x))^2−(g(x))^2big],dx=π∫^4_1left[x^2−left(frac{1}{x}right)^2right],dx &=πleft.left[frac{x^3}{3}+frac{1}{x}right]right|^4_1 &=dfrac{81π}{4},text{units}^3. end{align*}]
Figure (PageIndex{13}): (c) A dynamic version of this solid of revolution generated using CalcPlot3D.
Exercise (PageIndex{5})
Find the volume of a solid of revolution formed by revolving
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