Skip to main content
Logo image

APEX Calculus: for University of Lethbridge

Section 7.6 Fluid Forces

In the unfortunate situation of a car driving into a body of water, the conventional wisdom is that the water pressure on the doors will quickly be so great that they will be effectively unopenable. (Survival techniques suggest immediately opening the door, rolling down or breaking the window, or waiting until the water fills up the interior at which point the pressure is equalized and the door will open. See Mythbusters episode #72 to watch Adam Savage test these options.)
How can this be true? How much force does it take to open the door of a submerged car? In this section we will find the answer to this question by examining the forces exerted by fluids.
We start with pressure, which is related to force by the following equations:
\begin{equation*} \text{Pressure}\, = \,\frac{\text{Force}}{\text{Area}}\, \Leftrightarrow\, \text{Force}\, = \, \text{Pressure} \times\text{Area}\text{.} \end{equation*}
In the context of fluids, we have the following definition.

Definition 7.6.1. Fluid Pressure.

Let \(w\) be the weight-density of a fluid. The pressure \(p\) exerted on an object at depth \(d\) in the fluid is \(p = w\cdot d\text{.}\)
We use this definition to find the force exerted on a horizontal sheet by considering the sheet’s area.

Example 7.6.2. Computing fluid force.

  1. A cylindrical storage tank has a radius of 2 ft and holds 10 ft of a fluid with a weight-density of 50 lbft3. (See Figure 7.6.3.) What is the force exerted on the base of the cylinder by the fluid?
    Illustration of the cylindrical tank from the example.
    Illustration of a cylindrical storage tank with a radius of 2 ft. The cylindrical storage tank is then filled with water up to a marked level of 10 ft from the base of the tank. The tank extends slightly above the 10 ft water level, but this region of the tank contains no water.
    Figure 7.6.3. A cylindrical tank in Example 7.6.2
  2. A rectangular tank whose base is a 5 ft square has a circular hatch at the bottom with a radius of 2 ft. The tank holds 10 ft of a fluid with a weight-density of 50 lbft3. (See Figure 7.6.4.) What is the force exerted on the hatch by the fluid?
    Illustration of the rectangular storage tank with a circular hatch at the bottom.
    Illustration of a rectangular storage tank with a square base. The square base has a side length of 5 ft. The height of the storage tank extends slightly above the 10 ft mark, which is the amount of water contained in the tank. On the square base of the tank is a centered circular hatch, having a radius of 2 ft.
    Figure 7.6.4. A rectangular tank in Example 7.6.2
Solution.
  1. Using Definition 7.6.1, we calculate that the pressure exerted on the cylinder’s base is \(w\cdot d = \)50 lbft3 ×10 ft\(=\)500 lbft2. The area of the base is \(\pi\cdot 2^2 = 4\pi\) ft2. So the force exerted by the fluid is
    \begin{equation*} F = 500\times 4\pi = 6283\,\text{lb}\text{.} \end{equation*}
    Note that we effectively just computed the weight of the fluid in the tank.
  2. The dimensions of the tank in this problem are irrelevant. All we are concerned with are the dimensions of the hatch and the depth of the fluid. Since the dimensions of the hatch are the same as the base of the tank in the previous part of this example, as is the depth, we see that the fluid force is the same. That is, \(F = 6283\) lb. A key concept to understand here is that we are effectively measuring the weight of a 10 ft column of water above the hatch. The size of the tank holding the fluid does not matter.
The previous example demonstrates that computing the force exerted on a horizontally oriented plate is relatively easy to compute. What about a vertically oriented plate? For instance, suppose we have a circular porthole located on the side of a submarine. How do we compute the fluid force exerted on it?
Pascal’s Principle states that the pressure exerted by a fluid at a depth is equal in all directions. Thus the pressure on any portion of a plate that is 1 ft below the surface of water is the same no matter how the plate is oriented. (Thus a hollow cube submerged at a great depth will not simply be “crushed” from above, but the sides will also crumple in. The fluid will exert force on all sides of the cube.)
So consider a vertically oriented plate as shown in Figure 7.6.5 submerged in a fluid with weight-density \(w\text{.}\) What is the total fluid force exerted on this plate? We find this force by first approximating the force on small horizontal strips.
Illustration of a thin, vertically oriented plate submerged in a fluid.
Illustration of a thin, vertically oriented plate fully submerged in a fluid with weight-density \(w\text{.}\) The plate is in the shape of an acute trapezoid. On the plate, the image contains an arbitrarily placed small horizontal strip which stretches horizontally between the two edges of the submerged plate. The small strip has a horizontal length measurement of \(\ell(c_i)\text{,}\) and a vertical height measurement of \(\Delta y_i\text{.}\) The vertical distance between the water level and the center of the small horizontal strip is given as \(d_i\text{.}\)
Figure 7.6.5. A thin, vertically oriented plate submerged in a fluid with weight-density \(w\)
Let the top of the plate be at depth \(b\) and let the bottom be at depth \(a\text{.}\) (For now we assume that surface of the fluid is at depth 0, so if the bottom of the plate is 3 ft under the surface, we have \(a=-3\text{.}\) We will come back to this later.) We partition the interval \([a,b]\) into \(n\) subintervals
\begin{equation*} a = y_0 \lt y_1 \lt \cdots \lt y_{n} = b\text{,} \end{equation*}
with the \(i\)th subinterval having length \(\Delta y_i\text{.}\) The force \(F_i\) exerted on the plate in the \(i\)th subinterval is \(F_i = \text{Pressure} \times \text{Area}\text{.}\)
The pressure is depth times the weight density \(w\text{.}\) We approximate the depth of this thin strip by choosing any value \(d_i\) in \([y_{i-1},y_{i}]\text{;}\) the depth is approximately \(-d_i\text{.}\) (Our convention has \(d_i\) being a negative number, so \(-d_i\) is positive.) For convenience, we let \(d_i\) be an endpoint of the subinterval; we let \(d_i = y_i\text{.}\)
The area of the thin strip is approximately length × width. The width is \(\Delta y_i\text{.}\) The length is a function of some \(y\)-value \(c_i\) in the \(i\)th subinterval. We state the length is \(\ell(c_i)\text{.}\) Thus
\begin{align*} F_i \amp = \text{Pressure} \times \text{Area}\\ \amp = -y_i\cdot w \times \ell(c_i)\cdot\Delta y_i\text{.} \end{align*}
To approximate the total force, we add up the approximate forces on each of the \(n\) thin strips:
\begin{equation*} F = \sum_{i=1}^n F_i \approx \sum_{i=1}^n -w\cdot y_i\cdot\ell(c_i)\cdot\Delta y_i\text{.} \end{equation*}
This is, of course, another Riemann Sum. We can find the exact force by taking a limit as the subinterval lengths go to \(0\text{;}\) we evaluate this limit with a definite integral.

Key Idea 7.6.6. Fluid Force on a Vertically Oriented Plate.

Let a vertically oriented plate be submerged in a fluid with weight-density \(w\text{,}\) where the top of the plate is at \(y=b\) and the bottom is at \(y=a\text{.}\) Let \(\ell(y)\) be the length of the plate at \(y\text{.}\)
  1. If \(y=0\) corresponds to the surface of the fluid, then the force exerted on the plate by the fluid is
    \begin{equation*} F=\int_a^b w\cdot(-y)\cdot\ell(y)\, dy\text{.} \end{equation*}
  2. In general, let \(d(y)\) represent the distance between the surface of the fluid and the plate at \(y\text{.}\) Then the force exerted on the plate by the fluid is
    \begin{equation*} F=\int_a^b w\cdot d(y)\cdot\ell(y)\, dy\text{.} \end{equation*}

Example 7.6.7. Finding fluid force.

Consider a thin plate in the shape of an isosceles triangle as shown in Figure 7.6.8, submerged in water with a weight-density of 62.4 lbft3. If the bottom of the plate is 10 ft below the surface of the water, what is the total fluid force exerted on this plate?
Illustration of a thin plate in the shape of an isosceles triangle.
Illustration of a thin plate in the shape of an isosceles triangle. The triangle has one side having a length of 4 ft. The height of the triangle is also 4 ft. The length of the two remaining sides is equal but is not given in the image. The triangle is oriented such that the side having a length of 4 ft is the top of the plate and lies parallel to the water level. The distance between the top of the plate and the vertex lying across from the top plate is the height of the triangle, which is 4 ft.
Figure 7.6.8. A thin plate in the shape of an isosceles triangle in Example 7.6.7
Solution.
We approach this problem in two different ways to illustrate the different ways Key Idea 7.6.6 can be implemented. First we will let \(y=0\) represent the surface of the water, then we will consider an alternate convention.
  1. We let \(y=0\) represent the surface of the water; therefore the bottom of the plate is at \(y=-10\text{.}\) We center the triangle on the \(y\)-axis as shown in Figure 7.6.9. The depth of the plate at \(y\) is \(-y\) as indicated by the Key Idea. We now consider the length of the plate at \(y\text{.}\) We need to find equations of the left and right edges of the plate. The right hand side is a line that connects the points \((0,-10)\) and \((2,-6)\text{:}\) that line has equation \(x=1/2(y+10)\text{.}\) (Find the equation in the familiar \(y=mx+b\) format and solve for \(x\text{.}\)) Likewise, the left hand side is described by the line \(x=-1/2(y+10)\text{.}\) The total length is the distance between these two lines: \(\ell(y)=1/2(y+10) - (-1/2(y+10)) = y+10\text{.}\)
    Graph of a thin plate in the shape of an isosceles triangle.
    Graph of the thin plate in the shape of an isosceles triangle with the convention that the water level is at \(y=0\text{.}\) The triangle is oriented in the same way as described previously, with the top of the plate being the side having a length of 4 ft running parallel to the water level. The graph contains the two coordinate axes. The bottom of the plate, which is the vertex of the triangle lies 10 ft below the water level, which is marked as the point \((0,-10)\text{.}\) The remaining two vertices of the triangle are the points \((-2,-6)\) and \((2,-6)\text{,}\) with the line joining these two vertices making up the top of the plate. The graph also contains an arbitrarily chosen thin slice of the plate, which spans the horizontal length of the triangular plate. The red coloured thin slice occurs at the level \(y\text{,}\) which is an arbitrarily chosen value between \(y = -6\) which marks the top of the plate and \(y = -10\) which marks the bottom of the plate. The distance between the water level and the thin horizontal slice is also given as \(d(y)=-y\text{.}\)
    Figure 7.6.9. Sketching the triangular plate in Example 7.6.7 with the convention that the water level is at \(y=0\)
    The total fluid force is then:
    \begin{align*} F \amp = \int_{-10}^{-6} 62.4(-y)(y+10)\, dy\\ \amp = 62.4\cdot \frac{176}{3} \approx 3660.8\,\text{lb} \text{.} \end{align*}
  2. Sometimes it seems easier to orient the thin plate nearer the origin. For instance, consider the convention that the bottom of the triangular plate is at \((0,0)\text{,}\) as shown in Figure 7.6.10. The equations of the left and right hand sides are easy to find. They are \(y=2x\) and \(y=-2x\text{,}\) respectively, which we rewrite as \(x= 1/2y\) and \(x=-1/2y\text{.}\) Thus the length function is \(\ell(y) = 1/2y-(-1/2y) = y\text{.}\)
    Graph of a thin plate in the shape of an isosceles triangle.
    Graph of the thin plate in the shape of an isosceles triangle with the convention that the water level is at \(y=10\text{.}\) The triangle is oriented in the same way as described previously, with the top of the plate being the side having a length of 4 ft running parallel to the water level. The graph contains two the coordinate axes. The bottom of the plate, which is the vertex of the triangle lies 10 ft below the water level, which is marked as the point \((0,0)\text{.}\) The remaining two vertices of the triangle are the points \((-2,4)\) and \((2,4)\text{,}\) with the line joining these two vertices making up the top of the plate. The graph also contains an arbitrarily chosen thin slice of the plate, which spans the horizontal length of the triangular plate. The red coloured thin slice occurs at the level \(y\text{,}\) which is an arbitrarily chosen value between \(y = 0\) which marks the bottom of the plate and \(y = 4\) which marks the top of the plate. The distance between the water level and the thin horizontal slice is also given as \(d(y)=10-y\text{.}\)
    Figure 7.6.10. Sketching the triangular plate in Example 7.6.7 with the convention that the base of the triangle is at \((0,0)\)
    As the surface of the water is 10 ft above the base of the plate, we have that the surface of the water is at \(y=10\text{.}\) Thus the depth function is the distance between \(y=10\) and \(y\text{;}\) \(d(y) = 10-y\text{.}\) We compute the total fluid force as:
    \begin{align*} F \amp =\int_0^4 62.4(10-y)(y)\, dy\\ \amp \approx 3660.8\,\text{lb}\text{.} \end{align*}
The correct answer is, of course, independent of the placement of the plate in the coordinate plane as long as we are consistent.

Example 7.6.11. Finding fluid force.

Find the total fluid force on a car door submerged up to the bottom of its window in water, where the car door is a rectangle 40 in long and 27 in high (based on the dimensions of a 2005 Fiat Grande Punto.)
Solution.
The car door, as a rectangle, is drawn in Figure 7.6.12. Its length is \(10/3\) ft and its height is 2.25 ft. We adopt the convention that the top of the door is at the surface of the water, both of which are at \(y=0\text{.}\) Using the weight-density of water of 62.4 lbft3, we have the total force as
\begin{align*} F \amp = \int_{-2.25}^0 62.4(-y)10/3\, dy\\ \amp = \int_{-2.25}^0 -208y\, dy\\ \amp = -104y^2\Big|_{-2.25}^0\\ \amp = 526.5 \,\text{lb}\text{.} \end{align*}
Most adults would find it very difficult to apply over 500 lb of force to a car door while seated inside, making the door effectively impossible to open. This is counter-intuitive as most assume that the door would be relatively easy to open. The truth is that it is not, hence the survival tips mentioned at the beginning of this section.
Graph of a perfectly rectangular car door submerged in water.
Graph of a perfectly rectangular car door submerged in water with the convention that the water level is at \(y=0\text{.}\) The coordinate axes are labeled in terms of feet. The top of the rectangular door is \(40\) inches or \(3.\overline{3}\) feet long and perfectly coincides with the water level at \(y=0\text{.}\) The leftmost upper corner of the rectangular door is labeled to be the point \((0,0)\text{,}\) while the upper right corner is labeled by the point \((3.\overline{3},0)\text{.}\) The leftmost bottom corner of the rectangular door is labeled to be the point \((0,-2.25)\text{,}\) while the upper right corner is labeled by the point \((3.\overline{3},-2.25)\text{.}\) The graph also contains an arbitrarily chosen thin slice of the door, which spans the horizontal length of the rectangular door. The red coloured thin slice occurs at the level \(y\text{,}\) which is an arbitrarily chosen value between \(y = -2.25\) which marks the distance from the water level and the bottom of the door and \(y = 0\) which marks the top of the door. The distance between the water level and the thin horizontal slice will be given by \(d(y)=-y\text{.}\)
Figure 7.6.12. Sketching a submerged car door in Example 7.6.11

Example 7.6.13. Finding fluid force.

An underwater observation tower is being built with circular viewing portholes enabling visitors to see underwater life. Each vertically oriented porthole is to have a 3 ft diameter whose center is to be located 50 ft underwater. Find the total fluid force exerted on each porthole. Also, compute the fluid force on a horizontally oriented porthole that is under 50 ft of water.
Graph of a circular underwater porthole.
Graph of an underwater circular porthole with the convention that the water level is at \(y=50\text{.}\) The circular porthole having a diameter of 3 ft is centered at the origin. The top of the circular porthole is at the point \((0,1.5)\text{,}\) while the bottom is at the point \((0,-1.5)\text{.}\) The leftmost point of the circle occurs at the point \((-1.5,0)\text{,}\) whilet the rightmost point of the circle occurs at the point \((-1.5,0)\text{.}\) The graph also contains an arbitrarily chosen thin slice of the circular porthole, which spans the horizontal length of the circle. The red-coloured thin slice occurs at the level \(y\text{,}\) which is an arbitrarily chosen value between \(y = -1.5\) which marks the bottom of the porthole and \(y = 1.5\) which marks the top of the porthole. The distance between the water level and the thin horizontal slice is given by \(d(y)=50-y\text{.}\)
Figure 7.6.14. Measuring the fluid force on an underwater porthole in Example 7.6.13
Solution.
We place the center of the porthole at the origin, meaning the surface of the water is at \(y=50\) and the depth function will be \(d(y)=50-y\text{;}\) see Figure 7.6.14
The equation of a circle with a radius of 1.5 is \(x^2+y^2=2.25\text{;}\) solving for \(x\) we have \(x=\pm \sqrt{2.25-y^2}\text{,}\) where the positive square root corresponds to the right side of the circle and the negative square root corresponds to the left side of the circle. Thus the length function at depth \(y\) is \(\ell(y) = 2\sqrt{2.25-y^2}\text{.}\) Integrating on \([-1.5,1.5]\) we have:
\begin{align*} F \amp = 62.4\int_{-1.5}^{1.5} 2(50-y)\sqrt{2.25-y^2}\, dy\\ \amp = 62.4\int_{-1.5}^{1.5} \big(100\sqrt{2.25-y^2} - 2y\sqrt{2.25-y^2}\big)\, dy\\ \amp = 6240\int_{-1.5}^{1.5} \big(\sqrt{2.25-y^2}\big)\, dy - 62.4\int_{-1.5}^{1.5} \big(2y\sqrt{2.25-y^2}\big)\, dy\text{.} \end{align*}
The second integral above can be evaluated using substitution. Let \(u=2.25-y^2\) with \(du = -2y\,dy\text{.}\) The new bounds are: \(u(-1.5)=0\) and \(u(1.5)=0\text{;}\) the new integral will integrate from \(u=0\) to \(u=0\text{,}\) hence the integral is 0.
The first integral above finds the area of half a circle of radius 1.5, thus the first integral evaluates to \(6240\cdot\pi\cdot1.5^2/2 = 22,054\text{.}\) Thus the total fluid force on a vertically oriented porthole is 22,054 lb.
Finding the force on a horizontally oriented porthole is more straightforward:
\begin{equation*} F = \text{Pressure} \times\text{Area} = 62.4\cdot50\times \pi\cdot1.5^2 = 22,054\, \text{lb}\text{.} \end{equation*}
That these two forces are equal is not coincidental; it turns out that the fluid force applied to a vertically oriented circle whose center is at depth \(d\) is the same as force applied to a horizontally oriented circle at depth \(d\text{.}\)
We end this chapter with a reminder of the true skills meant to be developed here. We are not truly concerned with an ability to find fluid forces or the volumes of solids of revolution. Work done by a variable force is important, though measuring the work done in pulling a rope up a cliff is probably not.
What we are actually concerned with is the ability to solve certain problems by first approximating the solution, then refining the approximation, then recognizing if/when this refining process results in a definite integral through a limit. Knowing the formulas found inside the special boxes within this chapter is beneficial as it helps solve problems found in the exercises, and other mathematical skills are strengthened by properly applying these formulas. However, more importantly, understand how each of these formulas was constructed. Each is the result of a summation of approximations; each summation was a Riemann sum, allowing us to take a limit and find the exact answer through a definite integral.

Exercises Exercises

Terms and Concepts

1.
State in your own words Pascal’s Principle.
2.
State in your own words how pressure is different from force.

Problems

Exercise Group.
In the following exercises, find the fluid force exerted on the given plate, submerged in water with a weight density of 62.4 lbft3.
3.
Illustration of a submerged square plate.
Image of a submerged square plate having a side length of 2 ft. The top side of the square is parallel to the water level and lies 1 ft below the water level.
4.
Illustration of a submerged rectangular plate.
Image of a submerged rectangular plate. The rectangle has a horizontal length of 1 ft and a veritcal length of 2 ft. The shorter side of the rectangle is the top of the plate and is parallel to the water level and lies 1 ft below the water level.
5.
Illustration of a submerged triangular plate.
Image of a submerged plate in the shape of an isosceles triangle. The bottom of the triangle has a horizontal length of 4 ft. The distance from the bottom of the triangle to the vertex which is the nearest point on the plate to the water level is 6 ft, which is the height of the triangle. This vertex is the top of the plate and lies 5 ft below the water level. The remaining two sides of the triangle have equal but unmarked lengths and connect the vertex to the base of the triangular plate.
6.
Illustration of a submerged triangular plate.
Image of a submerged plate in the shape of an isosceles triangle. The top of the triangle has a horizontal length of 4 ft. The distance from the top of the triangle to the vertex which is the lowest point below the water level on the plate is 6 ft, which is the height of the triangle. This top side of the plate having a horizontal length of 4 ft lies 5 ft below the water level. The remaining two sides of the triangle have equal but unmarked lengths and connect the vertex to the top of the triangular plate.
7.
Illustration of a submerged circular plate.
Image of a submerged circular plate with a radius of 2 ft. The center of the circular plate lies 5 ft below the water level. The uppermost part of the circular plate lies 3 ft below the water level, and the lowest part lies 7 ft below the water level.
8.
Illustration of a submerged circular plate.
Image of a submerged circular plate with a radius of 4 ft. The center of the circular plate lies 5 ft below the water level. The uppermost part of the circular plate lies 1 ft below the water level, and the lowest part lies 9 ft below the water level.
9.
Illustration of a submerged rectangular plate.
Image of a submerged rectangular plate with a horizontal length of 4 ft and a height of 2 ft. The horizontal line through the middle of the plate lies 5 ft below the water level. The uppermost edge of the rectangular plate having a length of 4 ft lies 4 ft below the water level, and the lowest edge lies 6 ft below the water level. Both the top and bottom edges lie parallel to the water level.
10.
Illustration of a submerged rectangular plate.
Image of a submerged rectangular plate with a horizontal length of 2 ft and a height of 4 ft. The horizontal line through the middle of the plate lies 5 ft below the water level. The uppermost edge of the rectangular plate having a length of 2 ft lies 3 ft below the water level, and the lowest edge lies 7 ft below the water level. Both the top and bottom edges lie parallel to the water level.
11.
Illustration of a submerged rotated square plate.
Image of a submerged rotated square plate with a side length of 2 ft. The square is rotated such that one of its vertices is the uppermost point of the plate, while the opposite vertex lying directly below the uppermost vertex is the lowest point of the plate. The uppermost vertex of the square plate lies 1 ft below the water level.
12.
Illustration of a submerged plate in the shape of an equilateral right triangle.
Image of a submerged plate in the shape of an equilateral right triangle. The right angle occurs at the bottom left part of the triangle. The two edges connected to the right angle lie parallel and perpendicular to the water level, and both have a side length of 2 ft. The edge that is perpendicular to the water level extends up from the right angle for 2 ft, until reaching the uppermost vertex of the triangle. This uppermost vertex lies 1 ft below the water level. The edge that is connected to the right angle and parallel to the water level extends to the right of the right angle for a distance of 2 ft, until reaching the rightmost vertex of the triangle. The rightmost and uppermost vertices are then connected by an edge, which completes the equilateral right triangle.
Exercise Group.
In the following exercises, the side of a container is pictured. Find the fluid force exerted on this plate when the container is full of:
  1. water, with a weight density of 62.4 lbft3, and
  2. concrete, with a weight density of 150 lbft3.
13.
Illustration of a rectangular container.
Image of a rectangular container having horizontal length of 3 ft and a vertical height measurement of 5 ft.
14.
Illustration of a container made with a parabola and a line.
Image of a container that is the combination of the parabola \(y=x^2\) and a horizontal line having a length of 4 ft. The parabola is drawn such that the two sides of the parabola end when the horizontal distance between them measures 4 ft, from which they are connected by the horizontal line. The height, measured from the base of the parabola to the horizontal line measures 4 ft. A horizontal line which stretches from the left side of the container to the right side would lie entirely between the parabola given by \(y=x^2\text{.}\)
15.
Illustration of a container made with a parabola and a line.
Image of a container that is the combination of the parabola \(y=4-x^2\) and a horizontal line having a length of 4 ft. The upsidedown parabola is drawn such that two sides of the parabola end when the horizontal distance between them measures 4 ft, from which they are connected by the horizontal line. The height, measured from the top of the parabola to the horizontal line which makes up the base of the container measures 4 ft. A horizontal line which stretches from the left side of the container to the right side would lie entirely between the parabola given by \(y=4-x^2\text{.}\)
16.
Illustration of a container in the shape of a semicircle.
Image of a container in the shape of a semicircle having a radius of 1 ft that is the combination of the equation \(y=-\sqrt{1-x^2}\) and a horizontal line having a length of 2 ft. The circular arc coming from the equation \(y=-\sqrt{1-x^2}\) makes up the base of the container and is plotted for all \(x\) in the domain of \(y=-\sqrt{1-x^2}\text{.}\) Connecting the two vertices of the circular arc is the horizontal line having a length of 2 ft which makes up the top of the container. A horizontal line which stretches from the left side of the container to the right side would lie entirely between the circular arc given by \(y=-\sqrt{1-x^2}\text{.}\)
17.
Illustration of a container in the shape of a semicircle.
Image of a container in the shape of a semicircle having a radius of 1 ft that is the combination of the equation \(y=\sqrt{1-x^2}\) and a horizontal line having a length of 2 ft. The circular arc coming from the equation \(y=\sqrt{1-x^2}\) makes up the top of the container and is plotted for all \(x\) in the domain of \(y=\sqrt{1-x^2}\text{.}\) Connecting the two vertices of the circular arc is the horizontal line having a length of 2 ft which makes up the bottom part of the container. A horizontal line which stretches from the left side of the container to the right side would lie entirely between the circular arc given by \(y=\sqrt{1-x^2}\text{.}\)
18.
Illustration of a container in the shape of a semicircle.
Image of a container in the shape of a semicircle having a radius of 3 ft that is the combination of the equation \(y=-\sqrt{9-x^2}\) and a horizontal line having a length of 6 ft. The circular arc coming from the equation \(y=-\sqrt{9-x^2}\) makes up the top of the container and is plotted for all \(x\) in the domain of \(y=-\sqrt{9-x^2}\text{.}\) Connecting the two vertices of the circular arc is the horizontal line having a length of 6 ft which makes up the bottom part of the container. A horizontal line which stretches from the left side of the container to the right side would lie entirely between the circular arc given by \(y=-\sqrt{9-x^2}\text{.}\)
19.
How deep must the center of a vertically oriented circular plate with a radius of 1 ft be submerged in water, with a weight density of 62.4 lbft3, for the fluid force on the plate to reach 1,000 lb?
20.
How deep must the center of a vertically oriented square plate with a side length of 2 ft be submerged in water, with a weight density of 62.4 lbft3, for the fluid force on the plate to reach 1,000 lb?