Many practical problems involve finding a solution to achieve a maximum or minimum value such as maximising profit, minimising costs, maximising volume of a box or minimising distance travelled. The process to find the best solution is called optimisation. There are many optimisation techniques for different problems and in many cases where we can describe the outcome with a function we can now use calculus to solve for the optimal solution.
Holly is fencing off an area of her backyard for a vegetable garden. She has $12$12 metres of fencing and is building the garden against an existing wall, so the fencing is only required for three sides. What is the largest area she can enclose with the fencing she has?
Step 1. Draw and label a diagram of the situation.
Let $x$x be the width of the garden and $y$y be the length. Since we require the area in terms of one variable, let's rewrite $y$y in terms of $x$x.
$\text{Total fencing}$Total fencing | $=$= | $2x+y$2x+y |
$12$12 | $=$= | $2x+y$2x+y |
$\therefore y$∴y | $=$= | $12-2x$12−2x |
Note: Since both width and length need to be positive we have the implied restriction: $0\le x\le6$0≤x≤6, the end points can be included or not - they will simply give a zero area.
Step 2. We want to maximise area, so we want to express the area in terms of $x$x.
$\text{Area}$Area | $=$= | $\text{length}\times\text{width}$length×width | using known formulas |
$A(x)$A(x) | $=$= | $x(12-2x)$x(12−2x) | |
$=$= | $12x-2x^2$12x−2x2 $m^2$m2 | expanding as this will be required for differentiation |
Step 3. Find the derivative and solve $A'(x)=0$A′(x)=0:
The derivative is $A'(x)=12-4x$A′(x)=12−4x, when $A'(x)=0$A′(x)=0, we have:
$12-4x$12−4x | $=$= | $0$0 |
$4x$4x | $=$= | $12$12 |
$x$x | $=$= | $3$3 |
When$x=3$x=3, $A(3)=18$A(3)=18 $m^2$m2. So we have a stationary point at $\left(3,18\right)$(3,18).
Step 4. To confirm this is a maximum we can test the derivative either side of the stationary point:
$x$x | $2$2 | $3$3 | $4$4 |
---|---|---|---|
$f'(x)$f′(x) | $4$4 | $0$0 | $-4$−4 |
Sign | $+$+ | $0$0 | $-$− |
Shape |
Step 5. Hence, we have a maximum area of $18$18 $m^2$m2 when the dimensions of the garden are $3$3 $m$m by $6$6 $m$m.
This could also be confirmed using a graph as seen above or our knowledge of quadratic functions. Recall from quadratic functions, that graphs of the form $f(x)=ax^2+bx+c$f(x)=ax2+bx+c have their turning point located at $x=-\frac{b}{2a}$x=−b2a and this will be a minimum if the leading coefficient $a$a is positive and a maximum if $a$a is negative.
Try using calculus on the general quadratic $f(x)=ax^2+bx+c$f(x)=ax2+bx+c to prove the location of the turning point is always $x=-\frac{b}{2a}$x=−b2a and its nature.
A piece of wire, $320$320 $cm$cm long, is used to make the twelve edges of a rectangular box in which the length is three times the width.
a) Find the maximum volume of the box that can be formed using the wire and the dimensions of this optimal box.
Step 1. Draw and label a diagram of the situation.
Let $x$x be the width of the box and $h$h be the height of the box. The length of the box is given by $3x$3x. Since we will require the volume in terms of one variable, let's rewrite $h$h in terms of $x$x.
$\text{Total length of wire}$Total length of wire | $=$= | $4\left(3x+x+h\right)$4(3x+x+h) |
$320$320 | $=$= | $4\left(4x+h\right)$4(4x+h) |
$4x+h$4x+h | $=$= | $80$80 |
$\therefore h$∴h | $=$= | $80-4x$80−4x |
Note: Since length, width and height need to be positive we have the implied restriction: $0\le x\le20$0≤x≤20
Step 2. We want to maximise the volume, so we want to express the volume in terms of $x$x.
$\text{Volume}$Volume | $=$= | $\text{length}\times\text{width}\times\text{height}$length×width×height | using known formulas |
$V(x)$V(x) | $=$= | $3x\times x\times(80-4x)$3x×x×(80−4x) | |
$=$= | $240x^2-12x^3$240x2−12x3 $m^2$m2 | expanding as this will be required for differentiation |
Step 3. Find the derivative and solve $V'(x)=0$V′(x)=0:
The derivative is $V'(x)=480x-36x^2$V′(x)=480x−36x2, when $V'(x)=0$V′(x)=0, we have:
$480x-36x^2$480x−36x2 | $=$= | $0$0 |
$4x\left(120-9x\right)$4x(120−9x) | $=$= | $0$0 |
Therefore, by null factor law either:
$4x$4x | $=$= | $0$0 | or | $120-9x$120−9x | $=$= | $0$0 |
$\therefore x$∴x | $=$= | $0$0 | $-9x$−9x | $=$= | $-120$−120 | |
$\therefore x$∴x | $=$= | $13\frac{1}{3}$1313 |
When$x=0$x=0, $V(0)=0$V(0)=0 $cm^3$cm3 and when $x=13\frac{1}{3}$x=1313, $V(13\frac{1}{3})=14222\frac{2}{9}$V(1313)=1422229 $cm^3$cm3. The volume of $0$0 $m^3$m3 is clearly not a maximum and in fact we do not have a box when the width and length are $0$0 $cm$cm. So let's simply check the nature of the stationary point at $\left(13\frac{1}{3},14222\frac{2}{9}\right)$(1313,1422229).
Step 4. To confirm this is a maximum we can test the derivative either side of the stationary point:
$x$x | $10$10 | $13\frac{1}{3}$1313 | $15$15 |
---|---|---|---|
$f'(x)$f′(x) | $1200$1200 | $0$0 | $-900$−900 |
Sign | $+$+ | $0$0 | $-$− |
Shape |
Step 5. Hence, we have a maximum volume of $14222.\overline{2}$14222.2 $m^3$m3 when the dimensions of the box are $13\frac{1}{3}$1313 $cm$cm by $40$40 $cm$cm by $26\frac{2}{3}$2623 $cm$cm. This can also be confirmed by graphing the function on the appropriate domain.
b) If the height of the box can be at most $20$20 $cm$cm, what is the maximum volume that can be formed using the wire and the dimensions of this optimal box.
If the height is restricted we have the following inequality:
$0$0 | $\le$≤ | $80-4x$80−4x | $\le$≤ | $20$20 |
$-80$−80 | $\le$≤ | $-4x$−4x | $\le$≤ | $-60$−60 |
$20$20 | $\ge$≥ | $x$x | $\ge$≥ | $15$15 |
$\therefore15$∴15 | $\le$≤ | $x$x | $\le$≤ | $20$20 |
Sketching the graph on the restricted domain we can see the maximum occurs at the end point, $x=15$x=15.
Hence, with the height restriction the maximum volume of the box is $13500$13500 $cm^3$cm3, when the dimensions are $15$15 $cm$cm by $45$45 $cm$cm by $20$20 $cm$cm.
The sum of two whole numbers is $24$24. Let one of the numbers be $x$x.
Let $y$y represent the product of the numbers. Form an expression for $y$y in terms of $x$x.
Enter each line of work as an equation.
Solve for the value of $x$x that will result in the greatest product of the two numbers.
Enter each line of work as an equation.
Find the greatest possible product of the two numbers.
A box without cover is to be constructed from a rectangular cardboard that measures $90$90 cm by $42$42 cm by cutting out four identical square corners of the cardboard and folding up the sides.
Let $x$x be the height of the box, and $V$V the volume of the box.
Form an equation for $V$V in terms of $x$x.
Give your answer in expanded form.
Solve for the possible value(s) of $x$x that could correspond to the box of largest volume.
Complete the table to prove that when $x=9$x=9 cm the volume of the box is maximised.
$x$x | $8$8 | $9$9 | $10$10 |
---|---|---|---|
$\frac{dV}{dx}$dVdx | $\editable{}$ | $0$0 | $\editable{}$ |
Find the maximum volume of the box.
A cylindrical tin can with radius $r$r cm and height $h$h cm is to be designed so that the total surface area including the top and bottom is $5\pi$5π cm2.
Express $h$h in terms of $r$r.
Let $V$V be the volume of the can. Express $V$V in terms of $r$r only, simplifying where possible.
Find the possible value(s) for the radius of the base that could result in the can of the largest volume. Leave your answer in exact form.
Complete the table to prove that when $r=\sqrt{\frac{5}{6}}$r=√56 cm the volume of the cylinder is a maximum.
Give both values to the nearest integer.
$r$r | $0$0 | $\sqrt{\frac{5}{6}}$√56 | $1$1 |
---|---|---|---|
$\frac{dV}{dr}$dVdr | $\editable{}$ | $0$0 | $\editable{}$ |