Math / Algebra

Question6 of the questions remain unanswered.
A box is to be made out of a 12 cm by 20 cm piece of cardboard. Squares of side length $x \mathrm{~cm}$ will be cut out of each corner, and then the ends and sides will be folded up to (a) Express the volume $V$ of the box as a function of $\boldsymbol{x}$ . $V=\square \mathrm{cm}^{3}$ (b) Give the domain of $V$ in interval notation. (Use the fact that length and volume must be positive.) $\square$ (c) Find the length $L$ , width $W$ , and height $H$ of the resulting box that maximizes the volume. (Assume that $W \leq L$ ). $\begin{array}{l} L=\square \mathrm{cm} \\ W=\square \mathrm{cm} \\ H=\square \mathrm{cm} \end{array}$ (d) The maximum volume of the box is $\square \mathrm{cm}^{3}$ .

Studdy Solution

STEP 1

1. The cardboard is a rectangle with dimensions 12 cm by 20 cm.
2. Squares of side length $x$ cm are cut from each corner.
3. The box is formed by folding up the sides after cutting.

STEP 2

1. Express the volume $V$ of the box as a function of $x$ .
2. Determine the domain of $V(x)$ .
3. Find the dimensions $L$ , $W$ , and $H$ that maximize the volume.
4. Calculate the maximum volume of the box.

STEP 3

To express the volume $V$ as a function of $x$ , consider the dimensions of the box after cutting and folding: - Length of the box: $20 - 2x$ - Width of the box: $12 - 2x$ - Height of the box: $x$
The volume $V$ is given by: $V(x) = (20 - 2x)(12 - 2x)x$

STEP 4

To determine the domain of $V(x)$ , consider the constraints: - The length $20 - 2x$ must be positive: $20 - 2x > 0$ implies $x < 10$ . - The width $12 - 2x$ must be positive: $12 - 2x > 0$ implies $x < 6$ . - The height $x$ must be positive: $x > 0$ .
The domain of $V(x)$ is $0 < x < 6$ .

STEP 5

To find the dimensions $L$ , $W$ , and $H$ that maximize the volume, we need to maximize the function $V(x) = (20 - 2x)(12 - 2x)x$ .
First, expand and simplify the volume function: $V(x) = 4x^3 - 64x^2 + 240x$
Find the critical points by taking the derivative and setting it to zero: $V'(x) = 12x^2 - 128x + 240$
Set $V'(x) = 0$ and solve for $x$ : $12x^2 - 128x + 240 = 0$
Simplify and solve the quadratic equation: $x^2 - \frac{32}{3}x + 20 = 0$
Use the quadratic formula: $x = \frac{-b \pm \sqrt{b^2 - 4ac}}{2a}$ $x = \frac{\frac{32}{3} \pm \sqrt{\left(\frac{32}{3}\right)^2 - 4 \cdot 1 \cdot 20}}{2 \cdot 1}$
Calculate the solutions for $x$ within the domain $0 < x < 6$ .

STEP 6

Calculate $L$ , $W$ , and $H$ using the value of $x$ that maximizes the volume: - $L = 20 - 2x$ - $W = 12 - 2x$ - $H = x$
Verify $W \leq L$ .

STEP 7

Substitute the value of $x$ back into the volume function to find the maximum volume: $V_{\text{max}} = (20 - 2x)(12 - 2x)x$
Calculate the maximum volume.
The solutions are: (a) $V(x) = 4x^3 - 64x^2 + 240x$ cm $^3$ (b) Domain: $(0, 6)$ (c) $L = \square$ cm, $W = \square$ cm, $H = \square$ cm (d) Maximum volume: $\square$ cm $^3$

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Studdy Solution

STEP 1

1. The cardboard is a rectangle with dimensions 12 cm by 20 cm.
2. Squares of side length $x$ cm are cut from each corner.
3. The box is formed by folding up the sides after cutting.

STEP 2

1. Express the volume $V$ of the box as a function of $x$ .
2. Determine the domain of $V(x)$ .
3. Find the dimensions $L$ , $W$ , and $H$ that maximize the volume.
4. Calculate the maximum volume of the box.

STEP 3

To express the volume $V$ as a function of $x$ , consider the dimensions of the box after cutting and folding: - Length of the box: $20 - 2x$ - Width of the box: $12 - 2x$ - Height of the box: $x$
The volume $V$ is given by: $V(x) = (20 - 2x)(12 - 2x)x$

STEP 4

To determine the domain of $V(x)$ , consider the constraints: - The length $20 - 2x$ must be positive: $20 - 2x > 0$ implies $x < 10$ . - The width $12 - 2x$ must be positive: $12 - 2x > 0$ implies $x < 6$ . - The height $x$ must be positive: $x > 0$ .
The domain of $V(x)$ is $0 < x < 6$ .

STEP 5

STEP 6

Calculate $L$ , $W$ , and $H$ using the value of $x$ that maximizes the volume: - $L = 20 - 2x$ - $W = 12 - 2x$ - $H = x$
Verify $W \leq L$ .

STEP 7

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Studdy Solution

STEP 1

1. The cardboard is a rectangle with dimensions 12 cm by 20 cm.2. Squares of side length x x x cm are cut from each corner.3. The box is formed by folding up the sides after cutting.

STEP 2

1. Express the volume V V V of the box as a function of x x x.2. Determine the domain of V(x) V(x) V(x).3. Find the dimensions L L L, W W W, and H H H that maximize the volume.4. Calculate the maximum volume of the box.

STEP 3

STEP 4

STEP 5

STEP 6

Calculate L L L, W W W, and H H H using the value of x x x that maximizes the volume: - L=20−2x L = 20 - 2x L=20−2x - W=12−2x W = 12 - 2x W=12−2x - H=x H = x H=xVerify W≤L W \leq L W≤L.

STEP 7

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1. The cardboard is a rectangle with dimensions 12 cm by 20 cm.
2. Squares of side length $x$ cm are cut from each corner.
3. The box is formed by folding up the sides after cutting.

1. Express the volume $V$ of the box as a function of $x$ .
2. Determine the domain of $V(x)$ .
3. Find the dimensions $L$ , $W$ , and $H$ that maximize the volume.
4. Calculate the maximum volume of the box.

Calculate $L$ , $W$ , and $H$ using the value of $x$ that maximizes the volume: - $L = 20 - 2x$ - $W = 12 - 2x$ - $H = x$
Verify $W \leq L$ .