A piece of wire 60 cm in length is cut into two pieces. The first piece forms a rectangle 5 times as wide as it is long. The second piece forms a square. Where should the wire be cut to? 1)minimize the total area 2)maximize the total area

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A piece of wire 60 cm in length is cut into two pieces. The first piece forms a rectangle 5 times as wide as it is long. The second piece forms a square. Where should the wire be cut to? 1)minimize the total area 2)maximize the total area

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Answer 1 · 2017-12-05T06:27:59

Max Area: ${225 cm}^{3}$ $"225 cm"^3$
Min Area: ${80.36 cm}^{3}$ $"80.36 cm"^3$

Explanation:

Steps:

1) Draw out a rectangle and a square

2) Label all your variables based on the information from the question

Since the length of the rectangle is five times as the width. Therefore, we know that $5 x$ $5x$ is the length and $x$ $x$ is the width.
Since it is a square and we do not know the values of the sides, we can label the sides as $y$ $y$ .

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3) Find the helper equation for the equation which you are trying to optimize

The wire $60 cm$ $"60 cm"$ is the circumference for both the rectangle and the square
$12 x + 4 y = 60$ $12x+4y=60$

4) Find the equation for $y$ $y$ of the helper equation in terms of $x$ $x$

$y = 15 - 3 x$ $y = 15-3x$

5) Find the equation that you are trying to optimize

$Area = A R + A S = 5 x^{2} + y^{2}$ $"Area" = AR + AS = 5x^2 + y^2$

6) Plug the equation of $y$ $y$ into the equation you are trying to optimize

$5 x^{2} + y^{2}$ $5x^2 + y^2$
$5 x^{2} + {(15 - 3 x)}^{2} = 14 x^{2} - 90 x + 225$ $5x^2 +(15-3x)^2 = 14x^2-90x+225$

7) Take the derivative of the equation and find the critical point(s) while determine whether they are max or min

$A' = 28x-90$

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8) Check the endpoints!

Endpoints indicate the maximum and minimum value you can have for the rectangle

$12x = 60, x = 5$ <-- indicating all material used to create the rectangle
$x = 0$ <-- indicating all material used to create the square

9) Find the answers by plugging in endpoints and critical number into the original area equation

$A(3.2143) = "80.36 cm"^3$
$A(0) = "225 cm"^3$
$A(5) = "125 cm"^3$

Therefore, the maximum of the total area we have is $"225 cm"^3$ and the minimum value we have is $"80.36 cm"^3$ .

Answer 2 · 2017-12-05T06:46:07

$38.4 or 21.6 cm$ for a minimum area of $80.4 cm^2$
The limit as $x -> 0$ is $225 cm^2$

Explanation:

The total length is 60. The first rectangle has dimensions of $x xx 5x$ , and the perimeter is thus $2(x + 5x) = 12x$ . The remaining length for the square is then $60 – 12x$ . This is equal to the square perimeter, $4y$ , so we can express the square side ‘y’ in terms of ‘x’ as $4y = 60 – 12x$ ; $y = 15 – 3x$ . The square area in terms of ‘x’ is thus $(15 – 3x)^2$ = $9x^2 – 90x +225$ .

Combined with the area of the rectangle we obtain the total area as:
$A_t = 5x^2 + 9x^2 – 90x +225$ = $14x^2 – 90x + 225$ This quadratic indicates that it will only have one extrema – the minimum for a given length of wire. That point is where the first derivative of the area quadratic equation is zero. $f’(x) = 28x – 90$ Minimum at $x = 3.2$

The derived dimensions follow:
Rectangle short side: $x = 3.2cm$
Rectangle long side: $5x = 16cm$
Rectangle area: $51.2 cm^2$
Square side: $y = 15 – 3x = 5.4$
Square area: $29.2 cm^2$
Total Area: $80.4 cm^2$
Total lengths: $2(3.2 + 16) + 4(5.4) = 38.4 + 21.6 = 60$ Correct. Cut the wire at a length of $60 – 12x = 60 – 38.4 = 21.6cm or 38.4cm$

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A piece of wire 60 cm in length is cut into two pieces. The first piece forms a rectangle 5 times as wide as it is long. The second piece forms a square. Where should the wire be cut to? 1)minimize the total area 2)maximize the total area

2 Answers

Explanation:

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