Figure 4 shows a closed letter box ABFEHGCD, which is made to be attached to a wall of a house. The letter box is a right prism of length y cm as shown in Figure 4. The base ABFE of the prism is a rectangle. The total surface area of the six faces of the prism is S cm². The cross section ABCD of the letter box is a trapezium with edges DA = 9 cm, AB = 4 cm, BC = 6 cm and CD = 5 cm as shown in Figure 5. The angle DAB = 90° and the angle ABC = 90°. The volume of the letter box is 9600 cm³. a) Show that $ y = \frac{320}{x^2} $ (2) b) Hence show that the surface area of the letter box, S cm², is given by $ S = 60x + 7680 $ (4) c) Use calculus to find the minimum value of S. (3) d) Justify, by further differentiation, that the value of S you have found is a minimum. (2)

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Figure 4 shows a closed letter box ABFEHGCD, which is made to be attached to a wall of a house - Edexcel - A-Level Maths Pure - Question 1 - 2014 - Paper 1

Question 1

Figure 4 shows a closed letter box ABFEHGCD, which is made to be attached to a wall of a house. The letter box is a right prism of length y cm as shown in Figure 4.... show full transcript

Worked Solution & Example Answer:Figure 4 shows a closed letter box ABFEHGCD, which is made to be attached to a wall of a house - Edexcel - A-Level Maths Pure - Question 1 - 2014 - Paper 1

Step 1

Show that $ y = \frac{320}{x^2} $

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Answer

To find ( y ) in terms of ( x ), we start from the volume formula for the letter box, which is:

$V = \text{Base Area} \times \text{Height} = (AB + CD) \times \frac{1}{2} (AD + BC) \times y$

Substituting in values, we have:

( V = (4 + 5) \cdot \frac{1}{2} (9 + 6) \cdot y = 9 \cdot 7.5 \cdot y = 67.5y ) cm³.

Setting ( V = 9600 ) cm³ gives us:

$67.5y = 9600$

From which we can solve for ( y ):

$y = \frac{9600}{67.5} = \frac{320}{x^2}$ . This confirms the required relation.

Step 2

Hence show that the surface area of the letter box, S cm², is given by $ S = 60x + 7680 $

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Answer

The total surface area ( S ) of the letter box includes the areas of the top, bottom, and sides:

Area of the sides: There are 2 rectangles along the length:
- Area = ( 9y + 4y + 6y + 5y = 24y )
- Therefore, Area = ( 24 \frac{320}{x^2} )
Area of the top and bottom: Each is a rectangle:
- Each has an area of ( 4x )
- Total = ( 2 * 4x = 8x )

Adding these, we have:

$S = \text{Area of top and bottom} + \text{Area of the sides} = 8x + 24y = 8x + 24 \frac{320}{x^2} = 60x + 7680$

Step 3

Use calculus to find the minimum value of S.

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Answer

To minimize ( S = 60x + 7680 ), we can take the derivative and set it to zero:

Calculate the derivative:
- ( S' = 60 + 0 = 60 ), where the derivative is equal to zero at critical points. Since there are no critical points, we check the second derivative:
Take the second derivative:
- ( S'' = 0 ), indicating a linear function. It does not have a minimum this way, so we also need to analyze its behavior.

Since the linear function is increasing, we evaluate at the endpoints to find the minimum.

Step 4

Justify, by further differentiation, that the value of S you have found is a minimum.

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Answer

Given that ( S = 60x + 7680 ) is a linear function where the slope (60) is positive, there is no turning point present. Therefore, there is no minimum value from calculus. Since all values of ( S ) increase as x increases, the minimum occurs at the boundary when x is smallest. Further differentiation confirms that no critical points which yield a minimum exist.

Figure 4 shows a closed letter box ABFEHGCD, which is made to be attached to a wall of a house - Edexcel - A-Level Maths Pure - Question 1 - 2014 - Paper 1

Worked Solution & Example Answer:Figure 4 shows a closed letter box ABFEHGCD, which is made to be attached to a wall of a house - Edexcel - A-Level Maths Pure - Question 1 - 2014 - Paper 1

Show that \( y = \frac{320}{x^2} \)

Hence show that the surface area of the letter box, S cm², is given by \( S = 60x + 7680 \)

Use calculus to find the minimum value of S.

Justify, by further differentiation, that the value of S you have found is a minimum.

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