QUESTION IMAGE
Question
7 a rectangular box is to be covered in material. how much is required to cover the entire box if it has the dimensions \\(1.3\text{ m}\\), \\(1.5\text{ m}\\) and \\(1.9\text{ m}\\)?
8 two wooden boxes, both with dimensions \\(80\text{ cm}\\), \\(1\text{ m}\\) and \\(25\text{ cm}\\), are placed on the ground, one on top of the other as shown. the entire outside surface is then painted. find the area of the painted surface.
9 the four walls and roof of a barn (shown) are to be painted.
a find the surface area of the barn, not including the floor.
b if \\(1\text{ litre}\\) of paint covers \\(10\text{ m}^2\\), find how many litres are required to complete the job.
10 an open top rectangular box \\(20\text{ cm}\\) wide, \\(25\text{ cm}\\) long and \\(10\text{ cm}\\) high is made from wood \\(1\text{ cm}\\) thick. find the surface area:
a outside the box (do not include the top edge)
b inside the box (do not include the top edge)
<pre_analysis>
{
"quality": "clear",
"question_count": 4,
"skills_matched": [
"step_cot",
"explain_then_answer",
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"concepts_used": [
"Rectangular Prism Surface Area",
"Surface Area of Composite Solids"
],
"new_concepts": [
"Surface Area of a Barn",
"Surface Area of Open Box with Thickness"
],
"current_concepts": [
"Rectangular Prism Surface Area",
"Surface Area of Composite Solids",
"Surface Area of a Barn",
"Surface Area of Open Box with Thickness"
]
}
</pre_analysis>
<reasoning>
Calculate surface area of the rectangular box
Using the Rectangular Prism Surface Area knowledge point
\[
\]
Calculate painted surface area of stacked boxes
Using the Surface Area of Composite Solids knowledge point
\[
\]
Calculate barn surface area and paint required
The barn consists of a rectangular base and a triangular roof prism.
- Base walls: Two sides of \(4 \times 2 = 8\text{ m}^2\) each, front and back walls up to the roof line of \(2.4 \times 2 = 4.8\text{ m}^2\) each.
- Roof gables (front/back triangles): Base \(2.4\text{ m}\), height \(3.5 - 2 = 1.5\text{ m}\). Area of two triangles: \(2 \times \frac{1}{2} \times 2.4 \times 1.5 = 3.6\text{ m}^2\).
- Roof panels: Two rectangular panels of \(4 \times 1.9 = 7.6\text{ m}^2\) each.
- Total surface area (excluding floor):
\[
A = 2(8) + 2(4.8) + 3.6 + 2(7.6) = 16 + 9.6 + 3.6 + 15.2 = 44.4\text{ m}^2
\]
- Paint required:
\[
V = \frac{44.4}{10} = 4.44\text{ litres}
\]
Calculate outside surface area of open box
The outside dimensions are \(l = 25\text{ cm}\), \(w = 20\text{ cm}\), \(h = 10\text{ cm}\).
- Outside area (excluding top edge and top opening):
\[
A_{\text{out}} = lw + 2lh + 2wh = 25 \times 20 + 2(25 \times 10) + 2(20 \times 10) = 500 + 500 + 400 = 1400\text{ cm}^2
\]
Calculate inside surface area of open box
The wood is \(1\text{ cm}\) thick.
- Inside length: \(25 - 2(1) = 23\text{ cm}\)
- Inside width: \(20 - 2(1) = 18\text{ cm}\)
- Inside height (open top, so only subtract bottom thickness): \(10 - 1 = 9\text{ cm}\)
- Inside area (excluding top edge):
\[
A_{\text{in}} = l_{\text{in}}w_{\text{in}} + 2l_{\text{in}}h_{\text{in}} + 2w_{\text{in}}h_{\text{in}} = 23 \times 18 + 2(23 \times 9) + 2(18 \times 9) = 414 + 414 + 324 = 1152\text{ cm}^2
\]
</reasoning>
<answer>
Question 7
\(14.54\text{ m}^2\)
Question 8
\(2.6\text{ m}^2\)
Question 9
a) \(44.4\text{ m}^2\)
b) \(4.44\text{ litres}\)
Question 10
a) \(1400\text{ cm}^2\)
b) \(1152\text{ cm}^2\)
</answer>
<post_analysis>
{
"subject": "Mathematics",
"question_type": "Multi-part",
"knowledge_point": [
"Mathematics",
"Geometry",
"Surface Area of Composite Solids"
]
}
</post_analysis>
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<pre_analysis>
{
"quality": "clear",
"question_count": 4,
"skills_matched": [
"step_cot",
"explain_then_answer",
"tutor",
"mastery_adaptive_brevity"
],
"needs_drawing": false,
"concepts_used": [
"Rectangular Prism Surface Area",
"Surface Area of Composite Solids"
],
"new_concepts": [
"Surface Area of a Barn",
"Surface Area of Open Box with Thickness"
],
"current_concepts": [
"Rectangular Prism Surface Area",
"Surface Area of Composite Solids",
"Surface Area of a Barn",
"Surface Area of Open Box with Thickness"
]
}
</pre_analysis>
<reasoning>
Calculate surface area of the rectangular box
Using the Rectangular Prism Surface Area knowledge point
\[
\]
Calculate painted surface area of stacked boxes
Using the Surface Area of Composite Solids knowledge point
\[
\]
Calculate barn surface area and paint required
The barn consists of a rectangular base and a triangular roof prism.
- Base walls: Two sides of \(4 \times 2 = 8\text{ m}^2\) each, front and back walls up to the roof line of \(2.4 \times 2 = 4.8\text{ m}^2\) each.
- Roof gables (front/back triangles): Base \(2.4\text{ m}\), height \(3.5 - 2 = 1.5\text{ m}\). Area of two triangles: \(2 \times \frac{1}{2} \times 2.4 \times 1.5 = 3.6\text{ m}^2\).
- Roof panels: Two rectangular panels of \(4 \times 1.9 = 7.6\text{ m}^2\) each.
- Total surface area (excluding floor):
\[
A = 2(8) + 2(4.8) + 3.6 + 2(7.6) = 16 + 9.6 + 3.6 + 15.2 = 44.4\text{ m}^2
\]
- Paint required:
\[
V = \frac{44.4}{10} = 4.44\text{ litres}
\]
Calculate outside surface area of open box
The outside dimensions are \(l = 25\text{ cm}\), \(w = 20\text{ cm}\), \(h = 10\text{ cm}\).
- Outside area (excluding top edge and top opening):
\[
A_{\text{out}} = lw + 2lh + 2wh = 25 \times 20 + 2(25 \times 10) + 2(20 \times 10) = 500 + 500 + 400 = 1400\text{ cm}^2
\]
Calculate inside surface area of open box
The wood is \(1\text{ cm}\) thick.
- Inside length: \(25 - 2(1) = 23\text{ cm}\)
- Inside width: \(20 - 2(1) = 18\text{ cm}\)
- Inside height (open top, so only subtract bottom thickness): \(10 - 1 = 9\text{ cm}\)
- Inside area (excluding top edge):
\[
A_{\text{in}} = l_{\text{in}}w_{\text{in}} + 2l_{\text{in}}h_{\text{in}} + 2w_{\text{in}}h_{\text{in}} = 23 \times 18 + 2(23 \times 9) + 2(18 \times 9) = 414 + 414 + 324 = 1152\text{ cm}^2
\]
</reasoning>
<answer>
Question 7
\(14.54\text{ m}^2\)
Question 8
\(2.6\text{ m}^2\)
Question 9
a) \(44.4\text{ m}^2\)
b) \(4.44\text{ litres}\)
Question 10
a) \(1400\text{ cm}^2\)
b) \(1152\text{ cm}^2\)
</answer>
<post_analysis>
{
"subject": "Mathematics",
"question_type": "Multi-part",
"knowledge_point": [
"Mathematics",
"Geometry",
"Surface Area of Composite Solids"
]
}
</post_analysis>