QUESTION IMAGE
Question
- jenny needs to rent a car for a day. the graph shows the daily cost, c, of renting a vehicle for each of two companies in terms of distance driven, d, in km.
a. how can you use the graph to determine the basic cost of a rental car (excluding distance charges) and the distance charge per km for each company?
b. jenny think she will drive about 100 km. which company should she choose?
c. under what circumstances should she choose direct car?
d. how does the point of intersection of the lines relate to the decision about which company to choose?
<pre_analysis>
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<reasoning>
Determine basic cost and distance charge per km
\[
\]
Compare costs at 100 km
\[
\]
Determine circumstances for choosing Direct Car
\[
\]
Relate point of intersection to the decision
\[
\]
</reasoning>
<answer>
Question 7a
The basic cost is the vertical intercept (\(C\)-intercept) where distance \(d = 0\).
- Direct Car: Basic cost is \(\$60\).
- Wheels To Go: Basic cost is \(\$40\).
The distance charge per km is the slope of each line:
- Direct Car: \(\frac{\$100 - \$60}{100\text{ km} - 0\text{ km}} = \$0.40\text{/km}\)
- Wheels To Go: \(\frac{\$100 - \$40}{100\text{ km} - 0\text{ km}} = \$0.60\text{/km}\)
Question 7b
At \(100\text{ km}\), both lines intersect at a cost of \(\$100\). Since the cost is identical for both companies, Jenny can choose either company.
Question 7c
Jenny should choose Direct Car if she plans to drive more than \(100\text{ km}\), as its line is lower (cheaper) than Wheels To Go for distances greater than \(100\text{ km}\).
Question 7d
The point of intersection \((100, 100)\) represents the break-even point where both options cost the same. It serves as the decision threshold: for distances less than \(100\text{ km}\), the company with the lower y-intercept (Wheels To Go) is cheaper; for distances greater than \(100\text{ km}\), the company with the lower rate per km (Direct Car) is cheaper.
</answer>
<post_analysis>
{
"subject": "Mathematics",
"question_type": "Multi-part",
"knowledge_point": [
"Mathematics",
"Algebra",
"Slope-Intercept Form"
]
}
</post_analysis>
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<pre_analysis>
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"step_cot",
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"quick"
],
"needs_drawing": false,
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"Slope-Intercept Form",
"Slope Formula",
"System of Equations"
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"current_concepts": [
"Slope-Intercept Form",
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</pre_analysis>
<reasoning>
Determine basic cost and distance charge per km
\[
\]
Compare costs at 100 km
\[
\]
Determine circumstances for choosing Direct Car
\[
\]
Relate point of intersection to the decision
\[
\]
</reasoning>
<answer>
Question 7a
The basic cost is the vertical intercept (\(C\)-intercept) where distance \(d = 0\).
- Direct Car: Basic cost is \(\$60\).
- Wheels To Go: Basic cost is \(\$40\).
The distance charge per km is the slope of each line:
- Direct Car: \(\frac{\$100 - \$60}{100\text{ km} - 0\text{ km}} = \$0.40\text{/km}\)
- Wheels To Go: \(\frac{\$100 - \$40}{100\text{ km} - 0\text{ km}} = \$0.60\text{/km}\)
Question 7b
At \(100\text{ km}\), both lines intersect at a cost of \(\$100\). Since the cost is identical for both companies, Jenny can choose either company.
Question 7c
Jenny should choose Direct Car if she plans to drive more than \(100\text{ km}\), as its line is lower (cheaper) than Wheels To Go for distances greater than \(100\text{ km}\).
Question 7d
The point of intersection \((100, 100)\) represents the break-even point where both options cost the same. It serves as the decision threshold: for distances less than \(100\text{ km}\), the company with the lower y-intercept (Wheels To Go) is cheaper; for distances greater than \(100\text{ km}\), the company with the lower rate per km (Direct Car) is cheaper.
</answer>
<post_analysis>
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"question_type": "Multi-part",
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