David has $540 to spend at a bicycle store for some new gear and biking outfits. Assume all prices listed include tax.
He buys a new bicycle for $298.79.
He buys 3 bicycle reflectors for $8.13 each and a pair of bike gloves for $21.79.
He plans to spend some or all of the money he has left to buy new biking outfits for $79.43 each.
Which inequality can be used to determine x
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x, the maximum number of outfits David can purchase while staying within his budget?
The inequality that can be used to determine x, the maximum number of outfits David can purchase while staying within his budget, is:
79.43x ≤ 540 - 298.79 - (3 * 8.13) - 21.79
Tamika has $800 to spend at a bicycle store for some new gear and biking outfits. Assume all prices listed include tax.
She buys a new bicycle for $482.62.
She buys 3 bicycle reflectors for $10.84 each and a pair of bike gloves for $24.49.
She plans to spend some or all of the money she has left to buy new biking outfits for $52.93 each.
Which inequality can be used to determine o
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o, the maximum number of outfits Tamika can purchase while staying within her budget?Tamika has $800 to spend at a bicycle store for some new gear and biking outfits. Assume all prices listed include tax.
She buys a new bicycle for $482.62.
She buys 3 bicycle reflectors for $10.84 each and a pair of bike gloves for $24.49.
She plans to spend some or all of the money she has left to buy new biking outfits for $52.93 each.
Which inequality can be used to determine o
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o, the maximum number of outfits Tamika can purchase while staying within her budget?
The inequality that can be used to determine o, the maximum number of outfits Tamika can purchase while staying within her budget, is:
52.93o ≤ 800 - 482.62 - (3 * 10.84) - 24.49
Under her cell phone plan, Mariana pays a flat cost of $47.50 per month and $3 per gigabyte. She wants to keep her bill under $80 per month. Which inequality can be used to determine x
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x, the maximum number of gigabytes Mariana can use while staying within her budget?
The inequality that can be used to determine x, the maximum number of gigabytes Mariana can use while staying within her budget, is:
3x + 47.50 ≤ 80
Mei Mei has $660 to spend at a bicycle store for some new gear and biking outfits. Assume all prices listed include tax.
She buys a new bicycle for $462.47.
She buys 2 bicycle reflectors for $13.03 each and a pair of bike gloves for $14.87.
She plans to spend some or all of the money she has left to buy new biking outfits for $77.49 each.
Which inequality can be used to determine o
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o, the maximum number of outfits Mei Mei can purchase while staying within her budget?
The inequality that can be used to determine o, the maximum number of outfits Mei Mei can purchase while staying within her budget, is:
77.49o ≤ 660 - 462.47 - (2 * 13.03) - 14.87
Rashon has $780 to spend at a bicycle store for some new gear and biking outfits. Assume all prices listed include tax.
He buys a new bicycle for $481.28.
He buys 3 bicycle reflectors for $10.78 each and a pair of bike gloves for $32.64.
He plans to spend some or all of the money he has left to buy new biking outfits for $44.95 each.
Write and solve an inequality which can be used to determine o
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o, the number of outfits Rashon can purchase while staying within his budget.
To determine the number of outfits Rashon can purchase while staying within his budget, we can write and solve the following inequality:
44.95o ≤ 780 - 481.28 - (3 * 10.78) - 32.64
Simplifying the inequality:
44.95o ≤ 780 - 481.28 - 32.34
44.95o ≤ 266.38
Dividing both sides of the inequality by 44.95:
o ≤ 5.93
Therefore, Rashon can purchase a maximum of 5 outfits while staying within his budget.
To determine the maximum number of outfits David can purchase while staying within his budget, we need to consider the amount of money he has left after buying the bicycle, reflectors, and bike gloves.
Let's calculate the amount of money David has left:
Total spent = cost of new bicycle + (cost of bicycle reflectors * number of reflectors purchased) + cost of bike gloves
Total spent = $298.79 + ($8.13 * 3) + $21.79
Total spent = $298.79 + $24.39 + $21.79
Total spent = $344.18 + $21.79
Total spent = $366.97
To find the maximum number of outfits David can purchase, we subtract the total spent from the amount of money David has - $540:
Remaining budget = $540 - $366.97
Remaining budget = $173.03
Now we can set up the inequality to determine the maximum number of outfits:
Cost per outfit * number of outfits ≤ remaining budget
$79.43 * x ≤ $173.03
Thus, the inequality that can be used to determine the maximum number of outfits David can purchase while staying within his budget is:
79.43x ≤ 173.03