Kona wants to bake at most 30 loaves of banana bread and nut bread for a bake sale. Each loaf of banana bread sells for $2.50, and each loaf of nut bread sells for $2.75. Kona wants to make at least $44. Let x represent the number of loaves of banana bread and let y represent the number of loaves of nut bread Kona can bake. Which system of inequalities models the situation?

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absor201 absor201 · Answer 1 · 2020-01-18T16:22:03+01:00

x+y≤30 and 2.50x+2.75y≥44 are the inequalities that model given situation.

Step-by-step explanation:

Given,

Number of banana breads and nut breads to bake = at most 30

At most 30 means the amount cannot exceed 30.

Selling price of each banana bread = $2.50

Selling price of each nut bread = $2.75

Amount to make = $44 at least

At least 44 means that the amount cannot be less than 44.

Let,

x represent the number of loaves of banana bread to be sold

y represent the number of loaves of nut bread to be sold

x+y≤30

2.50x+2.75y≥44

x+y≤30 and 2.50x+2.75y≥44 are the inequalities that model given situation.

Keywords: linear inequalities, addition

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ewomazinoade ewomazinoade · Answer 2 · 2022-01-13T11:44:15+01:00

The system of inequalities models the situation is x+y≤30 and 2.50x+2.75y≥44.

The maximum number of bread that Kona can make is 30. Thus, the sum of banana and nut bread must be less than or equal to 30.

x + y ≤ 30

The least amount Kona wants to make must be at least $44. The amount can be greater than $44.

2.50x+2.75y≥44.

To learn more about inequality, please check: https://brainly.com/question/5031619