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Oliver and his children went into a grocery store and will buy bananas and peaches. Each banana costs and each peach costs . Oliver has a total of to spend on bananas and peaches. Write an inequality that would represent the possible values for the number of bananas purchased, , and the number of peaches purchased, .Answer:
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Q. Oliver and his children went into a grocery store and will buy bananas and peaches. Each banana costs and each peach costs . Oliver has a total of to spend on bananas and peaches. Write an inequality that would represent the possible values for the number of bananas purchased, , and the number of peaches purchased, .Answer:
- Define Cost and Budget: Let's define the cost of one banana as \$\(0\).\(60\) and the cost of one peach as \$\(1\). Oliver has \$\(5\) to spend on these fruits. We need to write an inequality that shows the relationship between the number of bananas \(b\) and peaches \(p\) he can buy.
- Calculate Total Cost: The total cost of \(b\) bananas at \(\$0.60\) each is \(0.60b\) dollars. The total cost of \(p\) peaches at \(\$1\) each is \(p\) dollars. The sum of these two amounts cannot exceed the \(\$5\) that Oliver has to spend.
- Write Inequality: We can write the inequality that represents this situation as \(0.60b + p \leq 5\). This inequality shows that the combined cost of the bananas and peaches must be less than or equal to \(\$5\).
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