To determine how many books Rachel can buy with her $75 gift certificate, we can set up the following equation:
Let \( B \) be the number of books she can buy. The total cost of the books can be represented by the equation:
\[ 18.25B = 75 \]
Now, we'll solve for \( B \):
\[ B = \frac{75}{18.25} \]
Calculating the value:
\[ B \approx \frac{75}{18.25} \approx 4.115 \]
Now, rounding to the nearest tenth, \( B \) is approximately 4.1.
Next, we need to determine if this is a viable solution in terms of purchasing whole books. Since Rachel cannot buy a fraction of a book, we check the whole number values below and above our solution:
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If \( B = 4 \): \[ \text{Total cost} = 18.25 \times 4 = 73 \] This is under $75 and is a feasible option.
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If \( B = 5 \): \[ \text{Total cost} = 18.25 \times 5 = 91.25 \] This exceeds $75 and is not a feasible option.
Thus, the only viable solution for how many whole books Rachel can buy is 4 books, which costs her $73, leaving her with a remainder of $2 from her $75 gift certificate.
In conclusion:
- Equation: \( 18.25B = 75 \)
- Solution: Rachel can buy 4 books.
- Is the value viable?: Yes, buying 4 books is a valid solution.
3 answers