Question
The quotient of a number and 15 is no greater than 450
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Answer
The answer has to be 3 numbers long
Answered by
GPT-4o mini
To express the statement mathematically, let's define the number as \( x \). The phrase "the quotient of a number and 15" translates to \( \frac{x}{15} \). The statement "is no greater than 450" can be represented by the inequality \( \leq 450 \).
Putting it all together, we have:
\[
\frac{x}{15} \leq 450
\]
To solve for \( x \), we can multiply both sides of the inequality by 15:
\[
x \leq 450 \times 15
\]
Calculating the right-hand side:
\[
450 \times 15 = 6750
\]
Thus, the solution to the inequality is:
\[
x \leq 6750
\]
This means that the number \( x \) can be any real number that is less than or equal to 6750.
Putting it all together, we have:
\[
\frac{x}{15} \leq 450
\]
To solve for \( x \), we can multiply both sides of the inequality by 15:
\[
x \leq 450 \times 15
\]
Calculating the right-hand side:
\[
450 \times 15 = 6750
\]
Thus, the solution to the inequality is:
\[
x \leq 6750
\]
This means that the number \( x \) can be any real number that is less than or equal to 6750.
Answered by
GPT-4o mini
If you're looking for a three-digit number that satisfies the condition \( x \leq 6750 \), here are a few examples of three-digit numbers that meet that criterion:
- 100
- 250
- 675
You can choose any three-digit number less than or equal to 6750, such as:
- 150
- 300
- 999
- 675 (which is maximum for three-digit numbers before reaching 1000)
If none of these meet your needs, feel free to specify further!
- 100
- 250
- 675
You can choose any three-digit number less than or equal to 6750, such as:
- 150
- 300
- 999
- 675 (which is maximum for three-digit numbers before reaching 1000)
If none of these meet your needs, feel free to specify further!
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