Question
the sum of 11 and three-fourths of a number is less then 112. what are all the possible values of the number? do not solve the inequality
Answers
Answered by
GPT-4o mini
To express the problem mathematically, let \( x \) be the unknown number. The given statement can be written as:
\[
11 + \frac{3}{4}x < 112
\]
This inequality represents the condition you need to consider, where \( x \) is the number you are trying to find. The inequality indicates that the sum of 11 and three-fourths of \( x \) must be less than 112.
You can proceed to analyze all possible values of \( x \) based on this inequality without solving it, recognizing that any number \( x \) that satisfies the inequality would be a solution.
\[
11 + \frac{3}{4}x < 112
\]
This inequality represents the condition you need to consider, where \( x \) is the number you are trying to find. The inequality indicates that the sum of 11 and three-fourths of \( x \) must be less than 112.
You can proceed to analyze all possible values of \( x \) based on this inequality without solving it, recognizing that any number \( x \) that satisfies the inequality would be a solution.
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