Answer :
Sure, let's break down the problem step by step.
1. Identify the given condition: The problem states that "The price of a baseball glove is no more than [tex]$38.95." 2. Define the variable: Let \( x \) represent the price of the baseball glove. 3. Translate the verbal statement into a mathematical inequality: The phrase "no more than" means that the price can be equal to $[/tex]38.95 or any amount less than [tex]$38.95. - In mathematical terms, this implies that \( x \) should be less than or equal to $[/tex]38.95.
- The symbol for "less than or equal to" is [tex]\( \leq \)[/tex].
4. Write the inequality: Combining the information above, we get the following inequality:
[tex]\[ x \leq 38.95 \][/tex]
So, the inequality that represents the condition is:
[tex]\[ x \leq 38.95 \][/tex]
1. Identify the given condition: The problem states that "The price of a baseball glove is no more than [tex]$38.95." 2. Define the variable: Let \( x \) represent the price of the baseball glove. 3. Translate the verbal statement into a mathematical inequality: The phrase "no more than" means that the price can be equal to $[/tex]38.95 or any amount less than [tex]$38.95. - In mathematical terms, this implies that \( x \) should be less than or equal to $[/tex]38.95.
- The symbol for "less than or equal to" is [tex]\( \leq \)[/tex].
4. Write the inequality: Combining the information above, we get the following inequality:
[tex]\[ x \leq 38.95 \][/tex]
So, the inequality that represents the condition is:
[tex]\[ x \leq 38.95 \][/tex]