Answer :
To find which phrase represents the expression [tex]\(9 - 14x\)[/tex], let's break down the expression:
1. [tex]\(9\)[/tex]: This is simply the number nine.
2. [tex]\(-\)[/tex]: This represents subtraction, which is indicated by the word "minus."
3. [tex]\(14x\)[/tex]: This part involves two elements:
- [tex]\(14\)[/tex], which is the number fourteen.
- [tex]\(x\)[/tex], which is a variable, and it is being multiplied by fourteen. Hence, it can be referred to as "fourteen times [tex]\(x\)[/tex]."
So, when you put it all together, the expression [tex]\(9 - 14x\)[/tex] translates to "nine minus fourteen times [tex]\(x\)[/tex]."
Therefore, the correct phrase that represents the expression [tex]\(9 - 14x\)[/tex] is:
```
nine minus fourteen times x
```
1. [tex]\(9\)[/tex]: This is simply the number nine.
2. [tex]\(-\)[/tex]: This represents subtraction, which is indicated by the word "minus."
3. [tex]\(14x\)[/tex]: This part involves two elements:
- [tex]\(14\)[/tex], which is the number fourteen.
- [tex]\(x\)[/tex], which is a variable, and it is being multiplied by fourteen. Hence, it can be referred to as "fourteen times [tex]\(x\)[/tex]."
So, when you put it all together, the expression [tex]\(9 - 14x\)[/tex] translates to "nine minus fourteen times [tex]\(x\)[/tex]."
Therefore, the correct phrase that represents the expression [tex]\(9 - 14x\)[/tex] is:
```
nine minus fourteen times x
```
