Final answer:
When simplifying the absolute value signs in the ratio test, we consider both the positive and negative signs separately. Here are the steps: 1. For the positive sign, keep the expression inside the absolute value signs as it is. 2. For the negative sign, take the negation of the expression inside the absolute value signs.
Step-by-step explanation:
When simplifying the absolute value signs in the ratio test, we consider both the positive and negative signs separately. Here are the steps: 1. For the positive sign, keep the expression inside the absolute value signs as it is. 2. For the negative sign, take the negation of the expression inside the absolute value signs.
When simplifying the absolute value signs in the ratio test, we consider both the positive and negative signs separately. Here are the steps:
- For the positive sign, we keep the expression inside the absolute value signs as it is.
- For the negative sign, we take the negation of the expression inside the absolute value signs, which means changing the signs of all terms.
For example, if we have the expression |2x - 3|, then when evaluating for the positive sign, we keep it as |2x - 3|. When evaluating for the negative sign, we take the negation, which becomes |-(2x - 3)| or |-2x + 3|.