Question

If \( x \) varies inversely with \( y \), it can be expressed mathematically as \( x \cdot y = k \), where \( k \) is a constant. This means that as one variable increases, the other variable must decrease in order to keep the product \( k \) constant.

Let's evaluate the options provided:

1. **When x is divided by 4, y is divided by 4.**
- Incorrect. If \( x \) is divided by 4, then \( y \) must be multiplied by 4 to keep the product constant.

2. **When x is multiplied by 4, y is divided by 4.**
- Correct. Multiplying \( x \) by 4 will cause \( y \) to decrease by a factor of 4 in order to keep the product \( k \) constant.

3. **When x is multiplied by 4, y is multiplied by 4.**
- Incorrect. This would contradict the relationship of inverse variation.

4. **When x is increased by 4, y is decreased by 4.**
- Incorrect. The specific values of increase and decrease do not hold for inverse variation; it's about the proportional relationship rather than specific addition or subtraction.

So, the correct statement is: **When x is multiplied by 4, y is divided by 4.**