Question

The description you provided represents a mathematical expression on a number line. Here's how to interpret it:

1. **Number Line Range**: The number line includes all integers from -8 to 8, which encompasses all the points in that range.

2. **Closed Point at 4**: A closed point at 4 indicates that 4 is included in the set of numbers being represented.

3. **Arrow Extending Indefinitely Left**: The arrow extending to the left of 4 shows that the values extend indefinitely leftward from the point 4. This means all numbers less than or equal to 4 are included.

Putting this together, the range of values represented can be expressed as:

**x ≤ 4**

or in interval notation:

**(-∞, 4]**

This indicates that all values less than or equal to 4 are included, with the closed interval at 4 meaning that 4 itself is part of the solution set. The arrow signifies that there is no limit on how far the values can go in the negative direction.

The expression represented by your description is:

**All real numbers less than or equal to 4**.

In mathematical notation, this can be written as:

- **Inequality form**: \( x \leq 4 \)
- **Interval notation**: \( (-\infty, 4] \)

This indicates that the set of numbers includes all values from negative infinity up to and including 4.

I apologize for the misunderstanding. Let's break it down again based on your initial description:

1. There is a number line from -8 to 8.
2. A closed point is located at 4, meaning that 4 is included in the set.
3. There is an arrow extending indefinitely to the left from the closed point at 4.

Given these facts, the correct interpretation is that the set includes all numbers from negative infinity up to and including 4.

So, the final representation is:
- **In inequality form**: \( x \leq 4 \)
- **In interval notation**: \( (-\infty, 4] \)

If there was a condition that I missed or if the right answer was intended to be different, please clarify, and I will correct it. Thank you for your patience!