What is the solution set for the inequality illustrated by a graph with an open circle endpoint at -15.33 and an arrow pointing to the left?
The open circle endpoint indicates that -15.33 is not included in the solution set. The arrow pointing to the left indicates that the solution set includes all numbers less than -15.33. Therefore, the solution set for the inequality is (-∞, -15.33).
To determine the solution set for the inequality represented by the given graph, we need to analyze the graph itself. The graph has an open circle endpoint at -15.33 and an arrow pointing to the left.
This indicates that the inequality is less than, and the open circle represents that -15.33 is not included in the solution.
In mathematical notation, this can be represented as:
x < -15.33
So, the solution set for this inequality is all real numbers that are less than -15.33, excluding -15.33.
To determine the solution set for the given inequality illustrated by the graph, we need to understand what the graph represents and how to interpret it.
The open circle endpoint at -15.33 on the number line indicates that -15.33 is not included in the solution set. This means the inequality is strict, and -15.33 is not a solution.
The arrow pointing to the left indicates that the values less than -15.33 are part of the solution set. In other words, the solution set includes all real numbers to the left of -15.33 on the number line.
Thus, the solution set for the inequality can be expressed in interval notation as (-∞, -15.33). This notation signifies that the solution set includes all real numbers from negative infinity up to, but not including, -15.33.