# Write an inequality that describes the graph

## Graphing inequalities

Graph the equation of the line for the inequality. Let n represent the number of yards a swimmer can swim without stopping. Some specific examples of solutions to the inequality include -5, 1, 2, 3, and 7. Some specific examples of solutions to the inequality include 0, 0 , 8, -2 , and 1, This indicates that all real numbers less than 8 are solutions to the inequality. Let me do that in a darker color. This indicates that all real numbers greater than or equal to 0 are solutions to the inequality. Write the compound inequality shown by the graph. Our change in y is equal to negative 1. Its y-intercept is right there. I know that, because they shaded in this whole area up here. A volleyball team scored 14 more points in its first game than in its third game. Solve the inequality and graph the solutions. It's not a dashed line.

Let me do that in a darker color. Describe the solutions of in words. OR 10 Unit 3 Pretest Let's say x is equal to 1. Some specific examples of solutions to the inequality include 0, 08, -2and 1, Solve You could have said, hey, what happens if I go back 4 in x? We can figure out its y-intercept just by looking at it.

The line of the graph will depend on the symbol. What is the greatest number of points the team could have scored in its first game? This indicates that all real numbers less than or equal to 2 are solutions.

Shade the side of the graph that yields the correct solution when the ordered pair is substituted.

## Two variable inequalities from their graphs

Graph the solution. Make sure the inequality is solved for y. Its y-intercept is right there at y is equal to negative 2. This indicates that all real numbers greater than or equal to 0 are solutions to the inequality. Graphing two-variable linear inequalities Video transcript Write an inequality that fits the graph shown below. But keep in mind, the set of solutions to the inequality include all real numbers less than or equal to 2. Solve the inequality and graph the solutions.

So if I went back 4, if delta x was negative 4, if delta x is equal to negative 4, then delta y is equal to positive 2. This indicates that all real numbers on the line and in the shaded area are solutions to the inequality. Rated 5/10 based on 65 review