This Graph Shows the Solution to Which Inequality? Key Concepts Further Reading

Introduction

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Inequalities are mathematical statements that compare two expressions. They can be used to model a wide variety of real-world situations, such as determining whether a quantity is greater than or less than another quantity.

The Graph

The graph below shows the solution to the inequality $x < 3$.

[Image of a graph showing the solution to the inequality x < 3]

Interpretation

The graph shows that the solution to the inequality $x < 3$ is all values of $x$ that are less than 3. This includes all values of $x$ that are less than 0, such as -1, -2, and -3. It also includes all values of $x$ that are between 0 and 3, such as 1, 2, and 2.99.

Applications

Inequalities can be used to solve a wide variety of problems, such as:

Determining whether a quantity is greater than or less than another quantity
Finding the range of possible values for a variable
Modeling real-world situations

Common Mistakes

There are a few common mistakes that people make when working with inequalities. These mistakes include:

Reversing the inequality symbol. When solving an inequality, it is important to make sure that the inequality symbol is not reversed. For example, the inequality $x < 3$ is not the same as the inequality $3 < x$.
Multiplying or dividing both sides of an inequality by a negative number. When multiplying or dividing both sides of an inequality by a negative number, the inequality symbol must be reversed. For example, if we multiply both sides of the inequality $x > 2$ by -1, we get the inequality $-x < -2$.
Not considering all of the possible cases. When solving an inequality, it is important to consider all of the possible cases. For example, when solving the inequality $x^2 > 9$, we must consider both the case where $x > 3$ and the case where $x < -3$.

Conclusion

Inequalities are a powerful tool that can be used to solve a wide variety of problems. By understanding the basics of inequalities, you can use them to solve problems in a variety of fields, such as mathematics, science, and engineering.