To Make A Small Vase, Elisa Uses No More Than 4.5 Ounces Of Clay. To Make A Large Vase, She Uses At Least 12 Ounces Of Clay. Which Compound Inequality Represents The Number Of Ounces Of Clay, { C $}$, That Elisa Uses To Make One Vase Of

Understanding Compound Inequalities in Vase Making

In the world of ceramics, the amount of clay used to create a vase can vary greatly depending on the size and design of the piece. Elisa, a skilled potter, uses a specific amount of clay to make her vases. In this article, we will explore the compound inequality that represents the number of ounces of clay Elisa uses to make one vase.

To make a small vase, Elisa uses no more than 4.5 ounces of clay. On the other hand, to make a large vase, she uses at least 12 ounces of clay. We need to find the compound inequality that represents the number of ounces of clay, denoted as ${c}$, that Elisa uses to make one vase.

Before we dive into the compound inequality, let's review the basics of inequalities. An inequality is a statement that compares two expressions using a mathematical symbol, such as <, >, ≤, or ≥. In this case, we have two inequalities:

• ${c \leq 4.5}$ (Elisa uses no more than 4.5 ounces of clay to make a small vase)
• ${c \geq 12}$ (Elisa uses at least 12 ounces of clay to make a large vase)

A compound inequality is a statement that combines two or more inequalities using logical operators, such as "and" or "or". In this case, we want to find the compound inequality that represents the number of ounces of clay Elisa uses to make one vase.

To find the compound inequality, we need to combine the two inequalities using the "and" operator. This is because Elisa uses a specific amount of clay to make a vase, and that amount must satisfy both inequalities.

The compound inequality is:

${12 \leq c \leq 4.5}$

However, this is not a valid compound inequality, as it is impossible for the amount of clay to be both greater than or equal to 12 and less than or equal to 4.5.

To find the correct compound inequality, we need to consider the logical "or" operator. This is because Elisa uses a specific amount of clay to make a vase, and that amount must satisfy either of the two inequalities.

The correct compound inequality is:

${c \leq 4.5 \text{ or } c \geq 12}$

This compound inequality represents the number of ounces of clay Elisa uses to make one vase.

In this article, we explored the compound inequality that represents the number of ounces of clay Elisa uses to make one vase. We reviewed the basics of inequalities and compound inequalities, and we found the correct compound inequality using the logical "or" operator. The compound inequality is:

${c \leq 4.5 \text{ or } c \geq 12}$

This compound inequality provides a mathematical representation of the amount of clay Elisa uses to make a vase, and it can be used to solve problems related to vase making.

Here are some example problems that use the compound inequality:

• Elisa wants to make a vase that uses between 12 and 4.5 ounces of clay. What is the range of possible values for the amount of clay?
• Elisa wants to make a vase that uses at least 12 ounces of clay. What is the minimum amount of clay she can use?
• Elisa wants to make a vase that uses no more than 4.5 ounces of clay. What is the maximum amount of clay she can use?

These example problems demonstrate how the compound inequality can be used to solve real-world problems related to vase making.

The compound inequality has many real-world applications in various fields, including:

• Ceramics: The compound inequality can be used to determine the amount of clay needed to make a vase of a specific size.
• Engineering: The compound inequality can be used to design and optimize systems that require a specific range of values.
• Science: The compound inequality can be used to model and analyze complex systems that involve multiple variables.

In conclusion, the compound inequality is a powerful mathematical tool that can be used to solve problems related to vase making and other fields. By understanding the basics of inequalities and compound inequalities, we can use this tool to model and analyze complex systems and make informed decisions.
Compound Inequality Q&A: Understanding the Basics of Vase Making

In our previous article, we explored the compound inequality that represents the number of ounces of clay Elisa uses to make one vase. We reviewed the basics of inequalities and compound inequalities, and we found the correct compound inequality using the logical "or" operator. In this article, we will answer some frequently asked questions about compound inequalities and vase making.

Q: What is a compound inequality?

A: A compound inequality is a statement that combines two or more inequalities using logical operators, such as "and" or "or". In the case of vase making, a compound inequality can represent the range of possible values for the amount of clay used to make a vase.

Q: How do I write a compound inequality?

A: To write a compound inequality, you need to combine two or more inequalities using the logical "or" or "and" operator. For example, if Elisa uses no more than 4.5 ounces of clay to make a small vase and at least 12 ounces of clay to make a large vase, the compound inequality would be:

${c \leq 4.5 \text{ or } c \geq 12}$

Q: What is the difference between "and" and "or" in compound inequalities?

A: In compound inequalities, the "and" operator is used to combine two or more inequalities that must be true simultaneously. For example, if Elisa uses 4.5 ounces of clay to make a small vase and 12 ounces of clay to make a large vase, the compound inequality would be:

${c = 4.5 \text{ and } c = 12}$

On the other hand, the "or" operator is used to combine two or more inequalities that can be true independently. For example, if Elisa uses no more than 4.5 ounces of clay to make a small vase or at least 12 ounces of clay to make a large vase, the compound inequality would be:

${c \leq 4.5 \text{ or } c \geq 12}$

Q: How do I solve a compound inequality?

A: To solve a compound inequality, you need to find the values of the variable that satisfy both inequalities. For example, if Elisa uses no more than 4.5 ounces of clay to make a small vase and at least 12 ounces of clay to make a large vase, the solution to the compound inequality would be:

${c \in [12, 4.5]}$

This means that the amount of clay used to make a vase must be between 12 and 4.5 ounces.

Q: What are some real-world applications of compound inequalities?

A: Compound inequalities have many real-world applications in various fields, including:

• Ceramics: Compound inequalities can be used to determine the amount of clay needed to make a vase of a specific size.
• Engineering: Compound inequalities can be used to design and optimize systems that require a specific range of values.
• Science: Compound inequalities can be used to model and analyze complex systems that involve multiple variables.

In this article, we answered some frequently asked questions about compound inequalities and vase making. We reviewed the basics of inequalities and compound inequalities, and we provided examples of how to write and solve compound inequalities. We also discussed some real-world applications of compound inequalities. By understanding the basics of compound inequalities, we can use this tool to model and analyze complex systems and make informed decisions.

Here are some example problems that use compound inequalities:

• Elisa wants to make a vase that uses between 12 and 4.5 ounces of clay. What is the range of possible values for the amount of clay?
• Elisa wants to make a vase that uses at least 12 ounces of clay. What is the minimum amount of clay she can use?
• Elisa wants to make a vase that uses no more than 4.5 ounces of clay. What is the maximum amount of clay she can use?

These example problems demonstrate how compound inequalities can be used to solve real-world problems related to vase making.

The compound inequality has many real-world applications in various fields, including:

• Ceramics: The compound inequality can be used to determine the amount of clay needed to make a vase of a specific size.
• Engineering: The compound inequality can be used to design and optimize systems that require a specific range of values.
• Science: The compound inequality can be used to model and analyze complex systems that involve multiple variables.

In conclusion, the compound inequality is a powerful mathematical tool that can be used to solve problems related to vase making and other fields. By understanding the basics of inequalities and compound inequalities, we can use this tool to model and analyze complex systems and make informed decisions.