Part 2 Of 2$S$ Varies Inversely As $G$. If $S$ Is 9 When $G$ Is 2:a) Write The Variation Equation.b) Find $S$ When $G$ Is 5.

Feb 25, 2025 by ADMIN 137 views

Part 2 of 2: Understanding Inverse Variation

In the previous part of this series, we explored the concept of inverse variation and its applications in real-world scenarios. In this part, we will delve deeper into the world of inverse variation and learn how to write a variation equation and solve problems involving inverse variation.

What is Inverse Variation?

Inverse variation is a relationship between two variables where one variable increases as the other decreases, and vice versa. This relationship can be represented by the equation:

y = \frac{k}{x}

where $y$ and $x$ are the variables, and $k$ is a constant.

Writing the Variation Equation

To write a variation equation, we need to identify the variables and the constant of variation. In this case, we are given that $S$ varies inversely as $G$ . This means that as $G$ increases, $S$ decreases, and vice versa.

We are also given that $S$ is 9 when $G$ is 2. We can use this information to write the variation equation.

Let's start by writing the equation in the form:

S = \frac{k}{G}

We know that $S$ is 9 when $G$ is 2, so we can substitute these values into the equation:

9 = \frac{k}{2}

To solve for $k$ , we can multiply both sides of the equation by 2:

k = 18

Now that we have found the value of $k$ , we can write the variation equation:

S = \frac{18}{G}

Finding $S$ when $G$ is 5

Now that we have the variation equation, we can use it to find the value of $S$ when $G$ is 5.

We can substitute $G = 5$ into the equation:

S = \frac{18}{5}

To simplify the fraction, we can divide the numerator by the denominator:

S = 3.6

Therefore, when $G$ is 5, $S$ is approximately 3.6.

In this part of the series, we learned how to write a variation equation and solve problems involving inverse variation. We used the given information to write the variation equation and then used it to find the value of $S$ when $G$ is 5.

Inverse variation has many real-world applications, including:

Physics: Inverse variation is used to describe the relationship between the force of gravity and the distance between two objects.
Economics: Inverse variation is used to describe the relationship between the price of a good and the quantity demanded.
Biology: Inverse variation is used to describe the relationship between the concentration of a substance and the rate of reaction.

Here are a few examples of inverse variation:

Force and Distance: The force of gravity between two objects varies inversely as the square of the distance between them.
Price and Quantity: The price of a good varies inversely as the quantity demanded.
Concentration and Rate: The rate of reaction varies inversely as the concentration of a substance.

Here are a few tips and tricks to help you solve problems involving inverse variation:

Read the problem carefully: Make sure you understand what the problem is asking for.
Identify the variables: Identify the variables and the constant of variation.
Write the equation: Write the equation in the form $y = \frac{k}{x}$ .
Solve for the variable: Solve for the variable by substituting the given values into the equation.

Here are a few practice problems to help you practice solving problems involving inverse variation:

Problem 1: $S$ varies inversely as $G$ . If $S$ is 12 when $G$ is 3, write the variation equation and find $S$ when $G$ is 6.
Problem 2: $P$ varies inversely as $Q$ . If $P$ is 15 when $Q$ is 2, write the variation equation and find $P$ when $Q$ is 4.
Problem 3: $R$ varies inversely as $S$ . If $R$ is 20 when $S$ is 5, write the variation equation and find $R$ when $S$ is 10.

Here are the answers to the practice problems:

Problem 1: $S = \frac{36}{G}$ , $S = 6$ when $G$ is 6.
Problem 2: $P = \frac{30}{Q}$ , $P = 7.5$ when $Q$ is 4.
Problem 3: $R = \frac{40}{S}$ , $R = 4$ when $S$ is 10.
Inverse Variation Q&A =========================

Q: What is inverse variation?

A: Inverse variation is a relationship between two variables where one variable increases as the other decreases, and vice versa. This relationship can be represented by the equation:

y = \frac{k}{x}

Q: How do I write a variation equation?

A: To write a variation equation, you need to identify the variables and the constant of variation. You can use the given information to write the equation in the form:

y = \frac{k}{x}

Q: What is the constant of variation?

A: The constant of variation is a value that does not change in the equation. It is represented by the variable $k$ in the equation:

y = \frac{k}{x}

Q: How do I find the constant of variation?

A: To find the constant of variation, you can use the given information to write the equation and then solve for $k$ . For example, if $S$ is 9 when $G$ is 2, you can write the equation:

9 = \frac{k}{2}

Solving for $k$ , you get:

k = 18

Q: How do I solve problems involving inverse variation?

A: To solve problems involving inverse variation, you need to:

Read the problem carefully and identify the variables and the constant of variation.
Write the equation in the form $y = \frac{k}{x}$ .
Solve for the variable by substituting the given values into the equation.

Q: What are some real-world applications of inverse variation?

A: Inverse variation has many real-world applications, including:

Physics: Inverse variation is used to describe the relationship between the force of gravity and the distance between two objects.
Economics: Inverse variation is used to describe the relationship between the price of a good and the quantity demanded.
Biology: Inverse variation is used to describe the relationship between the concentration of a substance and the rate of reaction.

Q: What are some tips and tricks for solving problems involving inverse variation?

A: Here are a few tips and tricks to help you solve problems involving inverse variation:

Read the problem carefully: Make sure you understand what the problem is asking for.
Identify the variables: Identify the variables and the constant of variation.
Write the equation: Write the equation in the form $y = \frac{k}{x}$ .
Solve for the variable: Solve for the variable by substituting the given values into the equation.

Q: What are some practice problems to help me practice solving problems involving inverse variation?

A: Here are a few practice problems to help you practice solving problems involving inverse variation:

Problem 1: $S$ varies inversely as $G$ . If $S$ is 12 when $G$ is 3, write the variation equation and find $S$ when $G$ is 6.
Problem 2: $P$ varies inversely as $Q$ . If $P$ is 15 when $Q$ is 2, write the variation equation and find $P$ when $Q$ is 4.
Problem 3: $R$ varies inversely as $S$ . If $R$ is 20 when $S$ is 5, write the variation equation and find $R$ when $S$ is 10.

Q: What are the answers to the practice problems?

A: Here are the answers to the practice problems:

Problem 1: $S = \frac{36}{G}$ , $S = 6$ when $G$ is 6.
Problem 2: $P = \frac{30}{Q}$ , $P = 7.5$ when $Q$ is 4.
Problem 3: $R = \frac{40}{S}$ , $R = 4$ when $S$ is 10.

Inverse variation is a powerful tool for solving problems in a variety of fields, including physics, economics, and biology. By understanding the concept of inverse variation and how to write a variation equation, you can solve problems involving inverse variation with ease. Remember to read the problem carefully, identify the variables and the constant of variation, and write the equation in the form $y = \frac{k}{x}$ . With practice and patience, you will become proficient in solving problems involving inverse variation.