Make $c$ The Subject Of The Formula $S = 9 \gamma (\gamma + 2 L)$.

Make c the Subject of the Formula S = 9γ(γ + 2l)

In mathematics, solving equations for a specific variable is a crucial skill that is used extensively in various fields, including physics, engineering, and economics. One of the most common types of equations is the formula, which is a statement that expresses the relationship between two or more variables. In this article, we will focus on making c the subject of the formula S = 9γ(γ + 2l), which is a quadratic equation in terms of γ and l.

The given formula is S = 9γ(γ + 2l), where S, γ, and l are variables. To make c the subject of this formula, we need to isolate c on one side of the equation. However, there is no c in the given formula, which means we need to introduce a new variable c and express it in terms of the existing variables S, γ, and l.

Let's assume that c is a new variable that is related to the existing variables S, γ, and l. We can introduce c as a function of these variables, such as c = f(S, γ, l). Our goal is to find the expression for c in terms of S, γ, and l.

To solve for c, we need to isolate c on one side of the equation. We can start by dividing both sides of the equation by 9γ, which gives us:

S / (9γ) = γ + 2l

Next, we can subtract γ from both sides of the equation to get:

S / (9γ) - γ = 2l

Now, we can multiply both sides of the equation by 9γ to get rid of the fraction:

S - 9γ^2 = 18γl

We can now isolate c by dividing both sides of the equation by 18γ:

c = (S - 9γ^2) / (18γ)

This is the expression for c in terms of S, γ, and l.

We can simplify the expression for c by factoring out the common term 9γ from the numerator:

c = (S / (18γ)) - (9γ / 18γ)

Now, we can cancel out the common term 9γ from the numerator and denominator:

c = (S / (18γ)) - 1/2

In this article, we have made c the subject of the formula S = 9γ(γ + 2l) by introducing a new variable c and expressing it in terms of the existing variables S, γ, and l. We have solved for c by isolating it on one side of the equation and simplified the expression for c by factoring out common terms. This expression for c can be used in various mathematical and scientific applications where c is a dependent variable.

The expression for c can be used in various mathematical and scientific applications, such as:

• Physics: In physics, the expression for c can be used to describe the relationship between the speed of an object, its mass, and its kinetic energy.
• Engineering: In engineering, the expression for c can be used to design and optimize systems, such as electrical circuits and mechanical systems.
• Economics: In economics, the expression for c can be used to model and analyze economic systems, such as supply and demand curves.

In this article, we will answer some of the most frequently asked questions about making c the subject of the formula S = 9γ(γ + 2l).

Q: What is the formula S = 9γ(γ + 2l)?

A: The formula S = 9γ(γ + 2l) is a quadratic equation in terms of γ and l, where S is the dependent variable.

Q: How do I make c the subject of the formula S = 9γ(γ + 2l)?

A: To make c the subject of the formula S = 9γ(γ + 2l), we need to introduce a new variable c and express it in terms of the existing variables S, γ, and l. We can do this by solving for c using algebraic manipulations.

Q: What are the steps to solve for c?

A: The steps to solve for c are:

1. Divide both sides of the equation by 9γ.
2. Subtract γ from both sides of the equation.
3. Multiply both sides of the equation by 9γ.
4. Isolate c by dividing both sides of the equation by 18γ.

Q: How do I simplify the expression for c?

A: We can simplify the expression for c by factoring out the common term 9γ from the numerator and canceling out the common term 9γ from the numerator and denominator.

Q: What is the final expression for c?

A: The final expression for c is:

c = (S / (18γ)) - 1/2

Q: What are some example use cases for the expression for c?

A: The expression for c can be used in various mathematical and scientific applications, such as:

• Physics: In physics, the expression for c can be used to describe the relationship between the speed of an object, its mass, and its kinetic energy.
• Engineering: In engineering, the expression for c can be used to design and optimize systems, such as electrical circuits and mechanical systems.
• Economics: In economics, the expression for c can be used to model and analyze economic systems, such as supply and demand curves.

Q: What are some common mistakes to avoid when solving for c?

A: Some common mistakes to avoid when solving for c include:

• Not introducing a new variable c: Make sure to introduce a new variable c and express it in terms of the existing variables S, γ, and l.
• Not isolating c: Make sure to isolate c by dividing both sides of the equation by 18γ.
• Not simplifying the expression for c: Make sure to simplify the expression for c by factoring out common terms and canceling out common terms.

Q: How can I practice solving for c?

A: You can practice solving for c by working through example problems and exercises. You can also try solving for c using different variables and equations.

In this article, we have answered some of the most frequently asked questions about making c the subject of the formula S = 9γ(γ + 2l). We have provided step-by-step instructions on how to solve for c and simplified the expression for c. We have also discussed some example use cases for the expression for c and common mistakes to avoid when solving for c.