Choose The Correct Answer For The Following Question.The Degree Of The Polynomial \[$4m^3n^2 - 3m^2n^2 + 4m^2n\$\] Is:A. 2 B. 3 C. 4

Introduction

In mathematics, polynomials are algebraic expressions consisting of variables and coefficients combined using only addition, subtraction, and multiplication. The degree of a polynomial is a crucial concept in algebra, and it plays a significant role in solving equations and inequalities. In this article, we will explore how to determine the degree of a polynomial, using the given polynomial as an example.

What is the Degree of a Polynomial?

The degree of a polynomial is the highest power or exponent of the variable(s) in the polynomial. For example, in the polynomial $ax^2 + bx + c$, the degree is 2 because the highest power of the variable $x$ is 2.

Determining the Degree of the Given Polynomial

The given polynomial is $4m^3n^2 - 3m^2n^2 + 4m^2n$. To determine the degree of this polynomial, we need to identify the highest power of the variables $m$ and $n$.

Step 1: Identify the Terms with the Highest Power of m

The terms with the highest power of $m$ are $4m^3n^2$ and $-3m^2n^2$. However, we need to consider the power of $m$ in each term. In the first term, the power of $m$ is 3, and in the second term, the power of $m$ is 2.

Step 2: Identify the Terms with the Highest Power of n

The terms with the highest power of $n$ are $4m^3n^2$ and $-3m^2n^2$. However, we need to consider the power of $n$ in each term. In the first term, the power of $n$ is 2, and in the second term, the power of $n$ is also 2.

Step 3: Determine the Degree of the Polynomial

Since the highest power of $m$ is 3 and the highest power of $n$ is 2, the degree of the polynomial is the sum of these powers, which is 3 + 2 = 5.

Conclusion

In conclusion, the degree of the polynomial $4m^3n^2 - 3m^2n^2 + 4m^2n$ is 5. This is because the highest power of the variable $m$ is 3 and the highest power of the variable $n$ is 2.

Answer

The correct answer is C. 5.

Additional Examples

To reinforce your understanding of determining the degree of a polynomial, let's consider a few more examples.

Example 1

The polynomial is $2x^3y^2 + 3x^2y^2 - 4xy^2$. To determine the degree of this polynomial, we need to identify the highest power of the variables $x$ and $y$.

The terms with the highest power of $x$ are $2x^3y^2$ and $3x^2y^2$. However, we need to consider the power of $x$ in each term. In the first term, the power of $x$ is 3, and in the second term, the power of $x$ is 2.

The terms with the highest power of $y$ are $2x^3y^2$, $3x^2y^2$, and $-4xy^2$. However, we need to consider the power of $y$ in each term. In the first term, the power of $y$ is 2, in the second term, the power of $y$ is also 2, and in the third term, the power of $y$ is 2.

Since the highest power of $x$ is 3 and the highest power of $y$ is 2, the degree of the polynomial is the sum of these powers, which is 3 + 2 = 5.

Example 2

The polynomial is $x^2y^3 + 2x^2y^2 - 3xy^2$. To determine the degree of this polynomial, we need to identify the highest power of the variables $x$ and $y$.

The terms with the highest power of $x$ are $x^2y^3$, $2x^2y^2$, and $-3xy^2$. However, we need to consider the power of $x$ in each term. In the first term, the power of $x$ is 2, in the second term, the power of $x$ is 2, and in the third term, the power of $x$ is 1.

The terms with the highest power of $y$ are $x^2y^3$, $2x^2y^2$, and $-3xy^2$. However, we need to consider the power of $y$ in each term. In the first term, the power of $y$ is 3, in the second term, the power of $y$ is 2, and in the third term, the power of $y$ is 2.

Since the highest power of $x$ is 2 and the highest power of $y$ is 3, the degree of the polynomial is the sum of these powers, which is 2 + 3 = 5.

Final Thoughts

Q: What is the degree of a polynomial?

A: The degree of a polynomial is the highest power or exponent of the variable(s) in the polynomial.

Q: How do I determine the degree of a polynomial?

A: To determine the degree of a polynomial, you need to identify the highest power of each variable in the polynomial. You can do this by looking at each term in the polynomial and identifying the power of each variable.

Q: What if the polynomial has multiple variables?

A: If the polynomial has multiple variables, you need to identify the highest power of each variable and add them together to find the degree of the polynomial.

Q: What if the polynomial has a negative exponent?

A: If the polynomial has a negative exponent, you need to change the sign of the exponent to a positive one and then identify the highest power of the variable.

Q: What if the polynomial has a fraction as an exponent?

A: If the polynomial has a fraction as an exponent, you need to simplify the fraction and then identify the highest power of the variable.

Q: Can you give me an example of how to determine the degree of a polynomial?

A: Let's say we have the polynomial $2x^3y^2 + 3x^2y^2 - 4xy^2$. To determine the degree of this polynomial, we need to identify the highest power of each variable.

The terms with the highest power of $x$ are $2x^3y^2$ and $3x^2y^2$. However, we need to consider the power of $x$ in each term. In the first term, the power of $x$ is 3, and in the second term, the power of $x$ is 2.

The terms with the highest power of $y$ are $2x^3y^2$, $3x^2y^2$, and $-4xy^2$. However, we need to consider the power of $y$ in each term. In the first term, the power of $y$ is 2, in the second term, the power of $y$ is also 2, and in the third term, the power of $y$ is 2.

Since the highest power of $x$ is 3 and the highest power of $y$ is 2, the degree of the polynomial is the sum of these powers, which is 3 + 2 = 5.

Q: Can you give me another example of how to determine the degree of a polynomial?

A: Let's say we have the polynomial $x^2y^3 + 2x^2y^2 - 3xy^2$. To determine the degree of this polynomial, we need to identify the highest power of each variable.

The terms with the highest power of $x$ are $x^2y^3$, $2x^2y^2$, and $-3xy^2$. However, we need to consider the power of $x$ in each term. In the first term, the power of $x$ is 2, in the second term, the power of $x$ is 2, and in the third term, the power of $x$ is 1.

The terms with the highest power of $y$ are $x^2y^3$, $2x^2y^2$, and $-3xy^2$. However, we need to consider the power of $y$ in each term. In the first term, the power of $y$ is 3, in the second term, the power of $y$ is 2, and in the third term, the power of $y$ is 2.

Since the highest power of $x$ is 2 and the highest power of $y$ is 3, the degree of the polynomial is the sum of these powers, which is 2 + 3 = 5.

Q: What if I have a polynomial with multiple terms?

A: If you have a polynomial with multiple terms, you can determine the degree of the polynomial by identifying the highest power of each variable in each term and then adding them together.

Q: Can you give me an example of how to determine the degree of a polynomial with multiple terms?

A: Let's say we have the polynomial $2x^3y^2 + 3x^2y^2 - 4xy^2 + x^2y^3$. To determine the degree of this polynomial, we need to identify the highest power of each variable in each term.

The terms with the highest power of $x$ are $2x^3y^2$, $3x^2y^2$, $-4xy^2$, and $x^2y^3$. However, we need to consider the power of $x$ in each term. In the first term, the power of $x$ is 3, in the second term, the power of $x$ is 2, in the third term, the power of $x$ is 1, and in the fourth term, the power of $x$ is 2.

The terms with the highest power of $y$ are $2x^3y^2$, $3x^2y^2$, $-4xy^2$, and $x^2y^3$. However, we need to consider the power of $y$ in each term. In the first term, the power of $y$ is 2, in the second term, the power of $y$ is 2, in the third term, the power of $y$ is 2, and in the fourth term, the power of $y$ is 3.

Since the highest power of $x$ is 3 and the highest power of $y$ is 3, the degree of the polynomial is the sum of these powers, which is 3 + 3 = 6.

Conclusion

Determining the degree of a polynomial is a crucial concept in algebra, and it plays a significant role in solving equations and inequalities. By following the steps outlined in this article, you can easily determine the degree of a polynomial, even if it has multiple variables and terms. Remember to identify the highest power of each variable and add them together to find the degree of the polynomial.