Degree of Constant Polynomial
A polynomial is said to be a constant polynomial if its value remains the same. Let the constant polynomial be P(x) = c, or we can write it as P(x) = Cx0 since the value of x0 is 1. So, we can say that the degree of constant polynomial is zero.
Example: P(x) = 13 = 13x0.
So, the degree of P(x) is zero.
Degree of Polynomial
Degree of a polynomial is defined as the highest power of the variable in the polynomial expression. A polynomial is defined as an algebraic expression that consists of variables and coefficients on which we can perform various arithmetic operations such as addition, subtraction, and multiplication, but we cannot perform division operations by a variable. (4x+3) and (x2+2x+5) are examples of polynomial expressions. So, the degree of these polynomial expressions is 1 and 2, respectively.
Degree of Polynomial is a very important topic for classes 9 and 10. So, in this article, you will learn about the degree of various types of polynomials like constant polynomial, zero polynomial, etc.
Table of Content
- What is Degree of Polynomial?
- Degree of Polynomial Definition
- Degree of Zero Polynomial
- Degree of Constant Polynomial
- Degree of Polynomial with more than one variable
- Classification of Polynomials Based on its Degree
- How to find the Degree of Polynomial?
- Degree of Polynomial Applications
- Degree of polynomial function examples
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