Zeros Of Polynomial - Formulas, Equations, Examples, Sum And ...

Zeros of Polynomial

Zeros of polynomial are the points where the polynomial equals zero on the whole. In simple words, we can say that zeros of polynomial are values of the variable such that the polynomial equals 0 at that point. Zeros of a polynomial are also referred to as the roots of the equation and are often designated as α, β, γ respectively. Some of the methods used to find the zeros of polynomial are grouping, factorization, and using algebraic expressions.

Further, the zeros of polynomial are helpful to form the original polynomial equation. Here we shall learn about how to find the zeros of a polynomial, the sum, and the product of zeros of the polynomial. We will solve a few examples related to it for a better understanding of the concept.

1.	What are Zeros of Polynomial?
2.	How to Find Zeros of Polynomial?
3.	Zeros of Polynomial Formula
4.	Sum and Product of Zeros of Polynomial
5.	Forming an Equation from the Zeros of Polynomial
6.	Representing Zeros of Polynomial on Graph
7.	FAQs on Zeros of Polynomial

What are Zeros of Polynomial?

The zeros of a polynomial f(x) are the values of x which satisfy the equation f(x) = 0. Here f(x) is a function of x, and the zeros of the polynomial are the values of x for which the f(x) value is equal to zero. The number of zeros of a polynomial depends on the degree of the equation f(x) = 0. All such domain values of the function, for which the range is equal to zero, are called the zeros of the polynomial.

Graphically the zeros of the polynomial are the points where the graph of y = f(x) cuts the x-axis. We shall learn more on this in the below content of representing zeros of a polynomial on the graph.

How to Find Zero of a Polynomial?

There are numerous methods to find the zeros of a polynomial. The number of zeros of the polynomial depends on the degree of the polynomial equation. The different equations have been classified as linear equations, quadratic equation, cubic equation, and higher degree polynomials and each of the equations are individually analyzed to find the zeros of the polynomial. The different types of equations and the methods to find their zeros of polynomial are as follows.

Linear Equation: A linear equation is of the form y = ax + b. The zero of this equation can be calculated by substituting y = 0, and on simplification we have ax + b = 0, or x = -b/a.

Quadratic Equation: There are two methods to factorize a quadratic equation. The quadratic equation of the form x2 + x(a + b) + ab = 0 can be factorized as (x + a)(x + b) = 0, and we have x = -a, and x = -b as the zeros of the polynomial. And for a quadratic equation of the form ax2+ bx + c = 0, which cannot be factorized, the zeros can be calculated using the formula method, and the formula is x = [- b ± √(b2 - 2ac) ] / 2a.

Cubic Equation: The cubic equation of the form y = ax3 + bx2 + cx + d, can be factorized by applying the remainder theorem. As per the remainder theorem, we can substitute any smaller values for the variable x = α, and if the value of y results to zero, y = 0, then the (x - α) is one root of the equation. Further, we can divide the cubic equation with (x - α) using the long division to obtain a quadratic equation. Finally, the quadratic equation can be solved either through factorization or by the formula method to obtain the required two roots of the equation.

Higher Degree Polynomial: The higher degree polynomial equation is of the form y = axn+ bxn - 1+cxn - 2 + ..... px + q. These higher degree polynomials can be factorized using the remainder theorem to obtain a quadratic equation. And the quadratic equation can be factorized to obtain the final two required factors.

Zeros of Polynomial Formula

As discussed in the previous section, we can find the zeros of different types of polynomials using different ways. For higher degree polynomials, we use the remainder theorem and ultimately come down to a quadratic polynomial for which we use the quadratic formula to find the zeros. So, the formula that we use to find the zeros of a quadratic polynomial ax2+ bx + c = 0 is:

x = [- b ± √(b2 - 2ac) ] / 2a

Sum and Product of Zeros of Polynomial

The zeros of a polynomial can be easily calculated with the help of:

Sum and Product of Zeros of Polynomial for Quadratic Equation

The sum and product of zeros of a polynomial can be directly calculated from the variables of the quadratic equation, and without finding the zeros of the polynomial. The zeros of the quadratic equation are represented by the symbols α, and β. For a quadratic equation of the form ax2 + bx + c = 0 with the coefficient a, b, constant term c, the sum and product of zeros of the polynomial are as follows.

Sum of Zeros of Polynomial = α + β = -b/a = - coefficient of x/coefficient of x2

Product of Zeros of Polynomial = αβ = c/a = constant term/coefficient of x2

Sum and Product of Zeros of Polynomial for Cubic Equation

A cubic polynomial is of the form ax3 + bx2 + cx + d = 0 , has a, b, c as the coefficients, d is the constant term, and α, β, γ are the roots of the cubic polynomial equation.

α + β + γ = -b/a = - coefficient of x2/coefficient of x3

αβ + βγ + γα = c/a = coefficient of x/coefficient of x3

αβγ = -d/a = -constant/coefficient of x3

Forming an Equation from the Zeros of Polynomial

The zeros of polynomial are useful to form the polynomial equation. For the given 'n' number of zeros of a polynomial, the polynomial equation of 'n' degree can be formed. There are two simple steps to form the equation from the zeros of the polynomial. First, find the factors from the zeros of the polynomial. If x = a , then (x - a) is the required factor. Secondly, find the product of these factors to find the required equation. Let us find the equation for a cubic and quadratic equation.

Cubic Equation: Let us take the roots of the polynomial equation as α, β, γ. The factors of the equation are (x - α), (x - β), (x - γ), and the required equation is (x - α)(x - β)(x - γ) = 0.

Quadratic Equation: For a quadratic equation having the two zeros of the equation as α, β, the factors are (x - α), and (x - β). And the required quadratic equation is x2 - x(α+ β) + α.β = 0.

Also, we can find the equation of higher degree polynomial, by forming the required factors, and by taking a product of the factors to form the required equation.

Representing Zeros of Polynomial on Graph

A polynomial expression of the form y = f(x) can be represented on a graph across the coordinate axis. The x value is represented on the x-axis and the f(x) or the y value is represented on the y-axis. The polynomial expression can be a linear expression, quadratic expression, or cubic expression, which is based on the degree of the polynomials. A linear expression represents a line, a quadratic equation represents a curve, and a higher degree polynomial represents a curve with uneven bends.

Zeros of a polynomial can be found from the graph by observing the points where the graph line cuts the x-axis. The x-coordinates of the points where the graph cuts the x-axis are the zeros of the polynomial.

Important Notes on Zeros of Polynomial

• The zeros of polynomial are the values of the variable for which the polynomial is equal to 0.
• We can find the zeros of polynomial by determining the x-intercepts.
• To find zeros of a quadratic polynomial, we use the quadratic formula.

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