Polynomials Class 10 Notes, Formulas and Quick Revision Guide

Polynomials is one of the most important chapters in Class 10 Maths because it connects algebraic expressions, degree, zeros, graphs, and formula-based reasoning in one place. This chapter may look short, but it is highly important for board exams because questions can come from basic definitions, degree of a polynomial, graph-based zeros, relation between zeros and coefficients, and quadratic polynomial formulas.

Many students feel comfortable with the basic examples but get confused when a question asks whether an expression is really a polynomial, how to identify the degree, how many zeros are possible, or how to use α and β formulas. That is why a good quick revision guide is very useful for this chapter.

At Deeksha Vedantu, we always encourage students to revise Polynomials conceptually. Once students understand what a polynomial really is and how zeros and coefficients are connected, the chapter becomes much easier to revise and score from.

Chapter Overview at a Glance

This quick table helps students revise the whole chapter faster.

Quick Concept Table

Topic	Key idea
Polynomial	An algebraic expression with non-negative whole number exponents
Degree	Highest power of the variable
Zero of a polynomial	A value that makes the polynomial equal to 0
Graphical zero	Point where the graph cuts or touches the x-axis
Linear polynomial	Degree 1
Quadratic polynomial	Degree 2
Cubic polynomial	Degree 3
For ax² + bx + c	α + β = -b/a and αβ = c/a

What Is a Polynomial

A polynomial is an algebraic expression made up of variables, coefficients, and exponents, where the exponents of the variables are non-negative whole numbers.

Standard Idea

A polynomial may contain:

variables such as x or y
coefficients such as 2, 5, or -3
constants such as 7 or 10

Important Rule

For an expression to be a polynomial, the exponent of the variable must be:

non-negative
a whole number

This means:

negative powers are not allowed
fractional powers are not allowed
variables in the denominator are not allowed
roots involving variables are not allowed in polynomial form

Polynomial and Non-Polynomial Examples

Students should be able to identify quickly which expressions are polynomials and which are not.

Examples of Polynomials

Expression	Is it a polynomial?	Why?
3x² – 5x + 7	Yes	Powers are 2, 1, and 0
y³ + 2y² – 4	Yes	All powers are whole and non-negative
5x² + 3x + 1	Yes	Standard quadratic polynomial
7	Yes	Constant polynomial

Examples That Are Not Polynomials

Expression	Is it a polynomial?	Why not?
2/x	No	Variable is in the denominator
√x + 5	No	Variable has fractional power
5/x²	No	Variable is in the denominator
x¹ᐟ²	No	Exponent is not a whole number
x⁻²	No	Exponent is negative

Variable, Coefficient, and Constant

Students should be clear with these basic terms.

Key Terms Table

Term	Meaning	Example from 3x² – 5x + 7
Variable	Symbol whose value can change	x
Coefficient	Number attached to the variable term	3 and -5
Constant	Term without a variable	7

Degree of a Polynomial

The degree of a polynomial is the highest exponent of the variable in the polynomial. This is one of the most frequently asked direct concepts in board exams.

Types of Polynomials by Degree

Type	Degree	Example
Constant polynomial	0	7
Linear polynomial	1	4x – 1
Quadratic polynomial	2	x² – 3x + 2
Cubic polynomial	3	2x³ + x² – 5

Important Rule

When more than one variable term is present, always look at the highest power.

For example, in x² + x + 5, the degree is 2 because the highest exponent is 2.

Types of Polynomials by Number of Terms

Students should also revise the classification by number of terms.

Types by Number of Terms Table

Type	Number of terms	Example
Monomial	1	5x²
Binomial	2	x + 3
Trinomial	3	x² – 5x + 6

Board-Style Example: Find the Degree

Find the degree of the polynomial:

5x² – 4x + 3

Solution

The variable x appears with powers 2 and 1.

The highest power is 2.

Answer

Degree = 2

Zeros of a Polynomial

A zero of a polynomial is a value of the variable that makes the polynomial equal to zero.

Simple Meaning

If p(x) is a polynomial, then x = a is called a zero if:

p(a) = 0

Examples of Zeros

Polynomial	Zero condition	Zero
2x – 3	2x – 3 = 0	x = 3/2
x – 5	x – 5 = 0	x = 5
x² – 4	x² – 4 = 0	x = 2 and x = -2

Graphical Representation of Zeros

This is one of the easiest and most important concepts in the chapter.

Rule

The number of points where the graph cuts or touches the x-axis gives the number of zeros of the polynomial.

Important Note

If the polynomial is in x, then count intersection or touching points on the x-axis only.

Number of Zeros by Degree

Type of polynomial	Maximum number of zeros
Linear polynomial	1
Quadratic polynomial	2
Cubic polynomial	3

Graph-Based Understanding of Polynomials

The shape of the graph also helps students understand the number of zeros.

Graph Summary Table

Polynomial type	Graph idea	Zeros visible on graph
Linear polynomial	Straight line	Usually 1 zero
Quadratic polynomial	Parabola	0, 1, or 2 real zeros
Cubic polynomial	Curve with turning behaviour	Up to 3 zeros

Linear, Quadratic, and Cubic Polynomials

Students should revise the three most important types carefully.

Linear Polynomial

A linear polynomial has degree 1.

General Form

ax + b, where a ≠ 0

Key Facts

Feature	Value
Degree	1
Graph	Straight line
Number of zeros	1

Quadratic Polynomial

A quadratic polynomial has degree 2.

General Form

ax² + bx + c, where a ≠ 0

Key Facts

Feature	Value
Degree	2
Graph	Parabola
Number of real zeros	0, 1, or 2

Cubic Polynomial

A cubic polynomial has degree 3.

General Form

ax³ + bx² + cx + d, where a ≠ 0

Key Facts

Feature	Value
Degree	3
Graph	Cubic curve
Maximum number of zeros	3

Relation Between Zeros and Coefficients of a Quadratic Polynomial

This is one of the most important parts of Polynomials for board exams.

If α and β are the zeros of the quadratic polynomial:

ax² + bx + c

then the following relations hold.

Main Formula Table

Concept	Formula
Sum of zeros	α + β = -b/a
Product of zeros	αβ = c/a

Students should memorise both formulas clearly.

Why These Formulas Are Important

These formulas help in:

finding the sum of roots quickly
finding the product of roots quickly
forming a quadratic polynomial from given zeros
solving board-based identity questions

Forming a Quadratic Polynomial When Zeros Are Given

If α and β are the zeros, then the quadratic polynomial with leading coefficient 1 is:

x² – (α + β)x + αβ

More generally, any non-zero constant multiple of this expression also represents a polynomial with the same zeros.

Example: Form Polynomial from Given Zeros

If the zeros are 2 and 3, form the quadratic polynomial.

Step 1: Find Sum and Product

α + β = 2 + 3 = 5
αβ = 2 × 3 = 6

Step 2: Use the Formula

x² – (α + β)x + αβ

= x² – 5x + 6

Answer

The required quadratic polynomial is:

x² – 5x + 6

Discriminant and Nature of Zeros

For a quadratic polynomial or quadratic equation:

ax² + bx + c

the discriminant is:

D = b² – 4ac

This helps us decide the nature of zeros.

Case 1: D < 0

There are no real zeros.

Case 2: D = 0

There are two real and equal zeros.

Case 3: D > 0

There are two distinct real zeros.

Discriminant Summary Table

Condition	Nature of zeros
D < 0	No real zeros
D = 0	Two real and equal zeros
D > 0	Two distinct real zeros

This is very useful in conceptual and one-mark questions.

Special Formulas Using α and β

These identities are useful for quick board revision. They become easy when students connect them with α + β and αβ.

Identity Formula Table

Formula number	Identity
Formula 1	α² + β² = (α + β)² – 2αβ
Formula 2	1/α + 1/β = (α + β)/(αβ)
Formula 3	α³ + β³ = (α + β)³ – 3αβ(α + β)
Formula 4	(α – β)² = (α + β)² – 4αβ

Board-Style Example: Find α² + β²

For the quadratic polynomial:

x² – 5x + 3 = 0

find α² + β².

Step 1: Use Relation Between Zeros and Coefficients

For x² – 5x + 3:

α + β = 5
αβ = 3

Step 2: Use the Formula

α² + β² = (α + β)² – 2αβ

= 5² – 2 × 3

= 25 – 6

= 19

Answer

α² + β² = 19

Board-Style Example: Find α⁴β³ + α³β⁴

For the polynomial:

y² – 5y + 3 = 0

find:

α⁴β³ + α³β⁴

Step 1: Factor the Expression

Take common:

α³β³(α + β)

Step 2: Use Sum and Product of Zeros

From the polynomial:

α + β = 5
αβ = 3

So:

α³β³(α + β)

= (αβ)³(α + β)

= 3³ × 5

= 27 × 5

= 135

Answer

The value is 135.

Common Board Questions from Polynomials

This chapter often produces questions from the following areas.

Board Question Types Table

Area	Common question types
Direct definition questions	what is a polynomial, which expression is a polynomial, identify variable or constant
Degree-based questions	find the degree, identify type by degree
Zero-based questions	find zeros, count zeros from graph, relate zeros to x-axis intersections
Formula-based questions	relation between zeros and coefficients, form quadratic polynomial, evaluate identities using α and β

Quick Revision Guide for Polynomials

This section is useful before exams.

Core Rules Table

Rule	What to remember
Polynomial rule	Exponents must be non-negative whole numbers
Degree rule	Degree is the highest exponent
Zero rule	A zero makes the polynomial equal to 0
Graph rule	Number of x-axis intersections or touching points gives the number of zeros
Sum of zeros	For ax² + bx + c, α + β = -b/a
Product of zeros	For ax² + bx + c, αβ = c/a

Common Mistakes Students Make in Polynomials

Common Mistakes Table

Mistake	Correct idea
Treating √x as a polynomial	It is not a polynomial because the exponent is not a whole number
Ignoring negative exponents	If the variable has a negative exponent, it is not a polynomial
Confusing degree with number of terms	Degree depends on the highest exponent, not the number of terms
Counting zeros incorrectly from graph	Count only the x-axis intersections or touching points
Forgetting signs in zero formulas	The formulas are α + β = -b/a and αβ = c/a

Best Study Strategy for Polynomials

Students can revise this chapter more effectively by following a simple sequence.

Step 1: Revise the Definition Properly

Make sure you know what is and is not a polynomial.

Step 2: Practise Degree Questions

These are easy scoring questions.

Step 3: Revise Graph Meaning of Zeros

This helps in MCQs and concept-based questions.

Step 4: Memorise Sum and Product of Zeros Formulas

These are essential for board exams.

Step 5: Solve Identity-Based Questions

Questions involving α and β become easier when students use formulas instead of expanding blindly.

Practice Questions for Students

Important Practice Questions

Which of the following is a polynomial?
Find the degree of 7x³ – 4x + 9.
How many zeros can a quadratic polynomial have?
Form a quadratic polynomial whose zeros are 4 and 5.
For x² – 6x + 8, find α + β and αβ.
If α and β are the zeros of x² – 4x + 2, find α² + β².

FAQs

Q1. What is a polynomial in Class 10 Maths?

A polynomial is an algebraic expression in which the exponents of the variables are non-negative whole numbers.

Q2. Is √x a polynomial?

No. √x is not a polynomial because its exponent becomes 1/2, which is not a whole number.

Q3. What is the degree of a polynomial?

The degree of a polynomial is the highest power of the variable in that polynomial.

Q4. What are zeros of a polynomial?

Zeros are the values of the variable that make the polynomial equal to zero.

Q5. How do we find the number of zeros from a graph?

Count the number of points where the graph intersects or touches the x-axis.

Q6. What is the relation between zeros and coefficients of a quadratic polynomial?

If α and β are the zeros of ax² + bx + c, then α + β = -b/a and αβ = c/a.

Q7. How do I form a quadratic polynomial if zeros are given?

Use the formula x² – (sum of zeros)x + product of zeros.

Q8. Why is Polynomials important for CBSE board exams?

Polynomials is important because it includes direct definitions, graph-based questions, degree-based questions, and formula-based questions that are commonly asked in board exams.

Conclusion

Polynomials is a compact but highly important Class 10 Maths chapter. It covers definitions, degree, zeros, graphical meaning, and the relationship between zeros and coefficients in a very structured way. Students who revise the chapter carefully can score well because many questions are concept-based and formula-driven rather than lengthy.

The best way to revise Polynomials is to focus first on what makes an expression a polynomial, then move to degree, zeros, graphs, and quadratic formulas. At Deeksha Vedantu, we always encourage students to revise formulas with meaning and practise standard board-style questions so that the chapter feels simple, clear, and scoring.