Algebra deals with symbols and their relationships using operators. Understanding algebra as a concept is crucial as it applies to other areas of mathematics too.
Algebra is not limited to being a mathematical concept. It is a skill we employ in our daily lives. Basic algebra plays a significant role in all other areas of mathematics, whether they are subjects you will study in the future or ones you have already learned in the past.
This article discusses the concept of algebra in Maths , its definition, examples, and its branches like basic algebra. We will also explore algebraic expressions along with the laws, operations, and identities of algebra.
What is Algebra in Math
Algebra mainly focuses on variables, which have unknown values. These variables may change. Variables are symbols like x, y, z, p, or q.
Mathematical operations like addition, subtraction, multiplication, and division are combined with variables like x, y, and z to form a meaningful equation. It follows a set of laws when performing mathematical operations. When analyzing data sets with two or more variables, the rules are used.
Linear algebra, Algebra 2 or Advanced Algebra, abstract algebra, basic algebra, and commutative algebra are some branches of algebra.
Definition of Algebra
Algebra is a branch of mathematics that deals with symbols and the rules to solve equations and it focuses on operations with variables, constants, and mathematical expressions.
Branches of Algebra
The usage of several Algebraic expressions reduces the complexity of Algebra. The various branches of Algebra based on the use and complexity of the expressions are as such:
Pre Algebra
Elementary Algebra
Abstract Algebra
Universal Algebra
Linear Algebra
Commutative AlgebraÂ
Pre Algebra
It includes the fundamental concepts of arithmetic and algebra, such as the order of operations, basic operations with numbers, and simplifying expressions. Algebra assists in turning day-to-day problems into mathematical expressions that use algebraic techniques and algebraic expressions. Pre-algebra specifically involves creating an algebraic expression for the provided problem statement.
Algebra 1 or Elementary Algebra
The goal of elementary Algebra is to find a solution by resolving Algebraic expressions. Simple variables like x and y are expressed as equations in elementary Algebra. The equations are divided into polynomials, quadratic equations, or linear equations depending on the degree of the variable. The formulas for linear equations are ax + b = c, ax+ by + c = 0, and ax + by + cz + d = 0. Based on the number of variables, quadratic equations, and polynomials are subsets of Elementary Algebra. For a polynomial problem, the typical form of representation is ax n + bx n-1 + cx n-2 +…..k = 0, while for a quadratic equation, it is ax 2 + bx + c = 0.
Abstract AlgebraÂ
It is a branch of mathematics that focuses on Algebraic systems like groups, rings, fields, and modules, rather than on specific numerical computations. In abstract Algebra, we do not study specific operations like addition and multiplication but instead study general properties of basic operations, such as associativity, commutativity, distributivity, and the existence of inverses. Â Groups, sets, modules, rings, lattices, vector spaces, and other Algebraic structures are studied in abstract Algebra.Â
Universal Algebra
Universal Algebra can be used to explain all other mathematical forms using Algebraic expressions in coordinate geometry, calculus, and trigonometry. In each of these areas, universal Algebra focuses on equations rather than Algebraic models. You can think of all other types of Algebra as being a subset of universal Algebra. Any real-world issue can be categorized into a particular discipline of mathematics and solved using abstract Algebra.
Linear AlgebraÂ
Linear algebra, a branch of algebra, finds uses in both pure and practical mathematics. It deals with the linear mappings of the vector spaces. It also involves learning about lines and planes. It is the study of linear systems of equations with transformational features. It is used in almost all areas of mathematics. It deals with the representation of linear equations for linear functions in matrices and vector spaces.
Commutative AlgebraÂ
Commutative algebra is one of the types of algebra that studies commutative rings and their ideals. Both algebraic geometry and algebraic number theory require commutative algebra. Rings of algebraic integers, polynomial rings, and other rings are all present. Numerous other areas of mathematics, such as differential topology, invariant theory, order theory, and generic topology, make use of commutative algebra.Â
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Algebraic Expressions and Examples
Algebraic Expressions consist of constants and variables. We can add, subtract, multiply, and divide these expressions.
An example of an algebraic expression is 5x + 6 . The variables might also have values like x 2 , x 3 , x n , xy, x 2 y, etc.
Polynomials is also a term used for algebraic expressions. An equation that contains coefficients, non-negative integer exponents of variables, and variables is called a polynomial. For example, 5x 3 + 4x 2 + 7x + 2 = 0.
Read more:
Algebraic ExpressionsÂ
Algebraic Expressions
Algebraic Equations
An algebraic equation shows the connection between two quantities when one or both of the values are unknown.
Given below are the different types of Algebraic equations, based on the degree of the variable:
Linear Equations
Quadratic Equations
Cubic Equations
Linear EquationsÂ
A linear equation is an equation in which the highest power of a variable is 1. They are also known as first-order equations. A linear equation is an equation for a straight line when seen in the coordinate system. The straight-line equation is written as y = mx + b, where m denotes the line’s slope and b denotes the y-intercept.Â
linear equation
Following are the topics that discuss linear equations deeply:
Standard Algebraic Identities
Algebraic expressions
Like and Unlike Algebraic Terms
Mathematical Operations on Algebraic Expressions
Standard Algebraic Identities
Factorization
Introduction to factorization
Division of Algebraic Expressions
Linear Equations in One Variable
Solve Linear Equations with Variables on Both Sides
Solving Equations that have Linear Expressions on one Side and Numbers on the other Side
Reducing Equations to Simpler Form
Linear Equations and their solutions
Graph of Linear Equations in Two Variables
Equations of Lines Parallel to the X-axis and Y-axis
Pair of Linear Equations in Two Variables
Number of Solutions to a System of Equations Algebraically
Graphical Methods of Solving a Pair of Linear Equations
Algebraic Methods of Solving a Pair of Linear Equations
Equation Reducible to a Pair of linear equations in two variables
Quadratic Equations
A quadratic equation is a type of algebraic equation that contains one or more terms in which the variable is raised to the power of 2 (i.e., a quadratic term). It is an equation of the form ax 2 + bx + c = 0, where a, b, and c are constants and x is the variable.
Quadratic Equation
Here are the topics that discuss quadratic equations thoroughly.
Quadratic Equations
Solution of a Quadratic equation by different methods
Roots of a Quadratic Equation
Complex Numbers
Algebra of Real Functions
Algebraic Operations on Complex Numbers
Argand plane and polar representation
Absolute Value of a Complex Number
Imaginary Numbers
Complex Conjugate
Compound Inequalities
Algebraic Solutions of Linear Inequalities in One Variable and Their Graphical Representation
Graphical Solution of Linear Inequalities in Two Variables
Solving Linear Inequalities Word Problems
Fundamental Principle of Counting
Cubic EquationsÂ
A three-degree equation, or a cubic equation, has a variable whose maximum power is 3. A cubic equation has the general form ax 3 + bx 2 + cx + d = 0.
where x is a variable and a, b, c, and d are constants. A cubic equation can have one, two, or three solutions that are real or complex numbers, depending on the coefficients in the equation.
Cubic Equation
PolynomialsÂ
Polynomials are made by variables and coefficients, which are Algebraic expressions. Indeterminate is another name for variables. For polynomials, we can perform addition, subtraction, multiplication, and positive integer exponents, but not division by variable. For ex: 3x 3 -5x+8 .
Following are the topics that discuss polynomials deeply:
Polynomials in One Variable
Zeroes of a polynomial
Remainder Theorem
Types of Polynomials
Multiplying Polynomials
Algebraic Identities of Polynomials
Geometrical meaning of the Zeroes of polynomial
Relationship between Zeroes and coefficients of a polynomial
Division Algorithm for polynomials
Division Algorithm Problems and Solutions
Sequence and Series
An ordered collection of numbers or other elements of mathematics that follow a pattern or rule is called a sequence. The position of each term of a sequence within the sequence is marked by its index or subscript. The series of even numbers, for example, can be written as 2, 4, 6, 8, 10, and so on.
The total of a sequence’s terms forms a series. For instance, the series 2 + 4 + 6 +… + 2n gives the sum of the first n terms of the even number sequence. Series may be finite or infinite.
Sequence and Series can be classified into two major categories – Arithmetic Progression and Geometric Progression.Â
Arithmetic ProgressionÂ
Arithmetic Progression(A.P) is a series of numbers where each term is obtained by adding a constant /fixed value to the previous term. This continuous difference in the terms is denoted by ‘d’. The general format of an A.P is:
a, a + d, a + 2d, a + 3d, …, a + nd
where a is the first term, d is a common difference, and n is the number of terms.
Geometric Progression
Geometric Progression(G.P) is a series of numbers where each term is obtained by multiplying the preceding term by a fixed constant value called the common ratio, denoted by r.
The general form of a geometric progression is:
a, ar, ar 2 , ar 3 , …, ar n
where a is the first term, r is the common ratio, and n is the number of terms.
Given is the list of topics that will give you a better understanding of sequence and series.Â
Common difference and Nth term
A sum of First n Terms
Binomial Theorem for positive integral indices
Pascal’s Triangle
Introduction to Sequences and Series
General and Middle Terms – Binomial Theorem
Arithmetic Series
Arithmetic Sequences
Geometric Sequence and Series
Geometric Series
Arithmetic Progression and Geometric Progression
Special Series
ExponentsÂ
Exponent is a mathematical operation, written as a n where a is the base and n is the power or the exponent. Exponents help us simplify Algebraic expressions. Exponent can be represented in the formÂ
a n = a*a*a*….n times.Â
LogarithmsÂ
The Algebraic opposite of exponents is the logarithm. It is practical to simplify complicated Algebraic formulas using logarithms. The exponential form denoted by the formula a x = n can be converted to logarithmic form by using the formula log a n = x.Â
In 1614, John Napier discovered logarithms. Nowadays, logarithms are a crucial component of modern mathematics.
Visit Logarithms to learn all about the topic.
Set Theory
Set theory is a branch of mathematical logic that investigates sets, which are arrays of objects informally. The term “set” refers to a well-defined group of unique items that are used to express Algebraic variables. Sets are used to depict the collection of important elements in a group. Sets can be expressed in set-builder or roster form. Sets are usually denoted by curly braces;{} for example, A = {1,2,3,4} is a collection. Let’s learn more about the sets in the following articles:
Sets and their representations
Different kinds of Sets
Subsets, Power Sets, and Universal Sets
Venn Diagrams
Operations on Sets
Union and Intersection of sets
Cartesian Product of Sets
Vectors
One of the most important aspects of Algebra is vector Algebra. It is a course that focuses on the Algebra of vector quantities. As we all know, there are two kinds of measurable quantities: scalars and vectors. The magnitude of a scalar quantity is the only thing that matters, while the magnitude and direction of a vector quantity are also essential. A vector is a two-dimensional object of both magnitude and direction. It is normally represented by an arrow with a length (→) that indicates the magnitude and direction. It is denoted by the letter V. The vector’s magnitude is denoted by the letter |V|. Let’s discuss the vector and its Algebra in the following articles:
Vector Algebra
Dot and Cross Product of two vectors
How to Find the Angle Between Two Vectors?
Section Formula
Relations and Functions
The most significant subjects in mathematics are “Relations and Functions.” Relations and functions are two distinct terms that have different mathematical interpretations. One might be puzzled by the differences between them. Before we go even further, let’s look at a clear example of the differences between the two. An ordered pair is represented as (INPUT, OUTPUT): The relation shows the relationship between INPUT and OUTPUT. Whereas, a function is a relation that derives one OUTPUT for each given INPUT. Let’s discuss more of the topic in the following articles:
Relations and functions
Types of Functions
Composite functions
Invertible Functions
Composition of Functions
Inverse Functions
Verifying Inverse Functions by Composition
Introduction to Domain and Range
Piecewise Function
Range of a Function
Matrices and Determinants
In linear Algebra, determinants, and matrices are used to solve linear equations by applying Cramer’s law to a series of non-homogeneous linear equations. Only square matrices are used to measure determinants. While a matrix’s determinant is empty, it’s known as a singular determinant, and when its determinant is one, it’s known as unimodular. The determinant of the matrix must be nonsingular, that is, its value must be nonzero, for the set of equations to have a unique solution. Let us look at the definitions of determinants and matrices, as well as the various forms of matrices and their properties, using examples in the following articles:
Matrices and their Types
Mathematical Operations on Matrices
Properties of Matrix Addition and Scalar Multiplication
How to Multiply Matrices
Transpose of a matrix
Symmetric and Skew Symmetric Matrices
Elementary Operations on Matrices
Inverse of a Matrix by Elementary Operations
Invertible Matrices
Determinants
Properties of Determinants
Area of a Triangle using Determinants
Minors and Cofactors
Adjoint of a Matrix
Application of Determinants and Matrices
Permutations and Combinations
Permutation and Combination are methods for representing a collection of objects by choosing them from a list and dividing them into subsets. It specifies the different methods for organizing a set of data. Permutations are used to choose data or events from a group, while combinations are used to represent the order in which they are represented. Let’s discuss them intensely in the following articles:
Permutation
Combinations
Mathematical Induction
For every natural number n, mathematical induction is a technique for proving a proposition, hypothesis, or formula that is assumed to be valid. The ‘Principle of Mathematical Induction is a generalization of this that we can use to prove any mathematical statement. Therefore, let’s learn more about it in the following articles:
Principle of Mathematical Induction
Conditional Statements & Implications
Validating Statements
Algebraic Operations
There are four basic mathematical operations that are used in Algebra. These are addition, subtraction, multiplication, and Division. These are discussed below:
Addition: The summation of two or more algebraic terms is done in Addition. The addition of algebraic terms is indicated by “+” symbol. The addition of algebraic terms to yield a single value is only possible if there are like algebraic terms else the expression remains as it is. For Example, 3x 2 y + 5x 2 y = 8x 2 y as 3x 2 y and 5x 2 y are like algebraic terms while if we add 3xy 2 and 5x 2 y then it will not yield a single value instead it will remain as it is i.e. 3xy 2 + 5x 2 y.
Subtraction: The method of finding the difference between two algebraic terms is called Subtraction of Algebraic terms. Subtraction of algebraic terms is indicated by “-” terms. Like Addition, Subtraction is also possible only between the like algebraic terms. For example, if we subtract 3x 2 y from 5x 2 y it will give a difference as 5x 2 y – 3x 2 y = 2x 2 y. But if subtract 3xy 2 from 5x 2 y it will not yield a single value as the two terms are unlike. Hence, the difference will be written as 5x 2 y – 3xy 2 .
Multiplication: Unlike Addition and Subtraction, Multiplication is possible between both like and unlike terms. Multiplication of algebraic terms is indicated by “⨯” or (a)(b). While performing the multiplication of algebraic terms, multiply the numerical coefficient as normal numbers and multiply the variables using the laws of exponents. For Example, if we multiply 4x 2 y with 5xyz then the product is given as (4x 2 y)(5xyz) = 20x 3 y 2 z.
Division: Like Multiplication, Division of algebraic terms is possible between both like and unlike terms while keeping in mind the laws of exponents for variables and normal division for numbers. The division between algebraic terms is indicated by the “/” symbol. For Example, the division of 6x 2 y 2 by 3xy 2 is given as 6x 2 y 2 /3xy 2 = 2x.
Algebraic Laws
Algebraic Laws or Properties include Closure, Commutative, Associative, Distributive, and Identity Properties. These properties are defined for basic algebraic operations such as Addition, Subtraction, Multiplication, and Division. A picture explaining algebraic laws has been attached below:
Algebraic Identities
Algebraic Identities are the expansion of terms of algebraic terms given as whole square or whole cube generally. These expansions help us to quickly solve the problems. Some of the commonly used algebraic identities are mentioned below:
(a + b) 2 = a 2 + 2ab +b 2
(a – b) 2 = a 2 – 2ab + b 2
a 2 – b 2 = (a + b)(a – b)
(a + b) 3 = a 3 + b 3 + 3a 2 b + 3ab 2
(a – b) 3 = a 3 – b 3 – 3a 2 b + 3ab 2
Conclusion- Maths Algebra
In this article, we learned about the concept of algebra in Maths , its definition, examples, and its branches like basic algebra. We also explored algebraic expressions along with the laws, operations, and identities of algebra and the applications of algebra to help students have a better understanding of the principles of Algebraic equations.
Solved Examples on Algebra
Here we have provided some solved examples on algebra for your better understanding.
Example 1: Solve  3e x + 6 = 120
Solution:
Given,
3e x + 6 = 120
3e x = 120 – 6
3e x = 114
e x = 114/3
e x = 38
x = ln 38
Example 2: Solve for the value of y: 2(4-y)-3(y+3)=11
Solution:
 2(4-y) -3(y+3)=11
8-2y-3y-9=11
-5y-1=-11
-5y-1+1=-11+1
-5y=-10
Dividing both the sides by -5,Â
-5y/-5=-10/-5
y=2
Example 3: Evaluate (2.3a 5 b 2 ) × (1.2a 2 b 2 ) when a = 1 and b = 0.5
Solution:
Let us simplify the given expression
=2.3a 5 b 2  × 1.2a 2 b 2
=2.3 × 1.2 × a 5  × a 2  × b 2  × b 2
=2.76 × a 5+2  × b 2+2
=2.76a 7 b 4
Now let us substitute when, a = 1 and b = 0.5
For 2.76 a 7 Â b 4
=2.76 (1) 7 Â (0.5) 4
=2.76 × 1 × 0.0025
=0.1725
=6.9/40
Example 4: (2x-1)/3 – (6x-2)/5 = 1/3
Solution:
We have,
(2x-1)/3 – (6x-2)/5 = 1/3
By taking LCM for 3 and 5, which is 15
((2x-1)×5)/15 – ((6x-2)×3)/15 = 1/3
(10x – 5)/15 – (18x – 6)/15 = 1/3
(10x – 5 – 18x + 6)/15 = 1/3
(-8x + 1)/15 = 1/3
By using cross-multiplication, we get,
(-8x + 1)3 = 15
-24x + 3 = 15
-24x = 15 – 3
-24x = 12
x = -12/24
= -1/2
∴ x = -1/2
Verification
LHS = (2x – 1)/3 – (6x – 2)/5
= [2(-1/2) – 1]/3 – [6(-1/2) – 2]/5
= (- 1 – 1)/3 – (-3 – 2)/5
= – 2/3 – (-5/5)
= -2/3 + 1
= (-2 + 3)/3
= 1/3
RHS
Example 5: Find a number such that when 5 is subtracted from 5 times that number, the result is 4, more than twice the number.
Solution:
Let us consider the number as ‘x’
Then, five times the number will be 5x
And, two times, the number will be 2x
So,
5x – 5 = 2x + 4
5x – 2x = 5 + 4
3x = 9
x = 9/3
x = 3
∴ The number is 3.
FAQs on AlgebraÂ
Q1. What is Algebra in Maths?
 Algebra is the area of mathematics that deals with the representation of mathematical statements as solutions to problems. To create a meaningful mathematical expression, it takes variables like x, y, and z together with mathematical operations like addition, subtraction, multiplication, and division.
Q2. What are the branches of Algebra?
The branches of Algebra are –
Pre Algebra
Elementary Algebra
Abstract Algebra
Universal Algebra
Linear Algebra
Commutative AlgebraÂ
Q3. Why are students required to learn Algebra?
Algebra is important for students to study because it develops problem-solving abilities, prepares them for higher-level arithmetic, helps in understanding and analyzing real-world problems, and has applications in a wide range of professions, including science, engineering, economics, and finance. A lot of college majors and jobs also require Algebra.
Q4. What is the highest level of Algebra?
Calculus, trigonometry, and three-dimensional geometry are just a few of the difficult math topics covered in the highest level of Algebra. In this case, Algebra represents complex problems and finds their answers.
Q5. What are the basic operations in Algebra?
The basic operations performed in Algebra include addition, subtraction, multiplication, and division of Algebraic equations and solving the equations.Â
Q6. What is the definition of Algebra?
Algebra is a branch of mathematics that deals with symbols and the rules to solve equations and it focuses on operations with variables, constants, and mathematical expressions.
Q7. What is the meaning of Algebra?
The word Algebra is derived from an Arabic word, ‘Al-jabr’ which means the ‘reunion of broken parts’. So, the meaning of Algebra is finding the unknown .
Q8. What is Abstract Algebra?
Abstract algebra, or modern algebra is the study of algebraic structures including groups, rings, fields, modules, vector spaces, lattices, and algebras.
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Last Updated :
13 Dec, 2023
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