Math is a life skill that is foundational for a child’s mental and cognitive development. Learning math can be daunting for kids as it involves studying various complex topics, including geometry, algebra, calculus, and more. The study of elementary algebra or algebra 1 consists of working with algebraic expressions to find viable solutions. In elementary algebra, simple variables like x and y are represented in the form of an equation. These equations are called linear equations, quadratic equations, and polynomials based on the variable’s degree.

Learning algebra signifies a cognitive milestone in a student’s math education. While math studied before algebra mainly focuses on calculations, learning algebra enables students to explore more abstract concepts.Due to math writing jobs The logical reasoning abilities developed during algebra learning promote deeper critical thinking and problem-solving skills that help students throughout their lives. Before beginning the algebra journey, students need to have some concept fluency in the following math topics.

- Arithmetic
- Multiplication Facts
- Integers
- Fractions
- Factors
- Exponents

## Arithmetic

The study of arithmetic operators begins in early grades. Kids first learn these arithmetic operators when they start to solve their 1st grade math worksheets. Without a core foundation of these fundamental operators, students won’t be able to progress in algebra. These skills are needed in algebra to perform the operations required to solve equations and simplify expressions. Besides this, learning algebra also necessitates memorizing the basic math concepts such as the times tables up to ten. It will enable students to solve algebra problems quickly, confidently, and precisely.

## Multiplication Facts

A strong foundation in multiplication tables will help in the long run for math studies. Having a strong knowledge base in multiplication facts is beneficial in solving math problems more efficiently. It relieves the tediousness in math learning due to inefficiency in multiplication fact. Many algebraic problems require a child to use critical thinking in determining where to start. This type of problem-solving approach is needed way before a calculator can be used.

## Integers

The integers refer to both negative and positive numbers; they are also known as Signed Numbers. Before starting to learn algebra, students should be comfortable performing arithmetic operations on these integers. Solving these algebraic expressions requires students to solve problems based on signed numbers quickly. For example, -4-7 or minus four minus seven.

## Fractions

Explicit conceptual knowledge of fractions is necessary for students to learn algebra. Students must understand what a fraction signifies and be able to perform arithmetic operations on fractions. The examples of fraction operations include:

- Finding a common denominator.
- Reducing to lowest terms and adding.
- Subtracting, multiplying, and dividing fractions by each other.
- Integers.

## Factors

Finding the factors of a number involves listing the integers that, when multiplied together, result in the number itself. Students beginning the study of algebra should possess the basic skills of listing all the factors of a number. For instance, they should be able to list “eight” as one, a negative one, two, negative two, four, negative four, eight, and negative eight. The primary purpose of this skill in arithmetic is to enable the execution of operations on fractions. This skill is extended in algebra outside of the realm of fractions.

## Exponents

Students beginning to learn algebra must be familiarized and comfortable with using exponential notations. They should possess the skills to evaluate problems containing exponents, such as evaluating 3^2. It is also useful for students to know the meaning of negative exponents, for example, that 3^-2 is equal to 1/9.