Welcome to Solving One-Step Equations with Fractions (Multiplication & Division), with Mrs. C! If you need help understanding how to solve one-step algebraic equations, we're here to help you out!

This video explores the intriguing world of equations, showcasing how they can lead to straightforward solutions or unexpected contradictions. Viewers are guided through solving equations with no solution, equations with one solution,...

Join Mrs. C in today’s lesson as we dive into solving *two-step algebraic equations* with ease! Whether you’re working with integers, decimals, or negatives, we’ll break each problem into simple, manageable steps so you can master this...

Join Mrs. C in today’s lesson as we dive into solving *two-step algebraic equations* with ease! Whether you’re working with integers, decimals, or negatives, we’ll break each problem into simple, manageable steps so you can master this...

In this video transcript, the process of solving an absolute value equation is explained step by step. Both solutions are then verified by substituting them back into the original equation.

You will solve for the point of intersection of two linear equation problems with two variables.

Whether you're just starting out, or need a quick refresher, this is the video for you! Mrs. C will go show you step-by-step how to subtract these mixed numbers.

Decimal numbers with an infinitely repeating sequence of digits after the decimal point can be converted into fractions. This chapter explains why.

The building blocks of all natural numbers are the prime numbers. The early Greeks invented the system still used today for separating natural numbers into prime and composite numbers.

Our modern decimal number system is base-10. Other number systems used in fields like computer engineering are base-2 (binary), base-8 (octal) and base-16 (hexadecimal).

Number systems evolved from the natural "counting" numbers, to whole numbers (with the addition of zero), to integers (with the addition of negative numbers), and beyond. These number systems are easily understood using the number line.

When working with fractions, division can be converted to multiplication by the divisor's reciprocal. This chapter explains why.

Sometimes arithmetic operations result in fractions greater than one, called "improper" fractions. An improper fraction can be converted into a "mixed number" composed of an integer plus a "proper" fraction.

Exponential expressions with divided terms can be simplified using the rules for subtracting exponents.

Any fraction can be converted into an equivalent decimal number with a sequence of digits after the decimal point, which either repeats or terminates. The reason can be understood by close examination of the number line.

Sometimes when finding a common denominator we create an unnecessarily large common denominator. This chapter explains how to find the smallest possible common denominator.

Integer exponents greater than one represent the number of copies of the base which are multiplied together. But what if the exponent is one, zero or negative? Using the rules of adding and subtracting exponents, we can see what the...

Radical expressions can often be simplified by moving factors which are perfect roots out from under the radical sign.

The commutative property is common to the operations of both addition and multiplication and is an important property of many mathematical systems.

Exponential expressions with multiplied terms can be simplified using the rules for adding exponents.

Decimal numbers with a finite number of digits after the decimal point can be easily converted into fractions. This chapter explains why.

A look at the logic behind the associative and distributive properties of multiplication.

Exponents can not only be integers and unit fractions. An exponent can be any rational number expressed as the quotient of two integers.

A humorous look at early attempts at creating number systems, leading up to our modern base-10 decimal number system which uses "positional notation". The story takes place on the fictitious island of Cocoloco.