1: Prerequisites

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In this chapter, we will review sets of numbers and properties of operations used to manipulate numbers. This understanding will serve as prerequisite knowledge throughout our study of algebra and trigonometry.

1.1: Prelude to Prerequisites
This page discusses Antarctica's harsh climate, highlighting its record low temperatures and inhospitable conditions for human life except for explorers and scientists. It also emphasizes the importance of understanding the continent's weather through mathematical concepts, including number sets and operations, which are fundamental for algebra and trigonometry.
1.2: Real Numbers - Algebra Essentials
It is often said that mathematics is the language of science. If this is true, then the language of mathematics is numbers. The earliest use of numbers occurred 100 centuries ago in the Middle East to count, or enumerate items. Because of the evolution of number systems, we can now perform complex calculations using these and other categories of real numbers. In this section, we will explore sets of numbers, calculations with different kinds of numbers, and the use of numbers in expressions.
1.3: Exponents and Scientific Notation
This page covers the rules of exponents, including product, quotient, power, zero, and negative exponent rules, essential for simplifying exponential expressions. It highlights scientific notation for managing large and small numbers, providing detailed examples and exercises for practice. The text explains how to convert numbers to and from scientific notation, performs operations with these numbers, and emphasizes maintaining correct scientific format during calculations.
1.4: Radicals and Rational Expressions
This page provides comprehensive methods for working with square roots, including evaluation, simplification, and operations such as addition and subtraction. It introduces the Pythagorean theorem, principal square roots, and rationalizing denominators. The text covers simplifying radical expressions, combining them, and using \(n^{th}\) roots along with rational exponents. Numerous examples and exercises are included to enhance understanding and reinforce concepts.
1.5: Polynomials
This page outlines key learning objectives for polynomials, including the degree, leading coefficient, and operations like addition, subtraction, and multiplication using the FOIL method. It features practical examples, such as calculating a doghouse area, and provides strategies for simplifying operations. The text covers the distributive property, perfect square trinomials, and the difference of squares, with examples and exercises included for practice and understanding.
1.6: Factoring Polynomials
The greatest common factor, or GCF, can be factored out of a polynomial. Checking for a GCF should be the first step in any factoring problem. Trinomials with leading coefficient 1 can be factored by finding numbers that have a product of the third term and a sum of the second term. Trinomials can be factored using a process called factoring by grouping. Perfect square trinomials and the difference of squares are special products and can be factored using equations.
1.7: Rational Expressions
This page covers the operations of rational expressions, including simplification, multiplication, division, addition, and subtraction. It utilizes a pastry shop cost model for explanations and emphasizes factoring and finding common denominators, particularly for combining fractions and simplifying complex expressions. Step-by-step examples and exercises are provided for practice, along with the assurance that complex rational expressions can always be simplified.

Thumbnail: A shortcut called FOIL is sometimes used to find the product of two binomials. It is called FOIL because we multiply the first terms, the outer terms, the inner terms, and then the last terms of each binomial.

Contributors

Lynn Marecek (Santa Ana College) and MaryAnne Anthony-Smith (formerly of Santa Ana College). This content produced by OpenStax and is licensed under a Creative Commons Attribution License 4.0 license.

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