Use the following Media4Math resources with this Illustrative Math lesson.
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Math Video Definitions Collection: Rationals and Radicals | OverviewThis collection aggregates all the video definitions around the topic of Rationals and Radicals. There are a total of 47 videos. This collection of resources is made up of downloadable MP4 files that you can easily incorporate into a presentation.
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Rational Functions and Equations, Radical Expressions, Radical Functions and Equations and Rational Expressions | |
VIDEO: Algebra Applications: Rational Functions | VIDEO: Algebra Applications: Rational Functions
In this episode of Algebra Applications, students explore various scenarios that can be explained through the use of rational functions. Such disparate phenomena as submarines, photography, and the appearance of certain organisms can be explained through rational function models. This is part of a collection of videos from the Algebra Applications video series on the topic of Rational Functions. |
Rational Expressions and Rational Functions and Equations | |
Closed Captioned Video: Algebra Applications: Rational Functions | Closed Captioned Video: Algebra Applications: Rational Functions
In this episode of Algebra Applications, students explore various scenarios that can be explained through the use of rational functions. Such disparate phenomena as submarines, photography, and the appearance of certain organisms can be explained through rational function models. |
Rational Expressions and Rational Functions and Equations | |
Closed Captioned Video: Algebra Applications: Rational Functions, 1 | Closed Captioned Video: Algebra Applications: Rational Functions, Segment 1: Submarines
In spite of their massive size, submarines are precision instruments. A submarine must withstand large amounts of water pressure; otherwise, a serious breach can occur. Rational functions are used to study the relationship between water pressure and volume. Students graph rational functions to study the forces at work with a submarine. |
Rational Expressions and Rational Functions and Equations | |
Closed Captioned Video: Algebra Applications: Rational Functions, 2 | Closed Captioned Video: Algebra Applications: Rational Functions, Segment 2: Biology
All living things take up a certain amount of space, and therefore have volume. They also have a certain amount of surface area. The ratio of surface area to volume, which is a rational function, reveals important information about the organism. Students look at different graphs of these functions for different organisms. |
Rational Expressions and Rational Functions and Equations | |
Closed Captioned Video: Algebra Applications: Rational Functions, 3 | Closed Captioned Video: Algebra Applications: Rational Functions, Segment 3: Hubble Telescope
The Hubble Telescope has transformed how we view the universe. We learn about the lens formula and how it is used in the construction of telescopes. |
Rational Expressions and Rational Functions and Equations | |
Closed Captioned Video: Algebra Nspirations: Rational Functions | Closed Captioned Video: Algebra Nspirations: Rational Functions and Expressions
After briefly reviewing the concept of inverse variation, this video explores Boyle’s law, a real world example of an inversely proportional relationship between pressure and volume of a gas. Written and hosted by internationally acclaimed math educator Dr. Monica Neagoy, it goes on to examine similarities and differences among rational functions and numbers. Finally, it takes a look at rational functions graphs and ends with a delightful example merging Euclidean and analytic geometry, thanks to the TI-Nspire technology. Concepts explored: functions, rational expressions, rational functions, asymptotes |
Rational Expressions and Rational Functions and Equations | |
Closed Captioned Video: Algebra Nspirations: Rational Functions, 1 | Closed Captioned Video: Algebra Nspirations: Rational Functions and Expressions, Segment 1
In this Investigation we look at an application of rational functions: Boyle's Law. This video is Segment 1 of a 4 segment series related to Algebra Nspirations: Rational Functions and Expressions. Segments 1 and 2 are grouped together. |
Rational Expressions and Rational Functions and Equations | |
Closed Captioned Video: Algebra Nspirations: Rational Functions, 3 | Closed Captioned Video: Algebra Nspirations: Rational Functions and Expressions, Segment 3
In this Investigation we look at graphs of rational functions. This video is Segment 3 of a 4 segment series related to Algebra Nspirations: Rational Functions and Expressions. Segments 3 and 4 are grouped together. |
Rational Expressions and Rational Functions and Equations | |
Closed Captioned Video: Exp Rational Functions | Closed Captioned Video: Exp Rational Functions
In this TI Nspire tutorial, the Graph window is used to create a slider-based graph of a rational function. This video supports the TI-Nspire Clickpad and Touchpad. This Mini-Tutorial Video includes a worksheet. . |
Rational Functions and Equations | |
Closed Captioned Video: Rational Numbers: Adding Rational Numbers | Closed Captioned Video: Rational Numbers: Adding Rational Numbers
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Closed Captioned Video: Rational Numbers: Comparing and Ordering Rational Numbers | Closed Captioned Video: Rational Numbers: Comparing and Ordering Rational Numbers
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Closed Captioned Video: Rational Numbers: Dividing Rational Numbers | Closed Captioned Video: Rational Numbers: Dividing Rational Numbers
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Closed Captioned Video: Rational Numbers: Multiplying Rational Numbers | Closed Captioned Video: Rational Numbers: Multiplying Rational Numbers
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Closed Captioned Video: Rational Numbers: Numerical Expressions with Rational Numbers | Closed Captioned Video: Rational Numbers: Numerical Expressions with Rational Numbers
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Closed Captioned Video: Rational Numbers: Rational Numbers and Absolute Value | Closed Captioned Video: Rational Numbers: Rational Numbers and Absolute Value
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Closed Captioned Video: Rational Numbers: Rational Numbers and Exponents | Closed Captioned Video: Rational Numbers: Rational Numbers and Exponents
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Closed Captioned Video: Rational Numbers: Rational Numbers and Irrational Numbers | Closed Captioned Video: Rational Numbers: Rational Numbers and Irrational Numbers
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Closed Captioned Video: Rational Numbers: Rational Numbers on a Number Line | Closed Captioned Video: Rational Numbers: Rational Numbers on a Number Line
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Closed Captioned Video: Rational Numbers: Rational Numbers on the Cartesian Coordinate System | Closed Captioned Video: Rational Numbers: Rational Numbers on the Cartesian Coordinate System
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Closed Captioned Video: Rational Numbers: Subtracting Rational Numbers | Closed Captioned Video: Rational Numbers: Subtracting Rational Numbers
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Closed Captioned Video: Rational Numbers: Variable Expressions with Rational Numbers | Closed Captioned Video: Rational Numbers: Variable Expressions with Rational Numbers
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Closed Captioned Video: Rational Numbers: What Are Rational Numbers? | Closed Captioned Video: Rational Numbers: What Are Rational Numbers?
This is part of a collection of video tutorials on the topic of Rational Numbers. This includes defining rational numbers, rational number operations, comparing and ordering rational numbers, and applications of rational numbers. —PRESS PREVIEW TO SEE THE VIDEO TUTORIAL— To see the complete collection of these videos on fractions, click on this link.The following section includes background information on rational numbers. Refer to this section as you view the videos, or as review material afterward. |
Rational Expressions | |
Definition--Financial Literacy--Bitcoin | BitcoinTopicFinancial Literacy DefinitionBitcoin is a decentralized digital currency that operates without a central bank or single administrator. |
Numerical and Algebraic Expressions | |
Definition--Financial Literacy--Cryptocurrency | CryptocurrencyTopicFinancial Literacy DefinitionCryptocurrency is a digital or virtual currency that uses cryptography for security and operates independently of a central bank. |
Numerical and Algebraic Expressions | |
Definition--Financial Literacy--Currency | CurrencyTopicFinancial Literacy DefinitionCurrency is a system of money in general use in a particular country. |
Numerical and Algebraic Expressions | |
Definition--Financial Literacy--Money | MoneyTopicFinancial Literacy DefinitionMoney is a medium of exchange that allows people to trade goods and services efficiently. DescriptionMoney is foundational to modern economies, facilitating transactions and measuring value. Understanding the concept of money helps individuals comprehend its role in everyday life and financial systems. In real-world applications, money is used to price goods, pay for services, and store value. In math education, money introduces students to basic arithmetic, currency conversion, and economic principles. A teacher might explain, "Money is what we use to buy things and pay for services, making it easier to trade than bartering." |
Numerical and Algebraic Expressions | |
Definition--Rationals and Radicals--Asymptotes for a Rational Function | Asymptotes for a Rational FunctionTopicRationals and Radicals DefinitionAn asymptote is a line that a graph approaches but never touches. DescriptionAsymptotes are significant in the study of Rational Numbers, Expressions, Equations, and Functions. They help in understanding the behavior of graphs of rational functions, particularly as the values of the variables approach certain limits. Horizontal asymptotes indicate the value that the function approaches as the input grows infinitely large or small. Vertical asymptotes show the values that the function cannot take because they cause division by zero. |
Rational Functions and Equations | |
Definition--Rationals and Radicals--Conjugate of a Radical | Conjugate of a RadicalTopicRationals and Radicals DefinitionThe conjugate of a radical expression is obtained by changing the sign between two terms in a binomial. DescriptionIn the context of Radical Numbers, Expressions, Equations, and Functions, the concept of conjugates is essential for simplifying expressions. When dealing with radicals, particularly in the denominator, multiplying by the conjugate can help to rationalize the expression. This process eliminates the radical from the denominator, making the expression easier to work with. |
Radical Expressions | |
Definition--Rationals and Radicals--Cube Root | Cube RootTopicRationals and Radicals DefinitionThe cube root of a number is a value that, when multiplied by itself three times, gives the original number. DescriptionThe cube root is a fundamental concept in Radical Numbers, Expressions, Equations, and Functions. It is the inverse operation of raising a number to the power of three. Understanding cube roots is crucial for solving equations involving cubic terms and for simplifying radical expressions. Cube roots also appear in various real-world applications, such as calculating volumes and in certain physics equations. They are an integral part of higher-level mathematics, including algebra and calculus. |
Radical Expressions | |
Definition--Rationals and Radicals--Extraneous Solution | Extraneous SolutionTopicRationals and Radicals DefinitionAn extraneous solution is a solution derived from an equation that is not a valid solution to the original equation. DescriptionExtraneous solutions often arise in the context of Rational and Radical Equations. They are solutions that appear during the process of solving an equation but do not satisfy the original equation. This can happen when both sides of an equation are squared or when other operations introduce additional solutions. |
Rational Functions and Equations | |
Definition--Rationals and Radicals--Factoring a Radical | Factoring a RadicalTopicRationals and Radicals DefinitionFactoring a radical involves expressing it as a product of simpler expressions. DescriptionFactoring radicals is a key technique in the study of Radical Numbers, Expressions, Equations, and Functions. It simplifies complex radical expressions, making them easier to work with. This process is essential for solving equations and for performing algebraic manipulations involving radicals. Understanding how to factor radicals is also important for simplifying expressions in calculus and higher-level mathematics. It helps in breaking down complex problems into more manageable parts. |
Radical Functions and Equations | |
Definition--Rationals and Radicals--Fourth Root | Fourth RootTopicRationals and Radicals DefinitionThe fourth root of a number is a value that, when raised to the power of four, gives the original number. DescriptionThe fourth root is an important concept in Radical Numbers, Expressions, Equations, and Functions. It is the inverse operation of raising a number to the power of four. Understanding fourth roots is crucial for solving higher-degree equations and for simplifying radical expressions. Fourth roots are also relevant in various scientific and engineering applications where higher-degree roots are required. They are a part of advanced mathematical studies, including algebra and calculus. |
Radical Expressions | |
Definition--Rationals and Radicals--Geometric Mean | Geometric MeanTopicRationals and Radicals DefinitionThe geometric mean of two numbers is the square root of their product. DescriptionThe geometric mean is an example of using radical expressions to solve a problem. It provides a measure of central tendency that is particularly useful in situations where the numbers are multiplied together rather than added. In geometry, the geometric mean appears in various theorems and constructions. It is also used in finance and statistics to calculate average growth rates and to compare different sets of data. |
Radical Expressions | |
Definition--Rationals and Radicals--Graphs of Radical Functions | Graphs of Radical FunctionsTopicRationals and Radicals DefinitionGraphs of radical functions are visual representations of equations involving radicals. DescriptionGraphs of radical functions are crucial in the study of Radical Numbers, Expressions, Equations, and Functions. They provide a visual understanding of how these functions behave, including their domains, ranges, and key features such as intercepts and asymptotes. |
Radical Functions and Equations | |
Definition--Rationals and Radicals--Graphs of Rational Functions | Graphs of Rational FunctionsTopicRationals and Radicals DefinitionGraphs of rational functions are visual representations of equations involving rational expressions. DescriptionGraphs of rational functions are fundamental in the study of Rational Numbers, Expressions, Equations, and Functions. They help in understanding the behavior of these functions, including their asymptotes, intercepts, and regions of increase and decrease. |
Rational Functions and Equations | |
Definition--Rationals and Radicals--Horizontal Asymptote | Horizontal AsymptoteTopicRationals and Radicals DefinitionA horizontal asymptote is a horizontal line that a rational function graph approaches as the input values become very large or very small. DescriptionHorizontal asymptotes are an important concept in the study of Rational Numbers, Expressions, Equations, and Functions. They indicate the value that a function approaches as the input grows infinitely large or small. Understanding horizontal asymptotes is crucial for graphing rational functions accurately and for analyzing their long-term behavior. |
Rational Functions and Equations | |
Definition--Rationals and Radicals--Inverse Variation | Inverse VariationTopicRationals and Radicals DefinitionInverse variation describes a relationship between two variables in which the product is a constant. When one variable increases, the other decreases proportionally. |
Rational Functions and Equations | |
Definition--Rationals and Radicals--Irrational Number | Irrational NumberTopicRationals and Radicals DefinitionAn irrational number is a number that cannot be expressed as a ratio of two integers. Its decimal form is non-repeating and non-terminating. |
Rational Expressions | |
Definition--Rationals and Radicals--Irrational Number 2 | Irrational Number 2TopicRationals and Radicals DefinitionAn irrational number is a number that cannot be expressed as a ratio of two integers. Its decimal form is non-repeating and non-terminating. |
Rational Expressions | |
Definition--Rationals and Radicals--Laws of Rational Exponents | Laws of Rational ExponentsTopicRationals and Radicals DefinitionThe laws of rational exponents describe how to handle exponents that are fractions, including rules for multiplication, division, and raising a power to a power. DescriptionThe Laws of Rational Exponents are vital in the study of Rational Numbers, Expressions, Equations, and Functions. These laws provide a framework for simplifying expressions involving exponents that are fractions. For example, the law $$a^{m/n} = \sqrt[n]{a^m}$$ |
Rational Expressions | |
Definition--Rationals and Radicals--nth Root | nth RootTopicRationals and Radicals DefinitionThe nth root of a number is a value that, when raised to the power of n, gives the original number. It is denoted as $$\sqrt[n]{a}$$ DescriptionThe nth Root is a fundamental concept in the study of Radical Numbers, Expressions, Equations, and Functions. It generalizes the idea of square roots and cube roots to any positive integer n. For example, the cube root of 8 is 2 because $$2^3 = 8$$ |
Radical Expressions | |
Definition--Rationals and Radicals--Oblique Asymptote | Oblique AsymptoteTopicRationals and Radicals DefinitionAn oblique asymptote is a diagonal line that the graph of a function approaches as the input values become very large or very small. DescriptionOblique Asymptotes are important in the study of Rational Numbers, Expressions, Equations, and Functions. They occur in rational functions where the degree of the numerator is one more than the degree of the denominator. For example, the function $$f(x) = \frac{x^2 + 1}{x}$$ |
Rational Functions and Equations | |
Definition--Rationals and Radicals--Partial Fraction Decomposition of a Rational Expression | Partial Fraction Decomposition of a Rational ExpressionTopicRationals and Radicals DefinitionPartial fraction decomposition is a method used to express a rational expression as a sum of simpler fractions. DescriptionPartial Fraction Decomposition is a powerful tool in the study of Rational Numbers, Expressions, Equations, and Functions. It involves breaking down a complex rational expression into a sum of simpler fractions, which are easier to integrate or differentiate. For example, the rational function $$\frac{2x+3}{(x+1)(x-2)}$$ can be decomposed into |
Rational Expressions | |
Definition--Rationals and Radicals--Radical Equations | Radical EquationsTopicRationals and Radicals DefinitionRadical equations are equations in which the variable is inside a radical, such as a square root or cube root. DescriptionRadical Equations are a fundamental aspect of Radical Numbers, Expressions, Equations, and Functions. These equations involve variables within radical signs, such as square roots or cube roots. Solving radical equations typically requires isolating the radical on one side of the equation and then squaring both sides to eliminate the radical. For example, to solve $$\sqrt{x+3} = 5$$ one would square both sides to obtain $$x + 3 = 25$$ |
Radical Functions and Equations | |
Definition--Rationals and Radicals--Radical Expression | Radical ExpressionTopicRationals and Radicals DefinitionA radical expression is an expression that contains a radical symbol, which indicates the root of a number. DescriptionRadical Expressions are a core component of Radical Numbers, Expressions, Equations, and Functions. These expressions involve roots, such as square roots, cube roots, or higher-order roots, and are denoted by the radical symbol (√). For example, the expression $$\sqrt{16}$$ |
Radical Expressions | |
Definition--Rationals and Radicals--Radical Function | Radical FunctionTopicRationals and Radicals DefinitionA radical function is a function that contains a radical expression with the independent variable in the radicand. DescriptionRadical Functions are a vital part of Radical Numbers, Expressions, Equations, and Functions. These functions involve radicals, such as square roots or cube roots, with the independent variable inside the radical. For example, the function $$f(x) = \sqrt{x}$$ |
Radical Expressions | |
Definition--Rationals and Radicals--Radical Symbol | Radical SymbolTopicRationals and Radicals DefinitionThe radical symbol (√) is used to denote the root of a number, such as a square root or cube root. DescriptionThe Radical Symbol is a fundamental notation in the study of Radical Numbers, Expressions, Equations, and Functions. This symbol (√) indicates the root of a number, with the most common being the square root. For example, the expression $$\sqrt{25}$$ |
Radical Expressions | |
Definition--Rationals and Radicals--Radicand | RadicandTopicRationals and Radicals DefinitionThe radicand is the number or expression inside the radical symbol that is being rooted. DescriptionThe Radicand is a key component in the study of Radical Numbers, Expressions, Equations, and Functions. It is the number or expression inside the radical symbol that is being rooted. For example, in the expression $$\sqrt{49}$$ |
Radical Expressions | |
Definition--Rationals and Radicals--Rational Equations | Rational EquationsTopicRationals and Radicals DefinitionRational equations are equations that involve rational expressions, which are fractions containing polynomials in the numerator and denominator. DescriptionRational Equations are a fundamental aspect of Rational Numbers, Expressions, Equations, and Functions. These equations involve rational expressions, which are fractions containing polynomials in the numerator and denominator. Solving rational equations typically requires finding a common denominator, clearing the fractions, and then solving the resulting polynomial equation. For example, to solve $$\frac{1}{x} + \frac{1}{x+1} = \frac{1}{2}$$ |
Rational Functions and Equations |