ERF - Exploring Rational Functions Module Overview
Exploring Rational Functions Module Overview
Introduction
Many people have an interest in pastimes such as diving, photography, racing, playing music, or just getting a tan. Other people are considering a career in medicine, machinery, farming, banking, or weather. Rational functions have expressions written as a fraction. Pressure in diving, exposures in photography, average speed in racing, frequency in music and the sun's radiation can all be expressed as a radical or rational function. The careers listed are a few examples of jobs that use radical or rational functions in various aspects. Rational functions will be explored here. In addition, we will explore absolute value functions and piecewise functions. Piecewise functions are used to describe situations in which a rule or relationship changes as the input value crosses certain "boundaries."
Essential Questions
- How are rational expressions multiplied and divided?
- How are rational expressions added and subtracted?
- How are complex fractions simplified?
- How are rational equations solved?
- Why are all solutions not necessarily the solution to an equation? How can you identify these extra solutions?
- How are rational functions graphed?
- In solving rational and radical equations, what are extraneous solutions?
- What are the key features of the graphs of rational functions?
Key Terms
Rational Expression - An expression that can be written as a fraction.
Excluded Values - Values that make the expression undefined (0 in the denominator).
Like Terms - Terms having the exact same variable(s) and exponent(s).
Extraneous Solutions - Solutions that make the expression undefined.
Intercepts - Points where a graph crosses an axis.
Domain - The values for the x-variable.
Range - The values for the y-variable.
Zeros - The roots of a function, also called solutions or x-intercepts.
Asymptotes - Vertical and horizontal lines where the function is undefined.
Extrema - Maximums and minimums of a graph.
End Behavior - The rise or fall of the ends of the graph.
Conjugate - The same binomial expression with the opposite sign.
Greatest Common Factor - Largest expression that will go into the terms evenly.
Lowest Common Denominator - Denominator that is the smallest multiple of all of the denominators.
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