BackPrecalculus Exam 1 Study Guide: Rational Functions, Logarithms, Exponentials, and Trigonometry
Study Guide - Smart Notes
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Rational Functions
Domain of Rational Functions
The domain of a rational function consists of all real numbers except those that make the denominator zero. To find the domain, set the denominator equal to zero and solve for the excluded values.
Key Point: A rational function is any function that can be written as , where and are polynomials and .
Key Point: The domain is all real numbers except where .
Example: For , set to find excluded values: .
Graphing Rational Functions
To graph a rational function, follow these steps:
Find the domain by identifying values that make the denominator zero.
Find intercepts: Set numerator to zero for x-intercepts; set for y-intercept.
Identify vertical asymptotes (where denominator is zero and numerator is nonzero).
Identify horizontal or oblique asymptotes by comparing degrees of numerator and denominator.
Plot additional points as needed for accuracy.
Example: has vertical asymptotes at and a horizontal asymptote at .
Logarithmic and Exponential Equations
Solving Logarithmic Equations
Logarithmic equations can often be solved by using properties of logarithms and converting to exponential form.
Key Point: is equivalent to .
Properties:
Example: implies , so .
Solving Exponential Equations
To solve exponential equations, isolate the exponential term and take the logarithm of both sides if necessary.
Key Point: can be solved by taking or of both sides.
Example: leads to , so , .
Applications of Exponential and Logarithmic Functions
Compound Interest
Compound interest problems use the formula:
For n times per year:
Compounded continuously:
Key Terms: = final amount, = principal, = annual rate (decimal), = number of times compounded per year, = time in years.
Example: $200 compounded quarterly for years:
Present Value
To find the present value needed to reach a future amount:
Formula: or for continuous compounding.
Example: To get $5000 years at compounded daily:
Exponential Growth and Decay
Population growth and cooling problems use exponential models:
Growth: , where
Decay: , where
Doubling time:
Newton's Law of Cooling:
Example: If a population doubles every 21 months, (months), and
Trigonometric Equations
Solving Basic Trigonometric Equations
To solve equations involving sine, cosine, or tangent, isolate the trigonometric function and use inverse functions.
Key Point: implies or
Key Point: implies or
Key Point: implies
Example: leads to , so (in )
Solving Trigonometric Equations with Multiple Angles or Identities
Some equations require using trigonometric identities or factoring.
Key Identities:
Example: can be factored as
Solving Trigonometric Equations Involving Products and Sums
Equations may involve products or sums of trigonometric functions, requiring substitution or algebraic manipulation.
Example:
Rewrite and , then simplify.
Summary Table: Key Formulas and Properties
Topic | Formula | Notes |
|---|---|---|
Rational Function Domain | Set denominator | Exclude these values |
Compound Interest | = times/year | |
Continuous Compounding | Use | |
Logarithm to Exponential | Change of form | |
Newton's Law of Cooling | Temperature decay | |
Trigonometric Identity | Pythagorean identity |
Additional info: The study guide covers core Precalculus topics including rational functions, logarithmic and exponential equations, applications of exponential growth/decay, compound interest, and trigonometric equations. These are foundational for college-level Precalculus and are commonly tested on exams.
