AP Precalculus - Unit 1: Polynomial and Rational Functions Flashcards

A mathematical relationship that maps a set of input values to a set of output values such that each input value is mapped to exactly one output value.

Also known as the domain or independent variable (x), these are the values that are used as input in a function.

Also known as the range or dependent variable (y), these are the values that are produced as output by a function.

The rule that determines how the input values are transformed into output values in a function.

A function is increasing over an interval of its domain if, as the input values increase, the output values always increase.

A function is decreasing over an interval of its domain if, as the input values increase, the output values always decrease.

A visual display of input-output pairs that shows how values vary in a function.

A rate of change is increasing in a function.

A rate of change is decreasing in a function.

The zeros of the function, which are the values of x for which the function equals zero.

The average rate of change over a closed interval [a, b] is the slope of the secant line from the point (a, f(a)) to (b, f(b)).

When one quantity increases, the other quantity increases as well.

When one quantity increases, the other quantity decreases.

Points where a polynomial changes between increasing and decreasing or includes an endpoint with restricted domain.

The greatest local maximum or least local minimum in a polynomial.

Points where the rate of change of a function changes from increasing to decreasing or from decreasing to increasing, resulting in a change in concavity.

Numbers that include both real numbers and non-real numbers.

Zeros of a polynomial that are real numbers.

A function that is symmetric over the line x = 0 and satisfies the property f(-x) = f(x).

A function that is symmetric over the point (0, 0) and satisfies the property f(-x) = -f(x).

The behavior of a function as the input values increase or decrease without bound.

The ratio of two polynomials where the polynomial in the denominator is not equal to zero.

Zeros of the polynomial in the denominator that are not zeros of the numerator.

A point where a zero appears more times in the numerator than the denominator in a rational function.

Different forms of expressing polynomial and rational expressions, such as standard form and factored form.

A method used to find the equations of slant asymptotes of graphs of rational functions.

A theorem used to expand terms in the form (a + b)^n and polynomials functions in the form of (x + c)^n.

Changes made to a parent function, such as vertical or horizontal translations, dilations, or reflections.

Choosing the appropriate type of function model based on the characteristics of the data or scenario.

The assumptions made and restrictions applied when constructing a function model.

The process of creating a function model based on restrictions, transformations, technology, or piece-wise functions.

Using function models to draw conclusions about data sets or scenarios and making appropriate use of units of measure.