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Glossary

Definitions of key terms as they are used in the HTML sections of Calculus: Newton, Leibniz, and Robinson Meet Technology. Each source link opens the textbook section that establishes or reviews the term.

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A

Absolute approximation error
The absolute value of the difference between an exact value and its approximation.
Source: Section 10.1
Acceleration at a moment
The rate at which a rate-of-change function varies during a moment.
Source: Section 7.2
Accumulation function
A function generated by accumulating variations in its value, where those variations occur at some rate over moments of its independent variable.
Source: Section 5.1
Antiderivative
A function whose exact rate-of-change function (derivative) is a specified function. Any two antiderivatives of the same function differ by a constant.
Source: Section 8.0
Approximate rate of change function
A function whose values approximate another function’s rate of change, commonly by using a difference quotient over a nonzero interval.
Source: Section 6.1
Argument
The expression that represents the value at which a function is actually evaluated.
Source: Section 3.14

C

Change
In this textbook, replacing one thing with another. This is distinguished from vary (change in progress) and variation (completed change).
Source: Section 3.1
Closed form definition
A function definition that specifies how to compute its values in a finite number of operations on variables or familiar functions.
Source: Section 8.0
Closed interval
An interval that contains both endpoints, conventionally written with brackets, such as [2, 3].
Source: Section 7.1
Completed variation
Accumulation over all completed incremental intervals before the interval containing the independent variable’s current value.
Source: Section 5.1
Constant
A number or symbol used to represent a quantity whose measure is the same within all situations under consideration.
Source: Section 8.0
Constant rate of change
A relationship between two smoothly and continuously varying quantities in which all variations in one are proportional to corresponding variations in the other.
Source: Section 4.1
Continuous function
A function that is not discontinuous at any value in the interval under consideration.
Source: Section 3.17
Convention
One of several possible ways of doing or writing something that a community agrees to use in order to aid communication; a convention is not a rule.
Source: Section 3.5
Correspondence point
A point whose coordinates are values that co-occur in related quantities; its location represents those values simultaneously.
Source: Section 3.9
Current variation
Accumulation within the current incremental interval, from that interval’s left endpoint to the independent variable’s current value.
Source: Section 5.1

D

Decreasing function
A function f is decreasing over an interval when f(a) is greater than f(b) whenever a is less than b for all a and b in that interval.
Source: Section 3.17
Dependent variable
The variable whose values are determined by values of the independent variable.
Source: Section 3.17
Derivative
The exact rate-of-change function derived from a known exact accumulation function.
Source: Section 8.0
Differential change
A varying change in a variable’s value, typically varying within an interval of fixed length represented by an incremental change such as Δx.
Source: Section 8.0
Discontinuous function
A function that, at some value in its domain, fails to keep all nearby output values within every chosen tolerance over any sufficiently small surrounding interval.
Source: Section 3.17
Domain of a function
All values of a function’s independent variable for which the function has a value.
Source: Section 3.17

E

Essentially equal
Two function values are essentially equal at a moment when, for any chosen tolerance, there is a sufficiently small surrounding interval throughout which their difference stays within that tolerance.
Source: Section 4.9
Even function
A function f for which f(−x) = f(x) for every x in its domain; its Cartesian graph is symmetric about the y-axis.
Source: Section 3.17
Exact accumulation function
A function whose values give exact accumulated amounts; it can be reconceptualized as a starting value plus exact net accumulation from an exact rate-of-change function.
Source: Section 6.1
Exact net accumulation
The net amount accumulated from a starting value a to a current value x as accumulation proceeds at an exact rate over infinitesimal intervals.
Source: Section 8.0
Exact rate of change function
A function whose value at each argument gives another function’s momentary exact rate of change at that argument.
Source: Section 4.9
Exponential function
A function of the form f(x) = bˣ, in which the exponent varies and the base is constant.
Source: Section 6.3

F

Function
A relationship between an independent and a dependent variable in which each value of the independent variable is related to exactly one value of the dependent variable.
Source: Section 3.17
Fundamental Theorem of Calculus
For an exact accumulation function f with exact rate-of-change function r, the net accumulation of r from a to x equals f(x) − f(a).
Source: Section 6.2

G

Global maximum
A maximum value of a function that is greater than every other value of the function on the interval under consideration.
Source: Section 7.1
Global minimum
A minimum value of a function that is less than every other value of the function on the interval under consideration.
Source: Section 7.1
Graph of a mathematical statement
The set of ordered pairs whose coordinate values make a mathematical statement involving two variables true.
Source: Section 3.5

I

Increasing function
A function f is increasing over an interval when f(a) is less than f(b) whenever a is less than b for all a and b in that interval.
Source: Section 3.17
Incremental change
A fixed-size change in a variable’s value, commonly represented by notation such as Δx, Δy, or Δt.
Source: Section 8.0
Independent variable
The variable whose values are controlled or taken as determining the dependent variable’s values.
Source: Section 3.17
Integral
The function representing exact net accumulation from a known exact rate-of-change function over an interval.
Source: Section 8.0
Integrating
Determining exact net accumulation from a known exact rate-of-change function.
Source: Section 8.0
Interval
A set of real numbers between two endpoint values; endpoints may be included or excluded.
Source: Section 3.17
Inverse function
Functions h and k are inverses when each undoes the other: applying one and then the other returns the original input throughout the relevant domains.
Source: Section 3.18

L

Local maximum
A maximum value relative to nearby values that is not the global maximum on the interval under consideration.
Source: Section 7.1
Local minimum
A minimum value relative to nearby values that is not the global minimum on the interval under consideration.
Source: Section 7.1

M

Maximum value
A function value at x = k where the exact rate of change is zero and changes from positive to negative around k.
Source: Section 7.1
Minimum value
A function value at x = k where the exact rate of change is zero and changes from negative to positive around k.
Source: Section 7.1
Moment
A tiny interval containing a specified value of an independent variable.
Source: Section 4.4

N

Natural logarithm
The logarithm with base e, conventionally written ln(x).
Source: Section 6.3
Net accumulation function
A function whose values give the net amount accumulated from a starting value to a current value as accumulation proceeds at a specified rate.
Source: Section 9.1

O

Odd function
A function f for which f(−x) = −f(x) for every x in its domain; its Cartesian graph has 180-degree rotational symmetry about the origin.
Source: Section 3.17
One-to-one function
A function in which no two different values of the independent variable are related to the same dependent-variable value.
Source: Section 3.17
Open form definition
A function definition that gives a conceptual outline of the function’s meaning without finite instructions for computing each value.
Source: Section 8.0
Open interval
An interval that excludes both endpoints, conventionally written with parentheses, such as (2, 3).
Source: Section 7.1

P

Parameter
A notation representing a quantity that is constant in one situation but can vary from one situation to another.
Source: Section 8.0
Parameterization
A representation that defines coordinates or related variables as functions of a common parameter.
Source: Section 12.1
Parametrically defined relationship
A relationship between variables in which each variable is defined as a function of an additional common variable.
Source: Section 12.1
Point of inflection
A value x = k where a function’s continuous second-order rate-of-change function is zero and changes sign around k.
Source: Section 7.2
Power function
A function of the form f(x) = xᵇ, in which the exponent is constant.
Source: Section 6.3

Q

Quantity
An attribute of an object that you conceive as being measurable.
Source: Section 3.10

R

Range of a function
All values that a function relates to values of its independent variable.
Source: Section 3.17
Rate of change at a moment
The value that makes a function’s nearby values essentially equal to its current value plus that rate multiplied by a differential change through a sufficiently small interval.
Source: Section 4.9
Relative approximation error
The absolute approximation error divided by the absolute value of the nonzero exact value.
Source: Section 10.1
Riemann sum
The name used in many textbooks for approximating accumulation by treating the rate as constant over each incremental interval.
Source: Section 10.1

S

Simpson’s rule
The name used in many textbooks for the quadratic method of approximating accumulation.
Source: Section 10.1

T

Taylor polynomial
A polynomial approximation built so its value and successive rate-of-change values agree with those of a target function at a selected value.
Source: Section 10.2
Trapezoid rule
The name used in many textbooks for approximating accumulation by assuming constant acceleration, so the rate is approximated linearly over each interval.
Source: Section 10.1

U

Unsimplified expression
An expression left in a form that preserves its component operations and can retain information about the quantities and relationships used to construct it.
Source: Section 8.0

V

Variable
A notation used to represent the value of a quantity whose measure varies within a situation.
Source: Section 8.0
Variation
In this textbook, completed change in a quantity’s value.
Source: Section 3.1
Vary
In this textbook, change in progress.
Source: Section 3.1

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