Calculus I Hughes-Hallett Math 131 Br. Joel Baumeyer Christian Brothers University

Function: (Data Point of View) n One quantity H, is a function of another, t, if each value of t has a unique value of H associated with it. In symbols: H = f(t). n We say H is the value of the function or the dependent variable or output; and n t is the argument or independent variable or input.

Working Definition of Function: H = f(t) nA function is a rule (equation) which assigns to each element of the domain (independent variable) one and only one element of the range (dependent variable).

Working definition of function continued: nDomain is the set of all possible values of the independent variable (t). nRange is the corresponding set of values of the dependent variable (H).

Questions?

General Types of Functions (Examples): n Linear: y = m(x) + b; proportion: y = kx n Polynomial: Quadratic: y =x 2 ; Cubic: y= x 3 ; etc n Power Functions: y = kx p n Trigonometric: y = sin x, y = Arctan x n Exponential: y = ae bx ; Logarithmic: y = ln x

Graph of a Function: nThe graph of a function is all the points in the Cartesian plane whose coordinates make the rule (equation) of the function a true statement.

Slope m - slope : b: y-intercept a: x-intercept.

5 Forms of the Linear Equation Slope-intercept: y = f(x) = b + mx Slope-point: Two point: Two intercept: General Form: Ax + By = C

Exponential Functions: If a > 1, growth; a<1, decay If r is the growth rate then a = 1 + r, and If r is the decay rate then a = 1 - r, and

Definitions and Rules of Exponentiation: D1: D2: R1: R2: R3:

Inverse Functions: Two functions z = f(x) and z = g(x) are inverse functions if the following four statements are true: Domain of f equals the range of g. Range of f equals the domain of g. f(g(x)) = x for all x in the domain of g. g(f(y)) = y for all y in the domain of f.

A logarithm is an exponent..

General Rules of Logarithms: log(ab) = log(a) + log(b) log(a/b) = log(a) - log(b)

e = Any exponential function can be written in terms of e by using the fact that So that

Making New Functions from Old Given y = f(x): (y - b) =k f(x - a) stretches f(x) if |k| > 1 shrinks f(x) if |k| < 1 reverses y values if k is negative a moves graph right or left, a + or a - b moves graph up or down, b + or b - If f(-x) = f(x) then f is an “even” function. If f(-x) = -f(x) then f is an “odd” function.

Polynomials: A polynomial of the nth degree has n roots if complex numbers a allowed. Zeros of the function are roots of the equation. The graph can have at most n - 1 bends. The leading coefficient determines the position of the graph for |x| very large.

Rational Function: y = f(x) = p(x)/q(x) where p(x) and q(x) are polynomials. Any value of x that makes q(x) = 0 is called a vertical asymptote of f(x). If f(x) approaches a finite value a as x gets larger and larger in absolute value without stopping, then a is horizontal asymptote of f(x) and we write: An asymptote is a “line” that a curve approaches but never reaches.

Asymptote Tests y = h(x) =f(x)/g(x ) Vertical Asymptotes: Solve: g(x) = 0 If y    as x  K, where g(K) = 0, then x = K is a vertical asymptote. Horizontal Asymptotes: If f(x)  L as x   then y = L is a vertical asymptote. Write h(x) as:, where n is the highest power of x in f(x) or g(x).

Basic Trig radian measure:  = s/r and thus s = r , Know triangle and circle definitions of the trig functions. y = A sin B(x -  ) + k A amplitude; B - period factor; period, p = 2  /B  - phase shift k (raise or lower graph factor)

Continuity of y = f(x) A function is said to be continuous if there are no “breaks” in its graph. A function is continuous at a point x = a if the value of f(x)  L, a number, as x  a for values of x either greater or less than a.

Intermediate Value Theorem Suppose f is continuous on a closed interval [a,b]. If k is any number between f(a) and f(b) then there is at least one number c in [a,b] such that f(x) = k.