1. 3.5 Continuity & End Behavior

2. Discontinuous – you cannot trace the graph of the function without lifting your pencil. (step and piecewise functions)
Infinite discontinuity – the absolute value if f(x) becomes greater and greater as the graph approaches a given x-value.
Jump discontinuity – the graph stops at a given value of the domain and then begins again at a different range value for the same value of the domain.
Point discontinuity – when a value in the domain of the function is undefined, but the pieces
of the graph match up
Everywhere discontinuous – impossible to graph in the real number system

3. Continuity Test -
A function is continuous at x = c if it satisfies the following conditions:
1. the function is defined at c; or f(c) exists
2. the function approaches the same y-value on the left and right sides of x = c
3. the y-value that the function approaches from each side is f(c).

4. Ex 1 Determine whether the function is continuous at the given x-value.
y = 3x2 + x – 7; x = 1

5. Ex 2 Determine whether the function is continuous at the given x-value.

6. Ex 3 Determine whether the function is continuous at the given x-value.

7. Continuity on an interval – a function f(x) is continuous on an interval if and only if it is continuous at each number x in the interval
Critical points – points in the domain of the function where the function changes from increasing to decreasing or vice versa.

8. End behavior – describes what the y-values do as the absolute value of x becomes greater and greater. When x becomes greater and greater we say that x approaches infinity. (same notation is used for f(x) or y and using real numbers instead of infinity.)

9. Ex 4 Describe the end behavior:
f(x) = 5x3
g(x) = -5x3 + 4x2 – 2x + 4