3.1 Defining the Derivative
Vocabulary Examples
Difference Quotient
For a function f , the difference quotient Q is:
Q =
Alternately, for h * 0, Q =
Slope of a
Tangent Line
mtan =
Alternately, for h * 0, mtan =
Derivative of a
Function at a Point
The derivative of f (x) at a, denoted , is defined:
f ,(a) =
Or f ,(a) =
Instantaneous
Rate of Change
The instantaneous rate of change of a function f (x) at a is its
1. For each of the following functions, determine the slope of the secant line between x1 and x2. (a) f (x) = 4x + 7, x1 = 2, x2 = 5
Name:
Defining the Derivative
Section:
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25
(b) f (x) =
x x+3
, x1 = 0, x2 = 3
2. For each of the following functions, determine the f ,(a)
(a) f (x) = 2×2 ? x, a = 4
(b) f (x) = ?x ? 7, a = 10
3. For each of the following functions f , write the equation for the line tangent to f at x = a
(a) f (x) = 1 x5 + 2x at a = 1
3
(b) f (x) =
x
?4 at a = 2
(c) f (x) = 54 + 5 at a = ?3
x3
4. Recall that the velocity of a moving object is instantaneous rate of change of its position. A projectiles position d at time t is given by the function d(t) = ?4.9t2 + 20.1x + 24.3.
(a) Determine the velocity of the object after 2 seconds.
(b) Determine the velocity of the object after 3 seconds.
3.2 Derivative as a Function
Vocabulary Examples
Derivative
Function
For a function f , the derivative function, denoted , is the function whose domain consists of values of x such that the following limit exists:
f ,(x) =
Notations:
Theorem on
Differentiabil- ity and Continuity
If a function f is differentiable at a, then f is at a.
Higher-Order
Derivative
The of a
1. Use the definition of a derivative to determine the derivative of the following functions. (a) f (x) = 3×2 ? 2
(b) f (x) = x?2
(c) f (x) = ?3x ? 7
(d) f (x) = 3
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