Basic Differentiation Rules
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Transcript Basic Differentiation Rules
Basic Differentiation Rules
Derivative Rules
• Theorem. [The Constant Rule] If k is a real
number such that f x k for all x in some open
interval I, then f ' x 0 for all x I .
• Theorem. [The Power Rule] Let r be a rational
number, and let f x x r. Then
f ' x rx
for all values of x where this expression is defined.
r 1
Examples
• Find derivatives for the following functions:
f x x100
g x 13
h x 5 x
• Find the equation of the line tangent to the graph
of y x3 at the point 2,8 .
More Derivative Rules
• Theorem [The Constant Multiple Rule] Let k
represent a real number, and let f be a
differentiable function. Then the function kf is
also differentiable and
d
kf x kf ' x .
dx
• Example. Find the derivative of f x 6 x3 .
•
Theorem [The Sum and Difference Rules] Let f and g be
differentiable functions. Then
d
f x g x f ' x g ' x
dx
and
d
f x g x f ' x g ' x .
dx
•
Example. Find the derivative of each function.
f x 6 x3 4 x
•
g x 7 x3 8 x 2 7 x 2
Note. This theorem generalizes to any finite sum or difference.
Theorem.
d
sin x cos x
dx
d
cos x sin x
dx
Example. Find all values of x where the line tangent
to the graph of y sin x has slope –1.
The Derivative As a Rate of
Change
• Slope.
f x f c
dy
lim
dx xc
xc
f x f c
xc
y
x
rise
run
rate of change in y with respect to x
• Velocity. Let s t be a function giving the position of
a point moving on a number line at time t.
s t s c
s ' c lim
t 0
t c
s t s c
t c
distance
time
rate of change in position
The derivative s ' c gives the instantaneous velocity at time t c.
The Derivative an Instantaneous Rate of Change
f x f c
dy
lim
dx xc
xc
instantaneous rate of change in y with respect to x
Example. A stone dropped from a bridge falls 16t 2 in
t seconds. Find the velocity after 3 seconds. If a
river flows 256 feet below the bridge, with what
velocity does the rock enter the water?