1 the product and quotient rules and higher order derivatives section 2.3
TRANSCRIPT
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The Product and Quotient Rules and Higher Order Derivatives
Section 2.3
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After this lesson, you should be able to:
Find the derivative of a function using the Product RuleFind the derivative of a function using the Quotient RuleFind the derivative of a trig functionFind a higher-order derivative of a function
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The Product Rule
d dv duu v u v
dx dx dx
Example: Find dy/dx :
2( 6 )(3 2)y x x x
( )u f x ( )v g xLet f and g be differentiable functions and let and
' 'uv vu
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Product Rule Example
Example: Find dy/dx :
xxxxy cossin23
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Product Rule Example
Example: Find f ’(x):
)1)(32()( xxxf
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Product Rule Example
Example: Find y’ :
)9)(43( 23 xxxy
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The Quotient Rule
2
v du dv
ud u dx dxdx v v
2
''
v
uvvu
Let f and g be differentiable functions such that and let and
( ) 0,g x ( )v g x( )u f x
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Quotient Rule Example
1) Find y ’: 2
3 1
2 5
xy
x
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Quotient Rule Example
2) Find f ’(x):
12
( )3xf x
x
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3) Find2 3( 4)( 4 )
given2 3
dy x x xy
dx x
Quotient Rule Example
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4) Find3
3given
1
dy
d
x
xy
x
Quotient Rule Example
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5) Find3
2
'( ) given ( )5
xf x
xf x
Quotient Rule Example
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sin cosd
x xdx
cos sind
x xdx
tand
xdx
The Derivative of Tangent
The derivatives of the four remaining trig functions can be found using the derivatives of sine and/or cosine and the Quotient Rule.
For example,
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1csc
d dx
dx dx
The Derivative of Cosecant
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The Derivatives of the Six Basic Trig Functions
2
2
sin cos
cos sin
tan sec
csc csc cot
sec sec tan
cot csc
dx x
dxd
x xdxd
x xdxd
x x xdxd
x x xdxd
x xdx
Now for fun, you can use the Quotient Rule to find the derivatives of the two remaining trig functions!
Here's a summary of the derivatives of the six trigonometric functions:
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Trig Derivative Example
Find the derivative of ( ) 5 sin tanf x x x x x
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Example: ( ) tanf x x x
Write the equation of the tangent line at 4
x
Equation of the Tangent Line
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Higher Order Derivatives
y =f(x)
')(' ydx
dyxf Ex:
83)( 24 xxxf
xxxf 64)(' 3
'')(''2
2
ydx
ydxf Ex: 612)('' 2 xxf
''')('''3
3
ydx
ydxf xxf 24)(''' Ex:
)4(4
4)4( )( y
dx
ydxf Ex: 24)()4( xf
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Higher Order Derivatives of sin x
xy sin
xdx
dycos
xdx
ydsin
2
2
xdx
ydcos
3
3
xdx
ydsin
4
4
xdx
ydcos
5
5
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Higher Order Derivatives Example
1) Find the second derivative of 5
( ) sin2
xf x x
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Higher Order Derivatives Example
2) Given 6 4 21 2( ) 5 3
30 3f x x x x x
a) Find ''( )f x
b) Determine the point(s) at which the function has a horizontal tangent.
''( )f x
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Homework
Section 2.3 page 126 #1-23 odd, 29, 39-43 odd, 51, 63, 67, 73, 99, 101, 116