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Implicit Differentiation
Lesson 3.5
2
Introduction
• Consider an equation involving both x and y:
• This equation implicitly defines a function in x
• It could be defined explicitly
2 2 49x y
2 49 ( 7)y x where x
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Differentiate
• Differentiate both sides of the equation– each term– one at a time– use the chain rule for terms containing y
• For we get
• Now solve for dy/dx
2 2 49x y
2 2 0dy
x ydx
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Differentiate• Then gives us
• We can replace the y in the results with the explicit value of y as needed
• This gives usthe slope on the curve for any legal value of x
2 2 0dy
x ydx
2
2
dy x x
dx y y
2 49
dy x
dx x
View Spreadsheet Example
View Spreadsheet Example
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Guidelines for Implicit Differentiation
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Slope of a Tangent Line
• Given x3 + y3 = y + 21find the slope of the tangent at (3,-2)
• 3x2 +3y2y’ = y’
• Solve for y’2
2
3'1 3
xy
y
Substitute x = 3, y = -2 27
11slope
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Second Derivative
• Given x2 –y2 = 49
• y’ =??
• y’’ =
'x
yy
2
2 2
'd y y x y
dx y
Substitute
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Exponential & Log Functions
• Given y = bx where b > 0, a constant
• Given y = logbx
ln xdyb b
dx
1'ln
yb x
Note: this is a constant
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Using Logarithmic Differentiation
• Given
• Take the log of both sides, simplify
• Now differentiate both sides with respect to x, solve for dy/dx
10 3 7 818 ( 1) ( 3)y x x
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Implicit Differentiation on the TI Calculator
• On older TI calculators, you can declare a function which will do implicit differentiation:
• Usage:
Newer TI’salready havethis function
Newer TI’salready havethis function
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Assignment
• Lesson 3.5
• Page 171
• Exercises 1 – 81 EOO
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