§3.2 – the derivative function october 2, 2015
TRANSCRIPT
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§3.2 – The Derivative FunctionOctober 2, 2015
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Definition of The Derivative Function
The function defined by the formula
is called the derivative of with respect to . The domain of consists of all in the domain of for which the limit exists
h
xfhxfxf
h
)()(lim)(
0
'
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Notation: - all nouns meaning the derivative function
Read “ prime” - a verb with a noun meaning take the
derivative of the given function
Example: Find the derivative with respect to of Graph and together.
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Normal Line
The normal line to a curve at a point is the line perpendicular to the tangent at that point.
Example: Write the equation for the normal line to the curve at .
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Derivatives
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Secant line of a graph of displacement () vs time will give the average velocity within an interval
Tangent line of a graph of displacement vs time will give the instantaneous velocity at a certain point
h
tfthfv
hins
)()(lim 00
0
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Remember these are slopes of a tangent line of the curve Positive slope = positive velocity (forward) Negative slope = negative velocity (backwards) Zero slope = zero velocity (stopped) Maximum slope = maximum velocity Minimum slope = minimum velocity
The tangent line will give the instantaneous rate of change of anything
The secant line will give the average rate of change of anything
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Ex: A penny is dropped from the empire state building by some idiot who wants to see if it will kill anybody. The position function of the penny is 1) Find its average velocity during its trip to the ground 2) Find its instantaneous velocity right before it hits the ground.