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2.7 Derivatives and Rates of Change

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1 2.7 Derivatives and Rates of Change

2 The tangent problem The slope of a line is given by:
The slope of the tangent to f(x)=x2 at (1,1) can be approximated by the slope of the secant through (4,16): We could get a better approximation if we move the point closer to (1,1), i.e. (3,9): Even better would be the point (2,4):

3 The tangent problem The slope of a line is given by:
If we got really close to (1,1), say (1.1,1.21), the approximation would get better still How far can we go?

4 The tangent problem slope slope at
The slope of the curve at the point is: Note: This is the slope of the tangent line to the curve at the point.

5 The velocity problem Consider a graph of displacement (distance traveled) vs. time. Average velocity can be found by taking: time (hours) distance (miles) B A The speedometer in your car does not measure average velocity, but instantaneous velocity. (The velocity at one moment in time.)

6 Derivatives Definition: The derivative of a function at a number a, denoted by f ′(a), is if this limit exists.

7 Example: Find f ′(a) for f(x)=x2+3

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10 Equation of the tangent line
The tangent line to y=f(x) at (a,f(a)) is the line through (a,f(a)) whose slope is equal to f ′(a). Then the equation of the tangent line to the curve y=f(x) at the point (a,f(a)): Example: Find an equation of the tangent line to f(x)=x2+3 at (1,4). From previous slide: f ′(1)=21=2. Thus, the equation is y-f(1)= f ′(1)(x-1) y-4=2(x-1) or y=2x+2

11 Rates of Change: Average rate of change = Instantaneous rate of change = These definitions are true for any function. ( x does not have to represent time. )

12 Review: p velocity = slope
These are often mixed up by Calculus students! average slope: slope at a point: average velocity: So are these! instantaneous velocity: If is the position function: velocity = slope p


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