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Section 2.1
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+Section 2.1
Average velocity is just an algebra 1 slope between two points on the position function.
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+Algebra 1 Review!
Remember slope from Algebra 1?
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+Function Notation
So now that we are in Calculus, we can make our slope formula (average rate of change formula) more specific.
Y1 is a value found by plugging x1 into an equation…but what equation? Therefore, y1 is a little vague.
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+If we call our position function s(x) as opposed to y, then s(x1) is the same as y1.
It is easier to see that s(x1) is the y value that was obtained by plugging x1 into the s function.
We use many different types of functions in calculus so we need to keep them straight and the easiest way to do this is to use function notation.
Examples: a(x1) is the y value associated with plugging x1 into the a function or acceleration function.
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Example 1: A stone is released from a state of rest and falls to earth. Estimate the instantaneous velocity at t = .5 s by calculating average velocity over several small time intervals.
Position function is:
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Time Interval
Average Velocity
[0.5, 0.6]
[.5, 0.55]
[.5, 0.51]
[.5, 0.505]
[.5, 0.5001]
S(.5) = -4S(.6) = -5.76S(.55)=-4.84S(.51) = -4.1616S(.505) = -4.0804S(.5001) = -4.0016
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+Every time we find an Average Rate of Change, (AROC), we are finding the slope of a secant line… a slope between two points.
The closer the x-values get to one another, the closer we get to an Instantaneous Rate of Change (IROC), or the slope of the tangent line.
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+Tangent Lines
The more secant lines you draw, the closer you are getting to a tangent line.
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+Question 1:
Average velocity is defined as the ratio of which two quantities?
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+Question #2
Average velocity is equal to the slope of a secant line through two points on a graph. Which graph??
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Question #3
Can instantaneous velocity be defined as a ratio? If not, how is instantaneous velocity computed?
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Question #4
What is the graphical interpretation of instantaneous velocity at a moment t = t0??
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+Question #5
What is the graphical interpretation of the following statement: The AROC approaches the IROC as the interval [x0 , x1] shrinks to x0.