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Chapter 3 The Derivative
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Section 3.1 Limits
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Figure 3 - 4
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Your Turn 5 Suppose and Use the limit rules to find Solution:
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Your Turn 6 Solution: Rule 4 cannot be used here, since The numerator also approaches 0 as x approaches −3, and 0/0 is meaningless. For x ≠ − 3 we can, however, simplify the function by rewriting the fraction as Now Rule 7 can be used.
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Your Turn 8 Solution: Here, the highest power of x is x2, which is used to divide each term in the numerator and denominator.
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Section 3.2 Continuity
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Your Turn 1 Find all values x = a where the function is discontinuous. Solution: This root function is discontinuous wherever the radicand is negative. There is a discontinuity when 5x + 3 < 0
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Your Turn 2 Find all values of x where the piecewise function is discontinuous. Solution: Since each piece of this function is a polynomial, the only x-values where f might be discontinuous here are 0 and 3. We investigate at x = 0 first. From the left, where x-values are less than 0, From the right, where x-values are greater than 0 Continued
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Your Turn 2 Continued Because the limit does not exist, so f is discontinuous at x = 0 regardless of the value of f(0). Now let us investigate at x = 3. Thus, f is continuous at x = 3.
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Section 3.3 Rates of Change
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Definition of the Derivative
Section 3.4 Definition of the Derivative
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Graphical Differentiation
Section 3.5 Graphical Differentiation
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Extended Application: A Model for Drugs Administered Intravenously
Chapter 3 Extended Application: A Model for Drugs Administered Intravenously
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