2. Intro to Derivatives
Derivatives as Functions
5:29 minutesProblem 71b
Textbook Question
The right-sided and left-sided derivatives of a function at a point are given by and , respectively, provided these limits exist. The derivative exists if and only if .
Compute and at the given point .
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Identify the function given: \( f(x) = |x - 2| \) and the point \( a = 2 \).
To find the right-sided derivative \( f_{+}^{\prime}(2) \), consider \( h \to 0^{+} \). For \( x > 2 \), \( f(x) = x - 2 \). Thus, \( f(2 + h) = (2 + h) - 2 = h \).
Compute the right-sided derivative: \( f_{+}^{\prime}(2) = \lim_{h \to 0^{+}} \frac{f(2 + h) - f(2)}{h} = \lim_{h \to 0^{+}} \frac{h - 0}{h} = \lim_{h \to 0^{+}} 1 \).
To find the left-sided derivative \( f_{-}^{\prime}(2) \), consider \( h \to 0^{-} \). For \( x < 2 \), \( f(x) = 2 - x \). Thus, \( f(2 + h) = 2 - (2 + h) = -h \).
Compute the left-sided derivative: \( f_{-}^{\prime}(2) = \lim_{h \to 0^{-}} \frac{f(2 + h) - f(2)}{h} = \lim_{h \to 0^{-}} \frac{-h - 0}{h} = \lim_{h \to 0^{-}} -1 \).
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Right-sided and Left-sided Derivatives
Right-sided and left-sided derivatives are limits that describe the behavior of a function as it approaches a specific point from the right or left, respectively. The right-sided derivative at a point 'a' is defined as the limit of the difference quotient as 'h' approaches 0 from the positive side, while the left-sided derivative is defined similarly but approaches from the negative side. These derivatives help determine the function's behavior at points where it may not be differentiable.
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Existence of the Derivative
The derivative of a function at a point exists if and only if the right-sided and left-sided derivatives at that point are equal. This condition ensures that the function has a well-defined tangent at that point, indicating smoothness and continuity. If the two derivatives are not equal, the function may have a corner or cusp, making it non-differentiable at that point.
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Absolute Value Function
The absolute value function, denoted as f(x) = |x - 2|, represents the distance of 'x' from 2 on the real number line. This function is piecewise defined, resulting in a V-shaped graph with a vertex at x = 2. Understanding the behavior of this function is crucial for calculating its derivatives, especially at the point where it changes direction, which is where the left-sided and right-sided derivatives need to be evaluated.
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