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Increasing/Decreasing Functions and Concavity Objective: Use the derivative to find where a graph is increasing/decreasing and determine concavity.
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Increasing/Decreasing The terms increasing, decreasing, and constant are used to describe the behavior of a function over an interval as we travel left to right along its graph.
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Definition 5.1.1 Let f be defined on an interval, and let x 1 and x 2 denote points in that interval. a)f is increasing on the interval if f(x 1 ) < f(x 2 ) whenever x 1 < x 2. b)f is decreasing on the interval if f(x 1 ) > f(x 2 ) whenever x 1 < x 2. c)f is constant on the interval if f(x 1 ) = f(x 2 ) for all points x 1 and x 2.
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The Derivative Lets look at a graph that is increasing. What can you tell me about the derivative of this function?
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The Derivative Lets look at a graph that is decreasing. What can you tell me about the derivative of this function?
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The Derivative Lets look at a graph that is constant. What can you tell me about the derivative of this function?
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Theorem 5.1.2 Let f be a function that is continuous on a closed interval [a, b] and differentiable on the open interval (a, b). a)If for every value of x in (a, b), then f is increasing on [a, b]. b)If for every value of x in (a, b), then f is decreasing on [a, b]. c)If for every value of x in (a, b), then f is constant on [a, b]
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Example 1 Find the intervals on which is increasing and the intervals on which it is decreasing.
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Example 1 Find the intervals on which is increasing and the intervals on which it is decreasing. We want to take the derivative and do sign analysis to see where it is positive or negative.
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Example 1 Find the intervals on which is increasing and the intervals on which it is decreasing. We want to take the derivative and do sign analysis to see where it is positive or negative. _________|_________
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Example 1 Find the intervals on which is increasing and the intervals on which it is decreasing. We want to take the derivative and do sign analysis to see where it is positive or negative. _________|_________ So increasing on, decreasing on
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Example 2 Find the intervals on which is increasing and intervals on which it is decreasing.
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Example 2 Find the intervals on which is increasing and intervals on which it is decreasing. ________|________ This function is increasing on
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Example 3 Use the graph below to make a conjecture about the intervals on which f is increasing or decreasing.
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Example 3 Use theorem 5.1.2 to verify your conjecture. ________|______|___|________ Increasing Decreasing
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Concavity This graph is what we call concave up. Lets look at the derivative of this graph What is it doing? Is it increasing or decreasing?
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Concavity This graph is what we call concave down. Lets look at the derivative of this graph What is it doing? Is it increasing or decreasing?
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Concavity Definition 5.1.3 If f is differentiable on an open interval I, then f is said to be concave up on I if is increasing on I, and f is said to be concave down on I if is said to be decreasing on I.
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Concavity Definition 5.1.3 If f is differentiable on an open interval I, then f is said to be concave up on I if is increasing on I, and f is said to be concave down on I if is said to be decreasing on I. We already learned that where a function is increasing, its derivative is positive and where it is decreasing, its derivative is negative. Lets put that idea together with this definition. What can we say?
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Concavity We were told that concave up means that is increasing. If a function is increasing, we know that its derivative is positive. So where a function is concave up, is positive. We were also told that concave down means that is decreasing. If a function is decreasing, we know that its derivative is negative. So where a function is concave down, is negative.
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Concavity Theorem 5.1.4 Let f be twice differentiable on a open interval I. a)If for every value of x in I, then f is concave up on I. b)If for every value of x in I, then f is concave down on I.
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Inflection Points Definition 5.1.5 If f is continuous on an open interval containing a value x 0, and if f changes the direction of its concavity at the point (x 0, f(x 0 )), then we say that f has an inflection point at x 0, and we call the point an inflection point of f.
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Example 5 Given, find the intervals on which f is increasing/decreasing and concave up/down. Locate all points of inflection.
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Example 5 Given, find the intervals on which f is increasing/decreasing and concave up/down. Locate all points of inflection. ________|______|________ Increasing on Decreasing on
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Example 5 Given, find the intervals on which f is increasing/decreasing and concave up/down. Locate all points of inflection. ________|______ Concave up on Concave down on Inflection point at x = 1
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Differences When we express where a function is increasing or decreasing, we include the points where it changes in our answers. Increasing Decreasing When we express where a function is concave up or concave down, the inflection points are not included in the answers. Concave up Concave down
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Example 6 Given Find where this function is increasing/decreasing. Find where this function is concave up/down. Locate inflection points.
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Example 6 Given Find where this function is increasing/decreasing. Find where this function is concave up/down. Locate inflection points. ________|_____ Increasing on Decreasing on
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Example 6 Given Find where this function is increasing/decreasing. Find where this function is concave up/down. Locate inflection points. ________|_________ Concave up on Concave down on. Inflection point at x = 2.
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Example 7 Given on the interval Find increase/decrease. Find concave up/down. Inflection points.
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Example 7 Given on the interval Find increase/decrease. Find concave up/down. Inflection points. |_____|______|_____| |______|_____| Increasing Decreasing C up C down Inflection point x =
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Example 8 Find the inflection points, if any, of The 2 nd derivative has one zero at zero. Since there is no sign change around this zero, there are no points of inflection. This function is concave up everywhere. _____+____|____+_____ 0
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Inflection Points Inflection points mark the places on the curve y = f(x) where the rate of change of y with respect to x changes from increasing to decreasing, or vice versa.
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Applications Suppose that water is added to the flask so that the volume increases at a constant rate with respect to the time t, and let us examine the rate at which the water level rises with respect to t. Initially the water rises at a slow rate because of the wide base. However, as the diameter of the flask narrows, the rate at which the water rises will increase until the level is at the narrow point in the neck. From that point on, the rate at which the water rises will decrease.
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Homework Section 4.1 1-19 odd 27,29,39
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