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Going to Extrema Section 4.1 Is it CRITICAL to go to EXTREMES? •Should you do Minimum work or Maximum work? •Should you be Saddled with this decision? •Is homework ABSOLUTELY necessary? CRITICAL Numbers If c is a critical number, then •c must be an x-coordinate •a function f must be defined at c •f ’(c) = 0 or f is not differentiable at c How critical am I? Derivatives: Activity 1 You are given the graph of a function on a grid. Assuming that the grid lines are spaced 1 unit apart both horizontally and vertically, Sketch the graph of the derivative of each function over the same interval. 4 m=-.8 m=-.7 m=-.5 m=-.3 -5 2 Derivatives: Activity 1 m=.8 m=.7 m=.5 m=.3 m=-.2 m=.2 m=0 5 Graph 1 -2 Sketch the graph of the derivative of each function over the same interval 2 -5 5 -2 6 Derivatives: Activity 1 4 m=___ m=___ 6 2 m=___ Graph 2 -5 4 5 m=___ m=___ -2 m=___ 2 m=___ -4 m=___ m=___ -6 -5 5 m=___ -8 -2 m=___ -4 -6 6 4 m=___ m=___ 2 6 m=___ -5 m=___ 5 4 -2 m=___ 2 -4 -5 5 -6 Derivatives: Activity 1- Graph 3 -2 -4 -6 Derivatives and Graphs 6 6 On these graphs, where is the derivative positive and how do you know? 1st Derivative = slope of the tangent line at a point! If the slope is positive then the derivative is positive. 4 4 2 2 2 -2 5 -4 -2 -6 What word could describe the behavior of the function when the derivative is positive? Derivatives and Graphs On these graphs, where is the derivative negative and how do you know? 1st Derivative = slope of the tangent line at a point! If the slope is negative then the derivative is negative. 6 4 4 2 2 2 -2 -4 -2 What word could describe the behavior of the function when the derivative is negative? Derivatives: Activity 1 – Graph 4 8 6 6 4 m=___ 4 m=___ m=___ 2 2 m=___ -5 5 m=___ -5 5 -2 m=___ -2 m=___ -4 m=___ m=___ -4 -6 -6 m=___ -8 m=___ Derivatives: Activity 1 – Graph 5 6 6 4 4 2 2 -5 5 -5 5 -2 -2 -4 -4 -6 -6 6 Derivatives: Activity 1 – Graph 6 12 x 4 -5 slope 10 -4 2 8 -3 6 5 -2 4 -2 -1 2 -4 -6 0 5 Derivatives: Activity 1 – Graph 7 8 6 6 4 4 2 2 -5 5 -5 x slope -5 -4 5 -2 -2 x slope 1 -4 -3 2 -2 -1 0 3 4 5 -6 Are Derivatives telling you more about graphs??? • When the derivative is zero, describe what could be happening on the graph of the function at that point. Are Derivatives telling you more about graphs??? • When the derivative is undefined (the function is not differentiable at the point), describe what could be happening on the graph of the function at that point. Here is the graph of a Derivative: Local Max– f ’changes from increasing to decreasing and f ” is negative 4 Positive Derivatives = 2 Increasing Functions -5 5 Negative Derivatives = Decreasing Functions -2 Local Min – f ‘ changes from decreasing to increasing and f ” is positive Are Derivatives telling you more about graphs??? When the derivative reaches a maximum or minimum, describe what is happening to the graph of the function at that point. Here are the graphs of some 1 Derivative changes from positive to negative Relative Max! -2 fx = x2-3ex -1 -2 f'x = ex x2+2ex x+-3ex -3 -4 -5 Relative Min 2 Derivative changes from negative to positive Derivative functions: Where are the extrema of the original function located? Label each as a maximum or minimum. Here are the graphs of some Derivative functions: 8 fx = ln x -2x2sgn 1+x2 6 f'x = x sgn x2+1 + x4+2x2+1 x x2+1 x2+1 x x2+1 4 Derivative changes from positive to negative -5 2 Where are the extrema of the original function Derivative changes located? Label from positive to each as a negative maximum or What’s happening minimum. at x = 0? Relative Max! 5 Relative Max! -2 -4 -6 -8 So, how do you find the extrema of a function? 1. Find the critical numbers of the function. 2. Find the absolute extrema if you have a closed interval. 3. Find the relative/local extrema. Find the critical numbers of the function. a) Find the 1st derivative of the function b) Find any values where the derivative does not exist to find some critical numbers c) Set the derivative equal to 0 and solve to find the rest of the critical numbers Extrema on a closed interval Find the absolute extrema if its on a closed interval. a) Evaluate the function at each endpoint and each critical number to identify absolute extrema. b) The point with the lowest y-coordinate is the absolute minimum. c) The point with the highest y-coordinate is the absolute maximum. Find the relative/local extrema. a) Find the 2nd derivative of the function. b) Evaluate the 2nd derivative at each critical number to identify and label the relative/local extrema c) If the 2nd derivative at a critical number is positive then it is a relative minimum. d) If the 2nd derivative at a critical number is negative, then it is a relative maximum. e) If the 2nd derivative at a critical number is zero, then it is not relative extrema. Find the extrema of f(x) = 2x – 3x2/3 on [-1,3] 1. Find the 1st derivative of the function 2. Find any values where the derivative does not exist and then set the derivative equal to 0 and solve to find all of the critical numbers 3. Evaluate the function at each endpoint and each critical number to identify absolute extrema 4. Find the 2nd derivative of the function. 5. Evaluate the 2nd derivative at each critical number to identify and label the relative/local extrema 6. Graph the function and check your work!!! Find the extrema of f(x) = 2x – 3x2/3 on [-1,3] Work Here… 4 2 fx = 2x-3x 3 2 -5 relative and absolute max at (0,0) 5 -2 relative min 1,-1 -1 f'x = -2x 3 +2 -4 absolute min at (-1,-5) -4 f''x = -6 -8 2x 3 3 Find the extrema of f(x) = 2sin(x) – cos(2x) on [0,2] 1. Find the 1st derivative of the function 2. Find any values where the derivative does not exist and then set the derivative equal to 0 and solve to find all of the critical numbers 3. Evaluate the function at each endpoint and each critical number to identify absolute extrema 4. Find the 2nd derivative of the function. 5. Evaluate the 2nd derivative at each critical number to identify and label the relative/local extrema 6. Graph the function and check your work!!! Work Here… Find the extrema of f(x) = 2sin(x) – cos(2x) on [0,2] 6 4 relative and absolute max at ,3 2 fx = 2sinx-cos2x f'x = 2cosx+2sin2x f''x = -2sinx+4cos2x 2 5 2,-1 (0,-1) -2 -4 -6 relative and absolute mins at 7 3 ,and 6 2 11 3 ,6 2 10 Homework- Due Wed. • Re-read section 4.1 and finish taking notes on it • Do p. 209 # 1, 3, 6, 9, 12, 15, 18, 21, 24, 33, 42 Homework- Due Thurs. Do p. 210 # 45, 51, 54, 61, 62, 67 - 74 So, is it CRITICAL to go to EXTREMES? • Should you do Maximum work or Minimum work? Maximizing your Study Skills will often Minimize your work and Minimize your mistakes! • Should you be Saddled with this decision? Yes – you are becoming an adult! • Is homework ABSOLUTELY necessary? Yes, ABSOLUTELY!
