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Review Derivatives When you see the words… This is what you know… f has a local (relative) minimum at x = a f(a) is less than or equal to every other y-value in some interval containing x = a 1
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Review Derivatives When you see the words… This is what you know… The difference quotient for f at x = a .. 2
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Review Derivatives When you see the words… This is what you know… Definition of derivative f’(x) = .. 3
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Review Derivatives When you see the words… This is what you know… If f is differentiable at x = a Then f is continuous at x = a 4
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Review Derivatives When you see the words… This is what you know… Rolle’s Theorem If f is continuous on [a,b], differentiable on (a,b) and f(a) = f(b), then for some c on (a,b), f’( c) = 0 5
![Review Derivatives When you see the words… This is what you know… Rolle’s Theorem If f is continuous on [a,b], differentiable on (a,b) and f(a) = f(b), then for some c on (a,b), f’( c) = 0 5](http://images.slideplayer.com./24/7555869/slides/slide_5.jpg "Review Derivatives When you see the words… This is what you know… Rolle’s Theorem If f is continuous on [a,b], differentiable on (a,b) and f(a) = f(b), then for some c on (a,b), f’( c) = 0 5")
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Review Derivatives When you see the words… This is what you know… Mean Value Theorem If f is continuous on [a,b], differentiable on (a,b) then for some c on (a,b) 6
![Review Derivatives When you see the words… This is what you know… Mean Value Theorem If f is continuous on [a,b], differentiable on (a,b) then for some c on (a,b) 6](http://images.slideplayer.com./24/7555869/slides/slide_6.jpg "Review Derivatives When you see the words… This is what you know… Mean Value Theorem If f is continuous on [a,b], differentiable on (a,b) then for some c on (a,b) 6")
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Review Derivatives When you see the words… This is what you know… Mean Value Theorem (as rates of change) If f is continuous on [a,b], differentiable on (a,b) then for some point in the interval the instantaneous rate of change = average rate of change 7
![Review Derivatives When you see the words… This is what you know… Mean Value Theorem (as rates of change) If f is continuous on [a,b], differentiable on (a,b) then for some point in the interval the instantaneous rate of change = average rate of change 7](http://images.slideplayer.com./24/7555869/slides/slide_7.jpg "Review Derivatives When you see the words… This is what you know… Mean Value Theorem (as rates of change) If f is continuous on [a,b], differentiable on (a,b) then for some point in the interval the instantaneous rate of change = average rate of change 7")
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Review Derivatives When you see the words… This is what you know… If f is differentiable at x = a, then …… 8
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Review Derivatives When you see the words… This is what you know… .. k * f’ 9
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Review Derivatives When you see the words… This is what you know… .. f’ g’ 10
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Review Derivatives When you see the words… This is what you know… .. f * g’ + g * f’ 11
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Review Derivatives When you see the words… This is what you know… .. 12
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Review Derivatives When you see the words… This is what you know… .. 13
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Review Derivatives When you see the words… This is what you know… .. 14
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Review Derivatives When you see the words… This is what you know… .. 15
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Review Derivatives When you see the words… This is what you know… .. 16
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Review Derivatives When you see the words… This is what you know… .. 17
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Review Derivatives When you see the words… This is what you know… .. 18
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Review Derivatives When you see the words… This is what you know… .. 19
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Review Derivatives When you see the words… This is what you know… Average rate of change of f on [a,b] .. 20
![Review Derivatives When you see the words… This is what you know… Average rate of change of f on [a,b] ..](http://images.slideplayer.com./24/7555869/slides/slide_20.jpg "20.")
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Review Derivatives When you see the words… This is what you know… f’(a) = 0 The graph of f has a horizontal tangent at x=a 21
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Review Derivatives When you see the words… This is what you know… Instantaneous rate of change of f at x = a f’(a) 22
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Review Derivatives When you see the words… This is what you know… Critical points of f At endpoints of the domain Where f’(x) does not exist Where f’(x) = 0 23
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Review Derivatives When you see the words… This is what you know… f’(x) > 0 for a < x < b f is increasing on the interval a < x < b 24
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Review Derivatives When you see the words… This is what you know… f’(x) < 0 for a < x < b f is decreasing on the interval a < x < b 25
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Review Derivatives When you see the words… This is what you know… f” (x) > 0 for a < x < b The graph of f is concave upward on the interval a < x < b 26
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Review Derivatives When you see the words… This is what you know… f” (x) < 0 for a < x < b The graph of f is concave downward on the interval a < x < b 27
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Review Derivatives When you see the words… This is what you know… f’ (x) is increasing for a < x < b The graph of f is concave upward on the interval a < x < b 28
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Review Derivatives When you see the words… This is what you know… f’ (x) is decreasing for a < x < b The graph of f is concave downward on the interval a < x < b 29
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Review Derivatives When you see the words… This is what you know… The second derivative test f’(a) = 0 and f”(a) < 0 f has a maximum at x = a 30
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Review Derivatives When you see the words… This is what you know… The second derivative test f’(a) = 0 and f”(a) > 0 f has a minimum at x = a 31
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Review Derivatives When you see the words… This is what you know… The graph of f changes concavity The graph of f has a point of inflection 32
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Review Derivatives When you see the words… This is what you know… At x = a, f is continuous and changes from increasing to decreasing f has a maximum at x = a 33
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Review Derivatives When you see the words… This is what you know… At x = a, f is continuous and changes from decreasing to increasing f has a minimum at x = a 34
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Review Derivatives When you see the words… This is what you know… Velocity, speed, and acceleration Velocity: Speed: | v(t) | Accleration: 35
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Review Derivatives When you see the words… This is what you know… Increasing speed Velocity and acceleration have the same sign 36
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Review Derivatives When you see the words… This is what you know… Decreasing speed Velocity and acceleration have the opposite signs 37
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Review Derivatives When you see the words… This is what you know… The normal line to a curve at x = a is Perpendicular to the line tangent to the curve at x = a 38
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Review Derivatives When you see the words… This is what you know… An object in motion along a line reverses direction when… The sign of the object’s velocity changes 39
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Review Derivatives When you see the words… This is what you know… An object is at rest when… v(t) = 0 40
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Review Derivatives When you see the words… This is what you know… f has a global (absolute) maximum at x = a f(a) is greater than or equal to every other y-value of f 41
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Review Derivatives When you see the words… This is what you know… f has a global (absolute) minimum at x = a f(a) is less than or equal to every other y-value of f 42
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Review Derivatives When you see the words… This is what you know… f has a local (relative) maximum at x = a f(a) is greater than or equal to every other y-value in some interval containing x = a 43
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Review Derivatives When you see the words… This is what you know… .. Cos x 44
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Review Derivatives When you see the words… This is what you know… .. -sin x 45
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