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Math 180 Packet #6 The Chain Rule
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ex: If a car uses 0.2 gallons per mile when travelling 60 miles per hour, how many gallons per hour are being used? 0.2 gal mile miles hr =ππ gal hr
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ex: If a car uses 0.2 gallons per mile when travelling 60 miles per hour, how many gallons per hour are being used? 0.2 gal mile 60 miles hr =ππ gal hr
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ex: If a car uses 0.2 gallons per mile when travelling 60 miles per hour, how many gallons per hour are being used? 0.2 gal mile 60 miles hr =ππ gal hr
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Ex 1. Differentiate π¦= 2π₯β5 2 .
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The Chain Rule If π¦=π(π’) is a differentiable function of π’, and π’=π(π₯) is a differentiable function of π₯, then π¦=π π π₯ is a differentiable function of π₯, and π
π π
π = π
π π
π β
π
π π
π Hereβs another way to write the Chain Rule using functional notation: πβπ β² π = π β² π π derivative of outer β
π β² π derivative of inner Here, think: βπ is the outer function, and π is the inner functionβ
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The Chain Rule If π¦=π(π’) is a differentiable function of π’, and π’=π(π₯) is a differentiable function of π₯, then π¦=π π π₯ is a differentiable function of π₯, and π
π π
π = π
π π
π β
π
π π
π Hereβs another way to write the Chain Rule using functional notation: πβπ β² π = π β² π π derivative of outer β
π β² π derivative of inner Here, think: βπ is the outer function, and π is the inner functionβ
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The Chain Rule If π¦=π(π’) is a differentiable function of π’, and π’=π(π₯) is a differentiable function of π₯, then π¦=π π π₯ is a differentiable function of π₯, and π
π π
π = π
π π
π β
π
π π
π Hereβs another way to write the Chain Rule using functional notation: πβπ β² π = π β² π π derivative of outer β
π β² π derivative of inner Here, think: βπ is the outer function, and π is the inner functionβ
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Letβs get some practice identifying inner and outer functions:
Inner function Outer function π₯ 1 π π₯ + sin π₯ 2 π₯ π₯ sin ( log π₯ ) π π₯ 3 ln (5π₯+2)
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Ex 2. Differentiate sin( π₯ 2 + π π₯ ) with respect to π₯. Ex 3
Ex 2. Differentiate sin( π₯ 2 + π π₯ ) with respect to π₯. Ex 3. Find the derivative of π¦= π cos π₯ .
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Ex 4. Find the derivative of π π₯ = tanh (5β sin 2π₯ ). Ex 5
Ex 4. Find the derivative of π π₯ = tanh (5β sin 2π₯ ) . Ex 5. Find the derivative of π π₯ = ln π₯+2 . Ex 6. Find the derivative of π π₯ = ln π₯ 3 cos π₯ .
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Ex 7. π ππ₯ 1 3π₯β2 =
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Ex 8. Differentiate π π₯ = 3π₯+1 4 2π₯β1 5 and simplify your answer by factoring.
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Ex 9. Find all points where π π₯ = sin 2 π₯ has a horizontal tangent line.
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