+ Inverse Functions How do we verify and find inverses of functions? M2 Unit 5a: Day 3.
Math 71B 9.3 – Logarithmic Functions 1. One-to-one functions have inverses. Let’s define the...
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Math 71B 9.3 – Logarithmic Functions 1
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3 Logarithmic Function
Transcript of Math 71B 9.3 – Logarithmic Functions 1. One-to-one functions have inverses. Let’s define the...
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Math 71B
9.3 – Logarithmic Functions
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One-to-one functions have inverses. Let’s define the inverse of the exponential function.
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To find inverse of , we first switch and : Then we solve for .
We don’t have tools to solve for , so we just define what’s called the _________________________:
(Note: Here, and are positive, and .)
Logarithmic Function
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To find inverse of , we first switch and : Then we solve for .
We don’t have tools to solve for , so we just define what’s called the _________________________:
(Note: Here, and are positive, and .)
Logarithmic Function
logarithmic function
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Logarithmic Form:
Exponential Form:
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Ex 1.Write each equation in the other form.
Exponential Form Logarithmic Form
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Ex 1.Write each equation in the other form.
Exponential Form Logarithmic Form
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Ex 1.Write each equation in the other form.
Exponential Form Logarithmic Form
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Ex 1.Write each equation in the other form.
Exponential Form Logarithmic Form
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Ex 1.Write each equation in the other form.
Exponential Form Logarithmic Form
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Ex 2.Evaluate.
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Note: ____ and ____
Note: Since and are inverse functions by definition, _____ and _____
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Note: ____ and ____
Note: Since and are inverse functions by definition, _____ and _____
1
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Note: ____ and ____
Note: Since and are inverse functions by definition, _____ and _____
1 0
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Note: ____ and ____
Note: Since and are inverse functions by definition, _____ and _____
1 0
𝒙
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Note: ____ and ____
Note: Since and are inverse functions by definition, _____ and _____
1 0
𝒙 𝒙
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Ex 3.Evaluate.
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Ex 3.Evaluate.
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Ex 3.Evaluate.
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Let’s graph , knowing that it’s the inverse of :
Graph of Logarithmic Function
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Let’s graph , knowing that it’s the inverse of :
Graph of Logarithmic Function
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Let’s graph , knowing that it’s the inverse of :
Graph of Logarithmic Function
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Let’s graph , knowing that it’s the inverse of :
Graph of Logarithmic Function
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Let’s graph , knowing that it’s the inverse of :
Graph of Logarithmic Function
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In general, the logarithmic function with base is (where , , ).
Graph of Logarithmic Function
ex: ex:
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Graph of Logarithmic Function
What is the vertical asymptote? _________
What is the domain? _________
What is the range? _________
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Graph of Logarithmic Function
What is the vertical asymptote? _________
What is the domain? _________
What is the range? _________
𝒙=𝟎
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Graph of Logarithmic Function
What is the vertical asymptote? _________
What is the domain? _________
What is the range? _________
(𝟎 ,∞ )
𝒙=𝟎
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Graph of Logarithmic Function
What is the vertical asymptote? _________
What is the domain? _________
What is the range? _________
(𝟎 ,∞ )
𝒙=𝟎
(−∞ ,∞)
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Ex 4.Graph Graph
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Ex 4.Graph Graph
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Ex 4.Graph Graph
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Ex 4.Graph Graph
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Ex 4.Graph Graph
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Ex 4.Graph Graph
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Ex 4.Graph Graph
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Ex 5.What is the domain of ?
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Notation: (_____________ logarithm) (_____________ logarithm) Ex 6.
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Notation: (_____________ logarithm) (_____________ logarithm) Ex 6.
common
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Notation: (_____________ logarithm) (_____________ logarithm) Ex 6.
commonnatural
