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Inverse Functions Definition: Let f and g be functions. They are said to be inverse if y = f(x) ↔ g(y) = x Theorem: If f is a one-to-one function then it has an unique inverse. Notation: the inverse of f is denoted by f -1
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Math 1304 Calculus I
1.6 Inverse Functions
1.6 Inverse functions
• Definition: A function f is said to be one-to-one if f(x) = f(y) implies x = y.
• It never takes on the same value twice• Horizontal Line Test: A function is one-to-one
if and only if no horizontal line intersects its graph more than once.
Inverse Functions
• Definition: Let f and g be functions. They are said to be inverse if
y = f(x) ↔ g(y) = x
• Theorem: If f is a one-to-one function then it has an unique inverse.
• Notation: the inverse of f is denoted by f-1
Rules for inverses
• f-1(f(x)) = x, for all x in the domain of f• f (f-1 (x)) = x, for all x in the domain of f-1
Finding an inverse
• Write y = f(x) and solve for x in terms of y.
Logarithms are inverse to exponentials
• loga(y) = x iff y = ax
Laws for logarithms
• See page 64
Natural Logarithms
• Natural = base e• ln(x) = loge(x)
The number e
• e = 2.718281828… is a special number that is used as a base for exponential functions in calculus
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