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13 Nov 2019
(1) For each function f(z) below: (a) prove that f(z) is one-to-one on its given domain, (b) state the range of f() (c) calculate the inverse ), (d) give the domain of and (e) give the range of (a) and (1A) f(x) for 1 (1B) f(for0 (1 C) f(x) = 2*2 + 82-1 for #2-2
(1) For each function f(z) below: (a) prove that f(z) is one-to-one on its given domain, (b) state the range of f() (c) calculate the inverse ), (d) give the domain of and (e) give the range of (a) and (1A) f(x) for 1 (1B) f(for0 (1 C) f(x) = 2*2 + 82-1 for #2-2
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Keith LeannonLv2
16 Aug 2019
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Related questions
The graphs of f and g are given
.
(a) State the values of the functions below.
f(0) =
g(3) =
(b) For what values of x is f(x) = g(x)?
(smaller value)=
(larger value)=
(c) Estimate the solutions of the equation f(x) = -1.
x = ___________ (smaller value)
x = ___________ (larger value)
(d) On what interval is f decreasing?
[ , ]
(e) State the domain and range of f.
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[ , | ] | range |
(f) State the domain and range of g.
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