(2.9.13, Given continuous functions f, g: X F on a metric space X, prove the following statements. (a) If a and b are scalars, then af +bg is continuous. (b) fg is continuous. ©If g(x) # 0 for every r, then 1/g and f/g are continuous. d) h(x) = \f(x)| is continuous. %3D

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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2.9.13, Given continuous functions f, g: X F on a metric space X, prove
the following statements.
(a) If a and b are scalars, then af +bg is continuous.
(b) fg is continuous.
C If g(x) 0 for every x, then 1/g andf/g are continuous.
(d) h(x) = |f(x)| is continuous.
(e) If F = R, then m(x) = min{f (x), g(x)} and M (x) = max{f(x), g(x)}
are continuous.
Hint: Show that m(x) =(f+g-If-gl) and M(r) = (f+g+lf-g).
f) Z; = {x € X : f(x) = 0} is a closed subset of X.
Transcribed Image Text:2.9.13, Given continuous functions f, g: X F on a metric space X, prove the following statements. (a) If a and b are scalars, then af +bg is continuous. (b) fg is continuous. C If g(x) 0 for every x, then 1/g andf/g are continuous. (d) h(x) = |f(x)| is continuous. (e) If F = R, then m(x) = min{f (x), g(x)} and M (x) = max{f(x), g(x)} are continuous. Hint: Show that m(x) =(f+g-If-gl) and M(r) = (f+g+lf-g). f) Z; = {x € X : f(x) = 0} is a closed subset of X.
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