Hello How to prove the min function is continuous?

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simpleeyelid
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Hello!

Could anybody give me an idea about this proof?

knowing [tex]f_{i}:X\rightarrow[/tex]R i=1,2

to show whether [tex]f_{3}=min{f_{1},f_{2}}[/tex] is continuous!

Thanks in advance,

Regards
 
on Phys.org
yeah, thanks, a lot, I finally find that it is convenient to construct it using the gluing lemma.
 
quick solution:

min(f, g) = (f+g)/2 - |f-g|/2