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OpenStudy (anonymous):
Proofs: prove if |s|<=t ^ lim(t)=0, then lim(s)=0
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terenzreignz (terenzreignz):
s and t are functions?
OpenStudy (anonymous):
yes
terenzreignz (terenzreignz):
Well, squeeze.
terenzreignz (terenzreignz):
If \(\large |s|\le t\) then either... \[\large -t \le s \le t\] or \[\large t \le s \le -t\] Either way, squeeze.
terenzreignz (terenzreignz):
ON second thought, the "second case" \[\Large \color{red}{t\le s \le -t}\] is not possible So just stick to this statement... \[\huge \color{blue}{-t \le s \le t}\] and use squeeze
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