Squeeze theorem or sandwich theorem | Limits | Differential Calculus | Khan Academy

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Differential calculus on Khan Academy: Limit introduction, squeeze theorem, and epsilon-delta definition of limits.

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Комментарии
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You, sir, are a genius!  SO much better explanation than my maths lecturer.

Jackmandate
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would be nice if you applied it, I get the concept but I'd be fucked if I got asked to use the squeeze theorem

illfaptothis
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great vid, thanks, but next time can u include a specific math example pls

linusbao
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Thank you so much! This is really helpful!

nehakochar
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Much much more better (best) than my school lecture

manjulakumar
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sal i just love u .u r the best teacher in the world . may god bless u

debjanimajumder
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I love the way the tutor is practical...he makes everything easy to grasp😂❤

mballybiyelakhumalokhumalo
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I agree with Pankaj.  At 1.33 have no idea where we are going.  Need some motivation at the start, and better still in the title.

michaelkovari
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For our next problem, we weill find
lim(food left) as Sal --> sandwich

william
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Awesome man!wish all maths teachers were like you.

anjelyjoseph
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Hi. I have got question. What is going when we set "c" at another value of x, for example five units at right from "c"? I mean, for me, at this point f(x) and g(x) don't go to the same point so how can g(x) go (it isn't squeezed)?

przemysawpierzynowski
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There is a demonstration for this theorem. I am looking for ..

zorak
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Which software you are using ??? In which you are writing Please reply .e

tayyabasadiq
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The problem is this: hyperplanes have a directional property and in so far as I understand it, the Claim is not about arranging spatial and orientational relationships of three objects to ensure mutual bisectability but is the avowal that, a priori, there will be a mutually bisecting hyperplane whenever and however three objects are found. In simple terms: one of the hyperplanes bisecting two object; there can be more than one and on occasion only one; has to be the one that ought to bisect the third. That there is any such, given that there is a directionality to each of the limited number of hyperplanes that might be available bisecting two objects and the freedom to place/find the third object anywhere, is not a thing I see as necessarily true.

indrajitmazumdar
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How about just stating the theorem and spending the remaining 7 minutes with the proof and some examples where it's useful?

surfcello
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Why does Imran have to get the fewest?

Alanamastreete
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Sir bsc zoology aur botany part 1 ka lectures upload kara

beautyofkashmir
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Totally lost!!!...Description of video lesson is must regarding intended viewers

PankajKumar-ujsh
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You, sir, are a genius!  SO much better explanation than my maths lecturer.

Jackmandate