Calculus 1: The Limit of a Function (Video #2) | Math with Professor V

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Intuitive explanation of finding the limit of a function using a graph and table of values. Analyzing one-sided limits for a function, two-sided limits, and infinite limits. Using limits to find vertical asymptotes and finding infinite limits. #limits #calculus #mathtvwithprofessorv #limitfromtheleft #limitfromtheright #onesidedlimits #twosidedlimits #limitdne #verticalasymptotes #limitlaws #mathvideos #math #calculus #calculus1 #youtubemath #calculusvideos #calculushelp #calculustutor #mathprofessor #mathtutor #mathhelp

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I find often that many professors are not good teachers, but I can tell that you genuinely have a passion for TEACHING!!!! Amazing video series, you are going to be an amazing resource for me this semester and I'm so thankful

eva
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I've watched more than my share of math tutorials and it's probably known to you as well that MOST of the instructors, to put it mildly, utilize chicken scratch to show their work. I want to both thank and congratulate you on your penmanship that makes your already clear demonstrations a much more enjoyable experience than what is typical in this medium.

timwhite
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Professor V., thank you once again for another awesome lecture on The Limit of a Function in Calculus One. I am relearning Calculus One in fine detail. The examples are very helpful from a theoretical and practical point of view.

georgesadler
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You are one of the best math teachers. Thank you. I have an exam on Tuesday and I am watching your videos as I don't understand my professor. Thank you, again.

sultanasadia
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yeh I am from INDIA what awesome lecture..help a lot to me thank u professor..

jaganbehera
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this video is so so useful for intro to calc and limits! the analogy of the people walking on the graph is super helpful LOL thanks always!

hewo.
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9:00 how are you choosing which values to plug into on both sides?

SleepyPlanzZ
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...Good evening Professor V, I hope you're doing well. I'm impressed with your presentation on limits of functions (not the easiest topic for many folks). I just wanted to ask you one brief question about this subject, if I may. Of the function f(x)=1/x, we know from your presentation that the two-sided limit (x--->0) does not exist (DNE). Now suppose that is given the function g(x)=1/x^2. Of course you know this graph very well. How would you write down the outcome of the two-sided limit (x--->0) of g(x), given that the left-sided and the right-sided limits (x--->0) of g(x) both go to positive infinity. However infinity in general is not a real number, but a concept! Undefined or Positive infinity as the answer to my question? Professor V, I'm very curious about your answer, because I believe that in this case with g(x)=1/x^2 there exist different opinions, circulating within the math community, of which you are a part! Thank you again for your clear and precise presentation of "Limits"... Pleasant summer day, Jan-W

jan-willemreens