There was a "typo" in the last two lines on your chalkboard. You left out the "x^2" term. Nevertheless, the answer to the original limit is correct. As an aside, could you do one more squeeze theorem example? Thanks!
Thanks for the vid sir but plss i want to ask whether you can make a video of using squeeze theorem on normal limits of like algebraic or rational functions, i would really appreciate plss🙏 🙏
I am a 9th grader & really love math......... I was pretty much onto calculus, but only this was what was troubling me, even when I understood Jacobian........ Thank you so much sir for explaining this topic 😊
One small remark. When wrote the second inequality (with e) you said you did not have to change the inequality signs because e to x is positive. The real reason is not that but the fact that e to x is a growing function. Also e to negative x is always positive but it is a diminishing function, and in that case you would need to change the inequality signs.
Take the natural log of this expression: limit as x→0 of 2*ln(x)+sin(1/x) is -∞ since |sin(1/x)|≤1. Thus, e^(-∞)=0, so the limit of x^2*e^sin(1/x) t as x→0 is 0.
Sir I have a doubt that if we put a value near 0 like 0.000001 for x and see we find that the graph of x^2 approaches very fast towards 0 and the value of e^ sin (1/x) is always finite because we can use the thita braking method of 90 multiple and adding the rest part thus in this way we can find the value of it as 0 easily
@@PrimeNewtons yes actually I am in class 9 and I use my father's Google account so yes I think it was new to me so thankyou sir for letting me know about such a good theory😁
Solution: one function is bounded, the other approaches zero. Hence so does the product of the two functions. All these words and equations are unnecessary. Learning math is, in part, learning to be concise.
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There was a "typo" in the last two lines on your chalkboard. You left out the "x^2" term. Nevertheless, the answer to the original limit is correct. As an aside, could you do one more squeeze theorem example? Thanks!
Oh my! Yes, it was a major typo. I hope it doesn't spoil the purpose of the video.
@@PrimeNewtons It didn't spoil it for me. You just forgot to say "come on" and then add the x^2 you inadvertently omitted 😉
Dw king nothing as spoiled, love your content as always :D@@PrimeNewtons
For the first time I understood the squeeze theorem. Thank you!
Ive never seen someone discover peoples sandwich preferences while doing math. Love the explanation though!
I am a public investigator. I see things.
Got hungry after this masterpiece
Thanks for the vid sir but plss i want to ask whether you can make a video of using squeeze theorem on normal limits of like algebraic or rational functions, i would really appreciate plss🙏 🙏
Amazing. As someone who has not taken calculus yet, this makes so much sense to me. Thank you from Canada.
You're very welcome!
Literally the best math UA-camr out there fr
Omg I finally understand how to construct the squeeze theorem inequality to solve the limit. Thanks a lot
Thank you for your help, you are a great teacher.
I am a 9th grader & really love math......... I was pretty much onto calculus, but only this was what was troubling me, even when I understood Jacobian........ Thank you so much sir for explaining this topic 😊
You really make my day, now, I have understood squeeze theory
Indeed you are powerful, thank you very much you have made the understand easy
From Zambia
The analogy is really crazy , great video. Very well explain thanks man
Thy voice is interesting, it is calm and enthusiastic simultaneously. Great video, fam!
Thanks a bunch!! I almost completly forgot about it.
Hello, I am a student from Jordan. I liked your explanation, but I would like to ask if you can explain Advance Calculus??
ooh and the partial please answer me???
@@tuqa20 i do not think he does higher level university mathematics
Wow I love math so much ❤❤❤
In the last steps x^2 was omitted from x^2 * e^sin (1/x). Was this by accident?
Yes. It was a major typo.
@@PrimeNewtons Nevertheless, fascinating video!
One small remark. When wrote the second inequality (with e) you said you did not have to change the inequality signs because e to x is positive. The real reason is not that but the fact that e to x is a growing function. Also e to negative x is always positive but it is a diminishing function, and in that case you would need to change the inequality signs.
Yes. My problem is that I have many assumptions as I speak. Thank you 😊
Thank you ❤
Oxford Mathematic will be call you one day for lectures. AL PAZA
Never stop learning ❤❤
What would change if it was x insted of x^2 ?
Take the natural log of this expression: limit as x→0 of 2*ln(x)+sin(1/x) is -∞ since |sin(1/x)|≤1.
Thus, e^(-∞)=0, so the limit of x^2*e^sin(1/x) t as x→0 is 0.
Sir I have a doubt that if we put a value near 0 like 0.000001 for x and see we find that the graph of x^2 approaches very fast towards 0 and the value of e^ sin (1/x) is always finite because we can use the thita braking method of 90 multiple and adding the rest part thus in this way we can find the value of it as 0 easily
That is not the purpose of the video.
@@PrimeNewtons oh sorry you were trying to make people understand about a new theory sorry
In India mainly we do maths like this which I did
@@shamicray Squeeze theorem is not new. Is it new to you? Some call it sandwich theorem.
@@PrimeNewtons yes actually I am in class 9 and I use my father's Google account so yes I think it was new to me so thankyou sir for letting me know about such a good theory😁
In Tenet there was a temporal pincer movement, this is mathematical pincer movement
2:32 This is unintentionally really funny.
You are a master who gives easy explanations ❤
For exp(sin(1/x)) is bounded and x^2 converges to 0 as x -> 0. Therefore, the limit of the product is 0 as x -> 0.
For -1
great calc 1 video as always! i don’t think i can ever eat your sandwiches though 😅
You have forgot it x^2 to the e^[sin(1/x)]! 😀😉
Cool thrm
Or, the theorem of two polices! 😀😉
Solution: one function is bounded, the other approaches zero. Hence so does the product of the two functions.
All these words and equations are unnecessary. Learning math is, in part, learning to be concise.
I like weep cream on my sandwich 😅
4:52 some people are vegetarians....