First off, Infinite is not a number. I have never seen a proof of that. Second. When we you talk about a Limit of a function you're indeed talking about two Limits, the Limit of the function itself and the Limit of ...let's say, the "rate of rapprochement" to that Limit of the function. The Limit of the function is, say, "x" but the Limit of the "RoR" will be always 0, which 0 doesn't mean you reached the Limit of the function but, that your approach comes to a stop. The problem here is that if we hold to the Limit of the function being "x" then the Limit of RoR can't be 0 but, on the other side, if we hold to the Limit of the RoR being 0 then the Limit of the function can't be "x". It is like hitchhiking in any direction but no one takes you. How do we look at it?
Mr Math Man should *not* have said, Infinity is a very large number. He should have said, X becomes a very large number, as it approaches infinity. Regardless, the answer is still *ZERO* .
@@MrSummitville Oh really?! Please help me! Well….seriously. You have got so far astray with your school knowledge, that I don’t know where to begin with. Fellow…do you know WHY it is called Infinite ? Because it has no „ends“ , nothing you could take as a parameter to know how close you are to reach infinity. Besides, Infinity CAN'T be „reached“! It is evident! (but not for you, of course) At school they mess up two different concepts: Endless and Infinite. What is normally called an Infinite Sum is, in fact, an Endless Sum. It is not Infinite, because it has a beginning and Endless because it has no End. You mix up those ideas and choose the wrong one to describe an endless progression, calling it Infinite. (…and want to look smart to that). Try to think first before you take it for granted what your teacher tells you.
Great video! I am currently in 8th grade Algebra 1 Honors and my friend recommended I watch your video. It explained it perfectly. Thank you!
1/x^2 is always positive where x 0, in this case x>0 means 1/x^2 as lim x (+) --> ~ is equal 0. or lim x(-) -->~ is equal 0
Hi
Legendary.......I love the way you explain things
Video starts 3:45
Tq very2 much. You taught the concept very well. God bless❤
Great exaplaination thank you very much
absolutely brilliant!!
Muito obrigada, você me faz entender matemática muito facilmente ❤❤
You want to hear a pizza joke? You know what, never mind; it’s too cheesy 😅
THANK UUU
True dat 👊👊💯🤧
You took 3.75 minutes BEFORE starting. You talk too much! Great course, but you talk too much.
No, he does not talk too much. It is so finely done in order for a hard heads to understand and it works.
Ahhh yes First semester calculus
Keren
First off, Infinite is not a number. I have never seen a proof of that.
Second. When we you talk about a Limit of a function you're indeed talking about two Limits, the Limit of the function itself and the Limit of ...let's say, the "rate of rapprochement" to that Limit of the function. The Limit of the function is, say, "x" but the Limit of the "RoR" will be always 0, which 0 doesn't mean you reached the Limit of the function but, that your approach comes to a stop.
The problem here is that if we hold to the Limit of the function being "x" then the Limit of RoR can't be 0 but, on the other side, if we hold to the Limit of the RoR being 0 then the Limit of the function can't be "x".
It is like hitchhiking in any direction but no one takes you.
How do we look at it?
Mr Math Man should *not* have said, Infinity is a very large number. He should have said, X becomes a very large number, as it approaches infinity. Regardless, the answer is still *ZERO* .
@@MrSummitville
You can’t „approach“ infinity. It is a contradiction in itself…….need an explanation?
@@O-KyklopX can and does approach infinity. It appears to be a concept that you can not understand. The answer is still *ZERO* .
@@MrSummitville
Oh really?!
Please help me!
Well….seriously. You have got so far astray with your school knowledge, that I don’t know where to begin with.
Fellow…do you know WHY it is called Infinite ?
Because it has no „ends“ , nothing you could take as a parameter to know how close you are to reach infinity. Besides, Infinity CAN'T be „reached“!
It is evident! (but not for you, of course)
At school they mess up two different concepts: Endless and Infinite.
What is normally called an Infinite Sum is, in fact, an Endless Sum.
It is not Infinite, because it has a beginning and Endless because it has no End.
You mix up those ideas and choose the wrong one to describe an endless progression, calling it Infinite. (…and want to look smart to that).
Try to think first before you take it for granted what your teacher tells you.
@@MrSummitville
…and no, the answer is not still Zero.
You can’t prove it. You just assume it.
Your day job