Комментарии:
So so nicely explained, I wish I had got to see this many many years ago when I was a school kid.
ОтветитьHow can other infinity’s be bigger than others
ОтветитьThis is impossible
ОтветитьThank you sir it helped me so much 😊😊
Ответитьhii i want to know how u make video like this
ОтветитьAmazing animation... Clear understanding! 🎉
ОтветитьWow my whole class is watching this
ОтветитьPerfect 👌🏻😊
ОтветитьMathematics is an art. Today, i witnessed it. 😮
Truly magical🤯
Thank you 😊
ОтветитьDunno what I'm doing here in 2024
ОтветитьPerfect explanation
ОтветитьQuestion: Is a 1/2-inch diameter (.5 inch) half the area of a 1-inch diameter (1.0 inch)? etc.
Asking for a friend :)
Awesome. These animations in correlation with the narration made this whole thing easy and concise to understand. How were these animations Made? Some animations look CPU/GPU intense.
ОтветитьBest Video Ever 🎉🎉🎉🎉😊😊😊
ОтветитьExcellent! Thank you.
Ответитьi thought the equation meant half the circumference times it self but now i understand that its not necessarily correct
ОтветитьYou can also very easily just use plain ol’ integration, where you divide the circle into infinitely many rings
ОтветитьHe could have gone even deeper and show that the circumference is 3.14 x diameter. So 3.14 x 2 x r. Which is 2x pi x r.
ОтветитьThis is a a good example of Lim as
X approaches O.
Great illustration but why not inform us dunces what Pi equals?
ОтветитьHow did you know the base is equal to half circumference? What is the formula?
ОтветитьOk now the math is mathing..
Ответитьwhat a clear explanation you have done💯❣gd luck💫
Ответитьwhooaa
ОтветитьThanksgivings Math: I have two pumpkin pies that are the same thickness. I want to cut them up so that each slice has the same mass (same surface area should work) while keeping the slices a reasonable portions. The answer for each pie should be an integer number of slices, meaning no odd parts left over. One pie is 12 inches, the other is 8 inches. For extra credit, include a 9 inch size.
Ответитьexcellent
ОтветитьMy friend told me that squares and circles are the same thing and i sent this video to them
ОтветитьSir Please also make a video circumfernce and how Pie came
Ответитьthats excellent
ОтветитьThe best explanation iv seen
ОтветитьWhich software you have used to illustrate the diagrams
ОтветитьInformative
ОтветитьBase is half of circumference not one half
And its half because we are joining those slices from top and bottom
what software are you using in making this awesome video
ОтветитьIf you are a master of math, pls help me to find information about "How to calulate the flat part of surface on the sphere". Some people say that flatness can't exist on "perfect" round sphere in theory but practicaly it is possible. For dumb example just to understand we have football fields on Earth, they are flat. The question is How much is a flat part possible on Eath or how to calculate this part of surface of sphere, at least on perfect round?
ОтветитьNon è corretta
La sua formula
Sebbene ha inizio valido
Procedimento
pizza on school parties:
ОтветитьBeautiful explanation and animation. Thank you
Ответитьwow
ОтветитьNice Explanation. Which software you have used to make this video?
Ответитьi was hapy with Cr/2 .. half cr 👍
ОтветитьSo why doesn’t 2 times the base over 2 times the height = pi?
2 times the base = circumference
And
2 times the high = diameter
Circumference/diameter=pi
someone hire him
ОтветитьWhere is the proof for the circumference of the circle formula, aye?
ОтветитьUtterly magnificent explanation and easy as pi to understand . . . . . . (Sorry, couldn't resist, even if it has been said hundreds of millions of times before)
ОтветитьI hope you can made a video explaning why .. i squared = -1 .. in complex numbers .. thank you again
ОтветитьAfter your video -, I watched Archimedes, a useful way of both.
ОтветитьThe part where he divided the circumference into a half a bit trippy...but 😕🙌
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