Комментарии:
Amazing 🤩 🤩
Very informative video thanks 👍
there is only one number guess
ОтветитьPINGALA TRIANGLE :)
Ответить(73^n)(137^n).
ОтветитьTo start with, Mount Meru is in Africa, and India is in Southeast asia.
Why would indians call this Mount Meru?
Khayyam triangle 🔺️ wow
ОтветитьI bet they left out the Fibonacci sequence to get us to comment! Well played!
Ответитьالسلام عليكم salam alaïkum
Can u make video about pascal pyramid I need it
Thank u sir for this wonderful video
I was just trying to solve a Leetcode question but this video amazes me 🙂
ОтветитьYeah got it
ОтветитьYou are great mind
ОтветитьVery good except for the CE nonsense for Pascal's dates on earth.
ОтветитьTringle peeps
ОтветитьGood explatiion video child to pH d hoders
ОтветитьWhat.. i domt get it
Ответитьthis is called, WORK OF ART
ОтветитьI LOVE THIS VIDEO ! I just love those math videos that show perfect animation (cute) instead of just scribbling on a whiteboard. Five stars to you!
Ответитьcool, ty )
ОтветитьWell I'm no math teacher, but I know this solved Roulette's next number. So you geniuses go to work and tell me later how to use this somehow, like the guy I saw win each spin.
ОтветитьIt's always my nation India when comes to numbers & knowledge. ❤
ОтветитьI would call this triangle's 3d equivalent pascal's tetrahedron
ОтветитьThis is not great i didn’t understand anyting
ОтветитьThis is hard.
ОтветитьTed-Ed: triangular numbers
Me: STEP NUMBERS
Stuck on the third row - (x+y)^3 = x(x+y) y(x+y)^2. Yes I am in shock how he can evaluate all these equations perfectly without getting a different answer.
ОтветитьNo one seems to have mentioned this one so here goes: the second term of each expansion line of (x + 1)^n is the derivative of the first
Eg
(x + 1)^3
= x^3 + 3x^2 + 3x + 1
Second term, 3x^2 is the derivative of the first, x^3.
As you go down the rows this is always the pattern. This is where the ‘rule’ comes from.
I noticed an interesting pattern. All of the numbers formed are numeral palindromes, I.e, they stay the same even if reversed.
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Jai balayya Jai jai balayya🙏🙏
Jai balayya Jai jai balayya🙏🙏
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Jai BS 🤡
ОтветитьJai balayya Jai jai balayya🙏🙏
Jai balayya Jai jai balayya🙏🙏
Jai balayya Jai jai balayya🙏🙏
Jai balayya Jai jai balayya🙏🙏
And this video is recommended by prestigious BRAND Mini University BHAVANS 👏👏🏆🏆
ОтветитьModala video
Appreciate your work 🎉
And this video is recommended by prestigious BRAND Mini University BHAVANS 👏👏🏆🏆
Jai balayya Jai jai balayya🙏🙏
Jai balayya Jai jai balayya🙏🙏
Jai balayya Jai jai balayya🙏🙏
Jai balayya Jai jai balayya🙏🙏
Jai balayya
ОтветитьJai balayya
ОтветитьModala video
Appreciate that 🎉
And this video is recommended by prestigious BRAND Mini University BHAVANS 👏👏🏆🏆
ОтветитьAnd this video is recommended by prestigious BRAND Mini University BHAVANS 👏👏🏆🏆
ОтветитьJai balayya Jai jai balayya🙏
Jai balayya Jai jai balayya🙏🙏
Jai balayya Jai jai balayya🙏🙏
Jai balayya Jai jai balayya🙏🙏
Jai balayya Jai jai balayya🙏🙏
And this video is recommended by prestigious BRAND Mini University BHAVANS 👏👏🏆🏆
ОтветитьJai balayya
ОтветитьJAI BALAYYAA 🙏
JAI BALAYYAA 🙏
JAI BALAYYAA 🙏
JAI BALAYYAA 🙏
Jai ballYa ❤️
ОтветитьAn informative video spoiled somewhat by irritating vocal fry
ОтветитьWe use this in chemistry in nmr
ОтветитьIf you delete the last term ad create system of linear equations where in RHS are numbers of rows
you should get Bernoulli numbers with +1/2 as B_{1}
From Pascal's triangle we can get Fibonacci numbers
For every row, if you keep the ones digit of each term, carry the other digits to the terms to the left, then combine all the terms into one long number, that number would equal 11^(row number)
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