Eduardo The Creator
ETC here
hello, I'm an Ordinary leader of the ETF team who was born in 2020 even tho the oldest was Sequarely 2017. I'm a completely cringed guy with over 220 subs for being too cringe in the past. Anyways I was active a bit because recently I was being too sus during my MSM era, which cause me to get 2 community guidelines strikes. so I don't wanna be violent or sussy like any other dirty minded people do. And yep, BYE!
bleh bleh bleh Bleh🤑🤑🤑🤑🤑
I have also devolved...Because of the incident I received for the past 2 YEARS
Eduardo The Creator
‪@totallyDGTF‬ سأØولك إلى سومبونجيرو
1 week ago | [YT] | 0
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Eduardo The Creator
Happy Halloween
4 weeks ago | [YT] | 0
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Eduardo The Creator
Happy Halloween
4 weeks ago | [YT] | 0
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Eduardo The Creator
I am alive
But I hate kpop demon hunters(my opinion don't teriminate me)
This spelling is too much I will literally crash out
1 month ago (edited) | [YT] | 0
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Eduardo The Creator
I witness and The secret
1 month ago | [YT] | 1
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Eduardo The Creator
@Elite Sequarely is back but this time, he's mentioned. Finally
1 month ago | [YT] | 1
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Eduardo The Creator
Recently peak
2 months ago | [YT] | 2
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Eduardo The Creator
1 to any power always equals 1 because of the fundamental property of exponents in mathematics. This is due to the fact that 1 is considered a multiplicative identity, meaning it doesn't change the value when used as a base in an exponent. Any number raised to zero (except for zero itself) also equals one - this being another rule for dealing with powers and roots mathematically speaking...
2 months ago | [YT] | 0
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Eduardo The Creator
The equation x² + y² = c is a second-degree polynomial in two variables, where x and y represent the coordinates of points on a plane. The graph of this equation forms a circle centered at the origin (0, 0) with radius √c. For any point (x, y) that lies on this circle, the sum of their squared coordinates will equal c.
There are infinitely many solutions to this equation since there are infinitely many points along the circumference of such circles in Euclidean space geometry - each distinct pair being mathematically unique yet collectively forming one cohesive geometric shape when plotted together as per its algebraic definition given initially here above.
2 months ago | [YT] | 1
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Eduardo The Creator
Ykw? I'ma just post something that @The Secret NOT Detectiver likes
2 months ago | [YT] | 1
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