| For the main one, see Euler's identity. |
| For other math-related pages, see here. |
Euler's identity's clones are multiple clones seen in Animation vs. Math.
Appearance[]
The clones are the same as Euler's Identity, some are expressed in their Taylor Expansion Form.
Role[]
Euler's identity clones himself by exchanging different forms that contain more the one eiπ within the equation. They charge at The Second Coming, crowding him inside the mathematical constant circle. With only having the = f (•) item, he goes near the top by multiplying an axis by π, going from 0 to π radians. And gets the Infinity symbol off of one of the Taylor Expansions, turning it into the = f (∞) item. He kills all except for 3 clones along with the real Euler's identity, and the remaining make Numberzilla by clone and changing forms again, the forms and equations group together. The Second Coming seeing this, blasted another shot of = f (∞), only to be caught by Numberzilla with his summation hand and treated with a limit, which handle infinities. When summation is met with a limit going to infinity, it's easy to think that is would form an improper integral with bounds that contain infinity. Numberzilla is now complete. He wields the integral at The Second Coming, and The Second Coming is no match for the integral with = f (∞). After retreating into the mathematical constant circle, he gets the = f (•) Item and hits it with the cos and isin symbol, making the identity spiral again, this time with the power of the tangent function, forming a large ray hit on them that kills the clones that were inside the Numberzilla as the real Euler escapes.
Trivia[]
- The clones turn into zeros when killed, since they are subtracted out of existence.