WHAT THE HELL IS A POLYNOMIAL!!!!!!

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Dohko: WHAT HAPPENED!?

Shion: I DON'T KNOW! HE ACTS LIKE HE'S POSSESSED, HE'S TALKING LATIN OR SOMETHING I DON'T KNOW!!!

Saga: isosceles triangle and hyperbolic equation results in polynomial simplification

Shion: YOU SEE!? I think he got surmenage!

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Hello everyone!

To celebrate Christmas, I've decided to fabricate a Christmas Monstertopia!

This monster has Polynomial Division, Inverse Functions, Exponential Equations, and Rational Functions.

I call him,
"Seeing Christmas"

Merry Christmas! 🎄
https://t.co/P0UnFYEpeb

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"arcane style, portrait of Emma Watson"
Euler_a / cfg 7 for A - 9 for B-D

A) Dreambooth on SD 1.5 - 10K steps - lr 5e-7 - constant
B) DB on SD 2-768 - 3K steps - 1e-6 - constant
C) DB on SD 2-768 - 3K steps - 5e-7 - constant
D) DB on SD 2-768 - 3K steps - 5e-7 - polynomial

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【Shor's algorithm】

Shor's algorithm is
a polynomial-time quantum computer algorithm for integer factorization. Informally,

it solves the following problem:
Given an integer, find its prime factors.

It was discovered in 1994 by the American mathematician Peter Shor.

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All polynomials with coefficients ±1, orders from 3 to 6. The values are Tanh-scaled.

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Computational Discovery with Newton Fractals,Bohemian Matrices & Mandelbrot Polynomials

https://t.co/V1JyRfLaV2

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I know nothing about BFB all i know is this guy sucks, his shitty smug grin reminds me of all the polynomials my math teachers made me factor in high school. might hit him with my car later idk

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>Usually they'd never be as pretty or as simple as this, but we all need to start somewhere.
>I'm using the example from https://t.co/WxVAIQwNLV , so refer to that more a in depth explanation. I would create a polynomial myself, but ehh. Nah. Nope!

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>So.. I said I was going to cover graphical transformations... But I've decided against it.
>I'll be covering how to sketch functions without a calculator today, since I'm way too disinterested to spend another day on concepts alone.
>We'll be using this polynomial as an example:

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>You should know that the end behavior of polynomials are determined by its leading coefficient's exponent.
>If it's even, the end behavior for both sides will be the same. If odd, they'll be different.
>Here, I have f(x)=x^2 and f(x)=x^3 as our wonderful little examples.

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>Right, right. I'll get on. We'll be covering limits for the first week. It'll include how to predict them, how to graph polynomials and functions from hand, and much more!
>Are you feeling excited?

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writes on Sarah Peluse's proof of a bound for sets containing a polynomial progression

https://t.co/nQ6sxLOT85

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こたえ
かいなし
たこうしき

Polynomial function of you and me
is no solution.

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Testing higher-order polynomials on quads. In you can mix bases/spaces, and can mix entities types on the mesh. Here triangles and quads with 4th order polynomials. BTW Implementation (reaction-diffusion) of the physics is transparent for the chosen base and element.

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👀 polynomials i dont know her (ill probably fully colour it this is just wip)

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Solving Polynomial Systems with phcpy. https://t.co/euzThwfezr

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