/math/ - no eureka for today, gentlemen - Mathematics

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25 Dec 2021	Mathchan is launched into public

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Anonymous July 28, 2022 (Thu) 20:08:08 No. 257

>>258 >>452 >>335

no eureka for today, gentlemen

>>

Anonymous July 30, 2022 (Sat) 18:36:27 No. 258

>>257
You are trying to derive cubic formula?

>>

Anonymous July 30, 2022 (Sat) 20:18:37 No. 259 >>628

trying to use the same idea of bisquare equations for a cubic equation...

>>

Anonymous November 25, 2022 (Fri) 05:43:23 No. 335

>>257
Keep trying...sooner or later, you'll understand.

>>

Anonymous December 31, 2022 (Sat) 07:16:32 No. 337

why not just use sage math? super ez to solve long equations

>>

Anonymous July 09, 2023 (Sun) 03:35:51 No. 452

>>257
We'll get em next time buddy

>>

Anonymous January 25, 2024 (Thu) 13:53:21 No. 628

>>259
Do you know Tschirnhaus transformation?? If yes you do, you'll can use it.

>>

Anonymous January 30, 2024 (Tue) 19:31:01 No. 631 >>639 >>633

Not OP, but I derived it 2 days ago while using toilet.

And it was for the most basic version of the problem:

x^3 + x + a = 0

But it can probably be transformed into any cubic formula if you set

x = sy+t

and multiply left side by some constant.

I didn't really derive it, I just guessed it should be in form:

x = \sqrt[3]{p + q} + \sqrt[3]{p - q}

When I use it in the equation, I get:

(\sqrt[3]{p + q} + \sqrt[3]{p - q})^3 + \sqrt[3]{p + q} + \sqrt[3]{p - q} + a = 0

p + q + 3\sqrt[3]{p + q}\sqrt[3]{p + q}\sqrt[3]{p - q} + 3\sqrt[3]{p + q}\sqrt[3]{p - q}\sqrt[3]{p - q} + p - q

+ \sqrt[3]{p + q} + \sqrt[3]{p - q} + a = 0

2p + 3\sqrt[3]{p + q}\sqrt[3]{p^2 - q^2} + 3\sqrt[3]{p - q}\sqrt[3]{p^2 - q^2} + \sqrt[3]{p + q} + \sqrt[3]{p - q} + a = 0

2p + 3(\sqrt[3]{p + q} + \sqrt[3]{p - q})\sqrt[3]{p^2 - q^2} + \sqrt[3]{p + q} + \sqrt[3]{p - q} + a = 0

(2p + a) + ( 1 + 3\sqrt[3]{p^2 - q^2})(\sqrt[3]{p + q} + \sqrt[3]{p - q}) = 0

In order for this equation to be satisfied I'll break this equation in two:

\begin{cases} 2p + a = 0 \\ ( 1 + 3\sqrt[3]{p^2 - q^2})(\sqrt[3]{p + q} + \sqrt[3]{p - q}) = 0 \end{cases}

\begin{cases} p = -\frac{a}{2} \\ 1 + 3\sqrt[3]{p^2 - q^2} = 0 \end{cases}

Then we solve

q

:

1 + 3\sqrt[3]{-\frac{a^2}{4} - q^2} = 0

\sqrt[3]{-\frac{a^2}{4} - q^2} = -\frac{1}{3}

-\frac{a^2}{4} - q^2 = -\frac{1}{27}

q^2 = -\frac{a^2}{4} + \frac{1}{27}

q = \sqrt{-\frac{a^2}{4} + \frac{1}{27}}

and thus:

x = \sqrt[3]{-\frac{a}{2} + \sqrt{-\frac{a^2}{4} + \frac{1}{27}}} + \sqrt[3]{-\frac{a}{2} - \sqrt{-\frac{a^2}{4} + \frac{1}{27}}}

Also shoutout to the admin. Some fan of Lukyon on soyjak.sharty thinks that you are the good person to discover if manga Lukyon is a virgin. A bit silly question, but he really begged me to ask it. :(

>>

Anonymous February 01, 2024 (Thu) 09:27:41 No. 633 >>638

>>631
I've never thought math in the toilet, but this morning I tried it and I found a root for radicals of (2k+1)th-degree equations, THANKS dude! I hope in tomorrow. I'm not OP.

>>

Anonymous February 01, 2024 (Thu) 19:34:44 No. 638

>>633
To be honest talking about pooping is a bit cringe for me, but you won't get bored on a toilet if you do maths. :)

>>

Anonymous February 01, 2024 (Thu) 19:39:13 No. 639 >>641

Also I had error in >>631

I left minus after squaring and the end should be like this:

"Then we solve

q

:

1 + 3\sqrt[3]{\frac{a^2}{4} - q^2} = 0

\sqrt[3]{\frac{a^2}{4} - q^2} = -\frac{1}{3}

\frac{a^2}{4} - q^2 = -\frac{1}{27}

q^2 = \frac{a^2}{4} + \frac{1}{27}

q = \sqrt{\frac{a^2}{4} + \frac{1}{27}}

and thus:

x = \sqrt[3]{-\frac{a}{2} + \sqrt{\frac{a^2}{4} + \frac{1}{27}}} + \sqrt[3]{-\frac{a}{2} - \sqrt{\frac{a^2}{4} + \frac{1}{27}}}

Also shoutout to the admin. Some fan of Lukyon on soyjak.sharty thinks that you are the good person to discover if manga Lukyon is a virgin. A bit silly question, but he really begged me to ask it. :("

>>

Anonymous February 02, 2024 (Fri) 20:53:58 No. 641 >>648

>>639
Why are you complitated your life?
There are at least two different easy ways to solve

x^3+px+q=0

One of these is

x=y+\frac{a}{y}

y^3+\frac{a^3}{y^3}+(3a+p)\left(y+\frac{a}{y}\right)

+q=0

\begin{cases} 3a+p=0\Rightarrow a=-\frac{p}{3} \\y^6+qy^3-\frac{p^3}{27}=0 \end{cases}

y^3=-\frac{q}{2}\mp \sqrt{\frac{q^2}{4}+ \frac{p^3}{27}}

\boxed{x=\sqrt[3]{-\frac{q}{2}+\sqrt{\frac{q^2}{4}+ \frac{p^3}{27}}}+\frac{-\frac{p}{3}}{\sqrt[3]{-\frac{q}{2}+\sqrt{\frac{q^2}{4}+ \frac{p^3}{27}}}}}

>>

Anonymous February 11, 2024 (Sun) 13:55:50 No. 648 >>649

>>641
Because I love reinventing the wheel

>>

Anonymous February 12, 2024 (Mon) 09:07:15 No. 649 >>650

>>648

you are started from solution when you wrote

x=sqrt[3]{p+q}+sqrt[3]{p-q}

If you reinvente the wheel how do you solve

x^5+px^2+qx+t=0

or

x^6+ax^3+bx^2+cx+d=0

?

>>

Anonymous February 12, 2024 (Mon) 09:11:18 No. 650 >>651

>>649
Me again, edit: when you wrote

x=\sqrt[3]{p+q}+\sqrt[3]{p-q}

sorry for the mistakes

>>

Anonymous February 12, 2024 (Mon) 12:15:12 No. 651

>>650
I said that I guessed it. I kinda remembered the outlook of the original solution with the sum of two cubic roots, but I didn't remember what was inside.

>>

Anonymous April 15, 2024 (Mon) 16:48:07 No. 702

AAAAAAAAA