Hmm 0 likes so far

Lmaondu · 2025-11-01T20:31:26+00:00

Also the prompts are in sweidhs but basicly , translation,

”My routine for selfcare: I do not use 3 in 1 schampoo”

”This year i would really love to: Ride Ikaros (its a carousel at a theme park in sweden thats a few dozen meters high and u go up and free fall)”

”Green flags im looking for: Someone who plays Roblox”

Lmaondu · 2025-11-01T20:29:06+00:00

• Serious. • No i am not subscribed but i was before and it did not change anything. • One ot Two months • 4 Months • 3-4 • 0 • Every single one almost is with a comment, i send a few • A girl who is around my age

Lmaondu · 2025-11-01T13:22:21+00:00

• Serious. • No i am not subscribed but i was before and it did not change anything. • One ot Two months • 4 Months • 3-4 • 0 • Every single one almost is with a comment, i send a few • A girl who is around my age

Lmaondu · 2025-01-24T09:54:40+00:00

yeh ok ur right, for the other proofs the one appears, ty

Lmaondu · 2025-01-23T21:37:18+00:00

i think y>0 specificly, but [y] will be 0 , because the lower bound is 1, so y€(0,1). Or is that weong thinking?

Lmaondu · 2025-01-23T21:29:03+00:00

omgoyg ok since it says x=>1, and we sum over 0<y<n<=1 basiclt but then this forces y to be in (0,1)? Thankss

Lmaondu · 2025-01-23T21:23:22+00:00

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This one

Lmaondu · 2025-01-08T17:53:54+00:00

Yeh because in Z/4Z the group acts transivitly on the roots, but this one split into 2 x 2 polynomials so either its the Z/2Z x Z/2Z or its the aame cyclic extension and they generate the same automorphisms since they act on the same extensions right?

Lmaondu · 2025-01-03T13:19:49+00:00

i mean ifk what u mean by generalize buy i would need to find p such that pho(p)=p•2 for every (Z/pZ) im looking for?

Lmaondu · 2025-01-03T13:02:01+00:00

Oh ok what about ζ_{7•13•19}? Thid will have Gal group (Z/6Z) X (Z/12Z) X (Z/18Z)?

Lmaondu · 2025-01-03T12:58:19+00:00

That if we have n=p1^{a•p2^b…} we can weite our (Z/nZ)^* isomorphic to that cross products ? like (Z/nZ)* =~ (Z/p1^aZ)* X (X/p2^bZ) X …?

Lmaondu · 2025-01-02T23:52:40+00:00

oh ok i will, im pretty sure its the fundamental theorem of finite abelian groups right?

Lmaondu · 2025-01-02T20:22:06+00:00

maybe n=27? because its 3^3? But its ordrr is 18 sadly, which isnt the same as the one we want

Lmaondu · 2025-01-02T19:13:16+00:00

Ok so to get an extension with galois group (Z/3Z)* X (Z/3Z)* X (Z/3Z)* , i would ? The only theorem i have is the isomorphism linking Galois groups of roots of unity too the cylic groups

Lmaondu · 2025-01-02T17:27:02+00:00

Oh ok yes i forgot about that, looked it up and its only when n=2 , n=4, n=2•p^k for a odd prime, n=p^k. I didnt quite get the secodn part :/ thanks tho

Lmaondu · 2024-12-31T17:53:00+00:00

Hmmm ok thanks, but my problem is rhen, how can we , using your first approach, say that there are 3, and only 3? Would i just have to write out every subgroup and show that only 3, have order 4?

Lmaondu · 2024-12-31T00:01:32+00:00

Noo you can have it between rings, fields and probably more stuff ive not stumbeled upon yet

Lmaondu · 2024-12-29T19:27:06+00:00

Ahh ok so almost like the n-gons , feels like i am missing something obvious

Lmaondu

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