Nọ́mbà áljẹ́brà

Ninu mathematiiki, nomba aljebra je nomba tosoro kan to je wewe polynomial tikoje-odo ni oniyekiye eyo kan pelu oniipin (tabi lonibamu, odidi) afisodipupo. Awon nomba bi ${\displaystyle \pi }$ ti won ki se ti aljebra ni won so pe won je transcendental; Bi gbogbo won nomba gidi ni won je transcendental.

Nọ́mbà áljẹ́brà

Àwọn àpẹrẹ

• Àwọn nọ́mbà gidi, tí wọ́n jẹ́ gbígbékàlẹ̀ bíi ìpín nọ́mbà odidi méjì a àti b, tí b kò dọ́gba mọ́ òdo, nitelorun ìtumọ̀ ọkè nítorí ${\displaystyle x=a/b}$  ni wẹ́wẹ́ ${\displaystyle bx-a}$ .^[1]

• Àwọn nọ́mbà aláìníìpín kan jẹ́ ti áljẹbrà, àwọn kan kò jẹ́ bẹ́ẹ̀:

• Àwọn nọ́mbà ${\displaystyle \scriptstyle {\sqrt {2}}}$  àti ${\displaystyle \scriptstyle {\sqrt[{3}]{3}}/2}$  jẹ́ ti áljẹ́brà nítorípé àwọn ni wẹ́wẹ́ àwọn polynomials ${\displaystyle x^{2}-2}$  àti ${\displaystyle 8x^{3}-3}$ , nitelentele.

• Ipin oniwura ${\displaystyle \phi }$  je ti aljebra nitoripe o je wewe kan polynomial ${\displaystyle x^{2}-x-1}$ .

• Awon nomba ${\displaystyle \pi }$  ati ${\displaystyle e}$  ko je nomba aljebra (e wo Lindemann–Weierstrass theorem);^[2] nitori eyi won je transcendental.

• Awon nomba kiko (those that, starting with a unit, can be constructed with straightedge and compass, e.g. the square root of 2) je ti aljebra.

• Awon quadratic surd (awon wewe quadratic polynomial ${\displaystyle ax^{2}+bx+c}$  pelu awon odidi afisodipupo ${\displaystyle a}$ , ${\displaystyle b}$ , ati ${\displaystyle c}$ ) je nomba onialjebra. Ti quadratic polynomial ba je monic ${\displaystyle (a=1)}$  nigbana awon wewe je quadratic integer.

• Awon nomba odidi Gauss: awon nomba tosoro ${\displaystyle a+bi}$  nibi ti ati ${\displaystyle a}$  ati ${\displaystyle b}$  je odidi na tun je quadratic integers.

Awon ini nomba aljebra

 

Algebraic numbers coloured by degree.

• Akojopo awon nomba aljebra je siseeka (enumerable).^[3]
• Bi be, akojopo awon nomba aljebra ni iwon Lebesgue odo (gege bi akojopoabe fun awon nomba tosoro)

Itokasi

1. Some of the following examples come from Hardy and Wright 1972:159-160 and pp. 178-179
2. Also Liouville's theorem can be used to "produce as many examples of transcendentals numbers as we please," cf Hardy and Wright p. 161ff
3. Hardy and Wright 1972:160