Forum Studenti •AM2 Lez.19 - funzione hard-hard

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Forum Studenti •AM2 Lez.19 - funzione hard-hard

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AM2 Lez.19 - funzione hard-hard

Inviato: sabato 22 marzo 2014, 17:29

da GIMUSI

per la funzione da [tex]\math R^2[/tex] a [tex]\math R[/tex] con 2 punti stazionari di minimo assoluto avrei pensato alla seguente:

[tex]f(x,y)=(1+x^4+y^4)/x^2[/tex]

Re: AM2 Lez.19 - funzione hard-hard

Inviato: domenica 23 marzo 2014, 14:16

da GIMUSI

o forse ancora meglio questa che è molto più semplice da studiare e anche continua:

[tex]f(x,y)=xy+x^4+y^4[/tex]

Re: AM2 Lez.19 - funzione hard-hard

Inviato: giovedì 27 marzo 2014, 21:35

da Massimo Gobbino

Uhm, mi preoccupa che nessuno protesti

. Tutti morti ... o nessuno sta seguendo?

Re: AM2 Lez.19 - funzione hard-hard

Inviato: giovedì 27 marzo 2014, 22:20

da GIMUSI

Re: AM2 Lez.19 - funzione hard-hard

Inviato: domenica 29 giugno 2014, 18:06

da GIMUSI

potrebbe essere questa la famigerata funzione con due punti stazionari di max :?:

[tex]f(x,y)=|x|e^{-(x^2+y^2)}[/tex]