Questão 6

Considere que os sistemas lineares são da forma abaixo.[br][img]data:image/png;base64,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[/img][br]Onde [b]a, b, d, e [/b]são os coefiecientes e [b]c, f[/b] os termos independentes.
a)
Escreva abaixo um sistema possível e indeterminado.[br]
Represente esse sistema no plano cartesiano.
b)
Escreva abaixo um sistema impossível.
Represente esse sistema no plano cartesiano.
Close

Information: Questão 6