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)
48
Verwenden des MATRIX-Editors (Fortsetzung)
Taste Ergebnis
† Í
Í
Sie können die resultierende Matrix wie folgt interpretieren:
[1 0 5] stellt 1X + 0Y = 5 oder X = 5 dar
[0 1 3] stellt 0X + 1Y = 3 oder Y = 3 dar
Die Lösung dieses Gleichungssystems lautet: X = 5, Y = 3.