Benutzer:Lena F. WWU-5/LGS: Unterschied zwischen den Versionen

${\displaystyle I) }$ ${\displaystyle 2x + 3y =13 }$

${\displaystyle II) }$ ${\displaystyle 8x + 3y = 16 }$

Addiere Gleichung ${\displaystyle I) }$ zu Gleichung ${\displaystyle II) }$.

${\displaystyle I) }$ ${\displaystyle 2x + 3y =13 }$

${\displaystyle II) }$ ${\displaystyle 6x + 0y = 3 }$

Berechne die Lösung für Gleichung ${\displaystyle II) }$.

${\displaystyle 6x + 0y = 3 }$ ${\displaystyle |:6 }$

${\displaystyle x = \frac{3}{6}}$

${\displaystyle x = \frac{1}{2} }$

Setze den x-Wert in Gleichung ${\displaystyle I) }$ ein.

${\displaystyle 2 \cdot \frac{1}{2} + 3y =13 }$

${\displaystyle 1 + 3y = 13 }$ ${\displaystyle | -1 }$

${\displaystyle 3y = 12 }$

${\displaystyle y = 4 }$

Lösung:

${\displaystyle x = \frac{1}{2} }$

${\displaystyle y = 4 }$

${\displaystyle I) }$ ${\displaystyle \frac{3}{2}x + 4y =30 }$

${\displaystyle II) }$ ${\displaystyle \frac{1}{4}x - 2y = -3 }$

Multipliziere Gleichung ${\displaystyle I) }$ mit 2.

${\displaystyle I) }$ ${\displaystyle \frac{3}{2}x + 4y = 30}$

${\displaystyle II) }$ ${\displaystyle \frac{1}{2}x - 4y = -6 }$

Addiere die Gleichung ${\displaystyle I) }$ zu Gleichung ${\displaystyle II) }$.

${\displaystyle I) }$ ${\displaystyle \frac{3}{2}x + 4y = 30 }$

${\displaystyle II) }$ ${\displaystyle 2x + 0y = 24 }$

Berechne die Lösung für Gleichung ${\displaystyle II) }$.

${\displaystyle 2x + 0y = 24 }$ ${\displaystyle |:2 }$

${\displaystyle x = 12}$

Setze den x-Wert in Gleichung ${\displaystyle I) }$ ein.

${\displaystyle \frac{3}{2} \cdot 12 + 4y = 30 }$

${\displaystyle \frac{36}{2} + 4y = 30 }$

${\displaystyle 18 + 4y = 30 }$ ${\displaystyle | -18 }$

${\displaystyle 4y = 12 }$ ${\displaystyle | :4 }$

${\displaystyle y = 3 }$

Lösung:

${\displaystyle x = 12 }$

${\displaystyle y = 3 }$

${\displaystyle I) }$ ${\displaystyle x + \frac{1}{2}y - z =15 }$

${\displaystyle II) }$ ${\displaystyle x - \frac{1}{2}y + z = 5 }$

${\displaystyle III) }$ ${\displaystyle -x + y + z =15 }$

Addiere die Gleichung ${\displaystyle I) }$ und ${\displaystyle II) }$ und die Gleichung ${\displaystyle I) }$ und ${\displaystyle III) }$

${\displaystyle I) }$ ${\displaystyle x + \frac{1}{2} y - z = 15 }$

${\displaystyle II) }$ ${\displaystyle 2x + 0y + 0z = 20 }$

${\displaystyle III) }$ ${\displaystyle 0x + \frac{3}{2} y + 0z = 30 }$

Berechne die Lösung für Gleichung ${\displaystyle II) }$ und ${\displaystyle III) }$.

${\displaystyle II) }$ ${\displaystyle 2x = 20 }$ ${\displaystyle |:2 }$

${\displaystyle II) }$ ${\displaystyle x = 10 }$

${\displaystyle III) }$ ${\displaystyle \frac{3}{2}y = 30 }$ ${\displaystyle | \cdot \frac{2}{3} }$

${\displaystyle III) }$ ${\displaystyle y = 20}$

Setze den x-Wert und den y-Wert in Gleichung ${\displaystyle I) }$ ein.

${\displaystyle 10 + \frac{1}{2} \cdot 20 - z = 15 }$

${\displaystyle 10 + 10 - z = 15 }$

${\displaystyle 20 - z = 15 }$ ${\displaystyle | -20 }$

${\displaystyle -z = -5 }$ ${\displaystyle | \cdot (-1) }$

${\displaystyle z = 5 }$

Lösung:

${\displaystyle x = 10 }$

${\displaystyle y = 20 }$

${\displaystyle z = 5 }$

Die Variable x steht für die Burger. Die Variable y steht für die Portion Pommes. Das zu lösende Gleichungssystem ist: ${\displaystyle I) }$ ${\displaystyle x + 2y = 5,10 }$

${\displaystyle II) }$ ${\displaystyle 2x + 2y = 7,20 }$

Subtrahiere die Gleichung ${\displaystyle I) }$ von der Gleichung ${\displaystyle II) }$.

${\displaystyle I) }$ ${\displaystyle x + 2y = 5,10 }$

${\displaystyle II) }$ ${\displaystyle x + 0y = 2,10 }$

Setze nun den x-Wert in die Gleichung ${\displaystyle I) }$ ein.

${\displaystyle I) }$ ${\displaystyle 2,10 + 2y = 5,10 }$ ${\displaystyle | -2,10 }$

${\displaystyle I) }$ ${\displaystyle 2y = 3 }$ ${\displaystyle |:2 }$

${\displaystyle I) }$ ${\displaystyle y = 1,50 }$

${\displaystyle x = 2,10 }$

${\displaystyle y= 1,50 }$