Laserpointer und Parabel

Brennpunktkoordinaten

Die Koordinaten des Brennpunktes kann berechnen wennman den Öffnungsfaktor kennt und zwar mit:

[math]y_b=4\frac{1}{a}[/math] [math]y_{b_{ }}=\frac{1}{4}a[/math] [math]y_b=\frac{1}{4a}[/math]

Öffnungsfaktor

Wenn man die Brennpunktkoordinaten kennt kann man den Öffnungsfaktor berechen und zwar mit

[math]a=\frac{1}{4}y_b[/math] [math]a=\frac{1}{4y_b}[/math] [math]a=4\frac{1}{y_b}[/math]

Graph

Das Bild zeigt den Graphen, die dem Öffnungsfaktor a die Brennpunktkoordinate zuordnet[br][img 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[/img][br]Welche Aussagen sind richtig?

spiegelt man den Graphen an der ersten Winkelhalbierenden, ist der gespiegelte Graph mit dem ursprünglichen identisch Der abgebildete Graph könnte auch der Brennpunktkoordinate den Öffnungsfaktor a zuordnen. Der Definitionsbereich kann nur für a>0, weil ansonsten die Parabel nach unten geöffnet wäre und keinen Spiegelung möglich wäre.

Brennpunktkoordinate

Berechnen Sie die Brennpunktkoordinate[br][img 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[/img][br]die erfoderlichen Angaben können Sie dem Schaubild entnehmen.

Prüfen Sie, ob die Zeichnung bezüglich Brennpunkt koordinate und Öffnungsfaktor richtig ist.

Information: Laserpointer und Parabel