Bei Fertigpackungen, die gewerbsmäßig in Verkehr gebracht werden, muss der [b]Mittelwert der Abfüllung[/b] die Nennfüllmenge [b]NF [/b]erreichen/überschreiten. [br][br]Zusätzlich wird eine [color=#980000]Minusabweichung MA[/color] von der [color=#980000]Nennfüllmenge NF[/color] als untere Grenze,[br][color=#980000]technische Untergrenze TU1[/color][br]TU[sub]1[/sub] = NF - MA[br]vorgegeben, die von max. 2% aller abgefüllten Einheiten unterschritten werden darf. [br] [br][img]data:image/png;base64,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[/img][br][br]Eine Fertigpackung mit einer Minus-Gewichtsabweichung kleiner[br]TU[sub]2[/sub] = NF - 2*MA[br]darf nicht in den Verkehr gebracht werden. Die Minusabweichung entnehmen sie der FPVO: [br][br][table][tr][td]Nennfüllmenge g bzw. ml[/td][td]Zulässige Minusabweichung[/td][/tr][tr][td]5 -50[br][/td][td]9%[/td][/tr][tr][td]50 - 100[/td][td]4.5 (g, ml)[/td][/tr][tr][td]200 - 200[/td][td]4.5%[/td][/tr][tr][td]200 - 300[/td][td]9 (g, ml)[/td][/tr][tr][td]300 - 500[/td][td]3%[/td][/tr][tr][td]500 - 1000[/td][td]15 (g, ml)[/td][/tr][tr][td]1000 - 10 000[/td][td]1.5%[/td][/tr][/table][br]Die ideale Abfüllverteilung folgt der Normalverteilung[br][br][img]data:image/png;base64,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[/img][br]

Darstellung und Abhängigkeiten der Abfüllstatistik[br][br][table][tr][td][b]Mittelwert[/b][/td][td][b]Standardabweichung[/b][/td][td][b]Nennfüllmenge[/b][/td][td][b]GiveAway[/b][/td][td][b]TU1[/b][/td][td][b]TU2 [/b][/td][/tr] [tr][td]Füllmenge[br]Zielwert[br][br]einziges [br]Stellglied[br]der Abfüllung[br][br][br][/td][td]Gegeben, Fix: [br]stellt sich ein [br]aus Abfüllgut [br]und [br]Abfülltechnik [br](Abfüllanlage)[br]Maschinen-[br]konstante[br][/td][td]Nennfüllmenge[br]rechtlich[br]verbindlicher[br]mindest. Mittelwert[br]der Abfüllung[br]NF oder QN[br][br][br][/td][td]die Spanne,[br]die zwischen[br]Nennfüllmenge[br]und tatsäch-[br]lichem Mittel-[br]wert der [br]Abfüllung liegt[br]Überfüllung[br][/td][td]max. 2% der [br]Abfüllungs-[br]Ergebnisse[br]darf [br]unter der[br]Grenze TU1[br]liegen[br][br][/td][td]unter TU2[br]darf nicht [br]a.d.V[br]abge-[br]geben[br][br][br][br][/td][/tr][/table][br]In der Praxis muss der Mittelwert so hoch eingestellt werden, dass TU1 erfüllt wird. Einheiten unter TU2 werden an Kontroll(waagen) ausgesondert.[br]In der App liegt der Anteil unter TU1 gewichtiger Packungen bei 0.0325 (~3.25%) der Mittelwert der Abfüllanlage (das abzufüllende Gewicht) muss eingestellt werden auf mind. [br][br]Beispiel in App: μ=257.6g, σ=9g[br][br]q[sub]2%[/sub] = InversNormal(0,1,2%) =2.0538 σ für einen 2%-Anteil unter TU1 [br][color=#cc0000]- Mindestabstand | μ - TU1 | = 2.0538 σ Standardabweichungen [/color][[size=85]Aussage der Normalverteilung[/size]][br][br]μ[sub]TU1[/sub] = TU1 + q[sub]2%[/sub]*σ = 241 + 2.0538*9 = 259.5 [br]Neuer Mittelwert (Füllmenge) bei Standardabweichung 9 g damit ==> AnteilUnterTU1 = 0.02 (2%).[br][br]σ[sub]max[/sub] = (μ - TU1) / q[sub]2%[/sub] = (257.6 - 241) / 2.0538 = 8.08 [br]max. Standardabweichung bei einem Mittelwert (Füllmenge) 257.6 g damit ==> AnteilUnterTU1 = 0.02 (2%)[br][br]Klick/Touch Anzeige im Grafikfenster um Wert zu setzen!