Webinar: Ottimizzazione del tempo ciclo di stampaggio
Mercoledì, 05 Aprile 2023 - ore 10:00
In questo webinar si mostrerà come andare ad analizzare i risultati di una simulazione ed individuare quali possano essere le variabili da tenere sotto controllo per ottenere con simulazioni successive un tempo ciclo volto a bilanciare le esigenze qualitative di risultato vs esigenze di minimizzazione del tempo ciclo.
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)
- Riempimento – Compattamento – Raffreddamento: analisi dei parametri che influiscono sui tempi totali di queste fasi
- Ottimizzazione e verifica delle varie fasi del ciclo
Il webinar è GRATUITO e verrà tenuto in italiano dal Centro di supporto Tecnico di Moldex3D ITALIA
Per registraTi, Clicca qui:
Lavorare con il CAD
- CATIA V4
- CATIA V5
- Creo (Pro/Engineer)
- Unigraphics/NX
- CIMATRON
- ACIS
- Parasolid
- SolidWorks
- Solid Edge
- Inventor