Die Konsequenzen einer Bewertung
Entweder fällt die Bewertung positiv aus oder sie ist negativ.
![](data:image/png;base64,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)
Das erste Bewertungsgespräch findet ab dem 5. Monat der Berufseingliederungszeit statt.
Wird Ihre Verfügbarkeit als positiv eingestuft, kommt es ab dem 10. Monat der Berufseingliederungszeit zu einem 2. Bewertungsgespräch. Fällt auch diese 2. Bewertung positiv aus, und alle anderen Zulassungsbestimmungen gemäß der Arbeitslosengesetzgebung sind erfüllt, wird Ihnen am Ende Ihrer Berufseingliederungszeit die Berufseingliederungszulage gewährt.
Erhalten Sie eine negative 1. Bewertung, kommt es ab dem ab dem 10. Monat der Berufseingliederungszeit zu einem 2. Bewertungsgespräch. Ein 3. Bewertungsgespräch findet ab dem 16. Monat Ihre Eingliederungszeit statt. Weitere notwendige Bewertungsgespräche werden fühestens alle 3 Monate festgelegt.
Ab dem 3. Bewertungsgespräch, und alle weiteren, müssen von dem Arbeitssuchenden jeweils schriftlich bei dem zuständigen Kontrolldienst angefragt werden.
Die Anzahl Bewertungsgespräche ist unbegrenzt. Erst wenn Sie insgesamt zwei positive Bewertungen erhalten haben, können Sie Ihr Berufseingliederungsgeld beantragen.
Warten Sie nicht, werden Sie schon jetzt aktiv, organisieren Sie Ihre Arbeitsuche, gehen Sie unsere Stellenangebote durch, kontaktieren Sie Unternehmen, verschicken Sie Bewerbungen, suchen Sie im Internet, schauen Sie regelmäßig bei uns oder bei einer unserer Partnereinrichtungen vorbei – und halten Sie alle Suchbemühungen schriftlich fest.
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