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)
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Comune di
Giano dell’Umbria
(Provincia di Perugia)
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C.F. P.IVA : 00470070541
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SETTORE CONTABILE E DEL PERSONALE - SERVIZIO TRIBUTI - ECONOMATO
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' 0742 931942 - 7 0742 90137 / tributi@giano.umbria.it
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![](data:image/png;base64,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)
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AVVISO PUBBLICO
Calcolo TARI: nessun errore per il Comune di GIANO DELL’UMBRIA
Relativamente alle vicende inerenti errori nel calcolo della TARI che stanno interessando alcuni comuni italiani, il Comune di GIANO DELL’UMBRIA approfitta della seguente nota per comunicare ai cittadini che nessuna irregolarità è avvenuta nei conteggi degli atti emessi.
Le criticità di cui gli organi di informazione riportano notizia riguardano la quota variabile della tassa. Introdotta nel 2014 per finanziare il servizio di raccolta e smaltimento dei rifiuti, la TARI è infatti composta da una quota fissa ed una variabile.
La prima è calcolata in proporzione ai metri quadrati dell'abitazione, la seconda è legata al numero dei membri della famiglia.
In taluni casi quest'ultima è stata maggiorata tante volte quante sono le pertinenze dell'abitazione, mentre in realtà andrebbe calcolata una sola volta sull'insieme di casa e pertinenze immobiliari, cioè soffitte, cantine, box e posti auto, tenuto conto sempre del numero dei familiari.
É proprio quest'ultimo il criterio adottato dal Comune di GIANO DELL’UMBRIA nell'emissione degli atti.
Nello specifico, infatti, la quota fissa della tariffa per le utenze domestiche è ed è stata determinata applicando alla superficie dell’alloggio e dei locali che ne costituiscono pertinenza le tariffe per unità di superficie parametrate al numero degli occupanti; la tariffa della quota variabile è ed è stata determinata, invece, in relazione al numero degli occupanti per le utenze domestiche.
Quest'ultima è un costo fisso che il nucleo familiare è tenuto a pagare in base al numero dei componenti ed è costituita dalla somma di tutti quei costi variabili che il Comune sostiene per differenziare, trattare e smaltire i rifiuti.
In sintesi se un nucleo familiare abita in un appartamento ed utilizza le sue pertinenze - soffitta, garage, cantina – è tenuto a pagare una sola volta quel costo fisso dato dalla quota variabile, mentre la quota fissa è rapportata alla superficie totale dell’immobile - appartamento, garage, soffitta, etc -, ed è così che il COMUNE DI GIANO DELL’UMBRIA ha calcolato dalla sua istituzione le tariffe per il pagamento della TASSA SUI RIFIUTI.
Giano dell’Umbria, lì 16 novembre 2017
Il Funzionario Responsabile TARI
F.to Severio Rosati