![Graphics](data:image/png;base64,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)
26
Σημαντικότερα θέματα ελέγχου
Πως αντιμετωπίστηκε το σημαντικότερο θέμα
ελέγχου στον έλεγχό μας
Aπομείωση άυλων περιουσιακών
στοιχείων
Όπως αναφέρεται στη σημείωση 2.9 και 11,
την 31
η
Δεκεμβρίου 2022, τα άυλα περιουσιακά
στοιχεία της Εταιρείας ανέρχονται σε ποσό €
3.672.519 (2021: € 3.645.596) και
επιμετρώνται στο κόστος κτήσης μείον
συσσωρευμένες αποσβέσεις και τυχόν
απομειώσεις. Η Διοίκηση εξετάζει σε ετήσια
βάση εάν υπάρχουν ενδείξεις απομείωσης στα
μη χρηματοοικονομικά περιουσιακά στοιχεία.
Σε άυλα περιουσιακά στοιχεία που οι
χρηματοοικονομικές και λειτουργικές τους
αποδόσεις συνιστούν ενδείξεις ότι η λογιστική
αξία τους υπερβαίνει το ανακτήσιμο ποσό,
διενεργούνται ετήσιοι έλεγχοι απομείωσης,
όπως επίσης και σε άυλα περιουσιακά στοιχεία
υπό κατασκευή. Για σκοπούς ελέγχου
απομείωσης των άυλων περιουσιακών
στοιχείων έχει πραγματοποιηθεί έλεγχος
απομείωσης για τις ακόλουθες τρεις Μονάδες
Δημιουργίας Ταμιακών Ροών (ΜΔΤΡ):
LOGISMOS ERM, LOGISMOS ERP και
LOGISMOS CMS.
Η Διοίκηση προσδιορίζει την ανακτήσιμη αξία
κάθε μονάδας δημιουργίας ταμιακών ροών με
βάση την αξία χρήσης της.
Στο ανωτέρω πλαίσιο, για τον υπολογισμό της
αξίας χρήσης των άυλων περιουσιακών
στοιχείων χρησιμοποιήθηκαν εκτιμήσεις
ταμιακών ροών για την εναπομένουσα
ωφέλιμης ζωής τους.
Επικεντρωθήκαμε σε αυτή την περιοχή, καθώς
για τον προσδιορισμό του ανακτήσιμου ποσού
κάθε ΜΔΤΡ απαιτήθηκε η διενέργεια
εκτιμήσεων εκ μέρους της Διοίκησης σχετικά με
τις βασικές παραδοχές (όπως προσδοκίες για
τη μελλοντική πορεία της αγοράς και τα
επιτόκια προεξόφλησης που
χρησιμοποιήθηκαν για την προεξόφληση των
προβλεπόμενων ταμιακών ροών τους).
Στη Σημείωση 11 «Άυλα Περιουσιακά
Στοιχεία», παρέχονται λεπτομερείς
πληροφορίες για τις παραδοχές που
χρησιμοποιήθηκαν.
Στη χρήση που έληξε την 31
η
Δεκεμβρίου
Αξιολογήσαμε τη συνολική διαδικασία που εφαρμόζει
η Διοίκηση για τον έλεγχο απομείωσης,
συμπεριλαμβανομένης της διαδικασίας εντοπισμού
ενδείξεων απομείωσης, της διενέργειας ελέγχου
απομείωσης, καθώς και της επισκόπησης και
έγκρισης αυτών.
Οι κυριότερες παραδοχές που αξιολογήθηκαν
περιλαμβάνουν τους ρυθμούς ανάπτυξης, τις
προβλέψεις σχετικά με τα περιθώρια κέρδους και το
προεξοφλητικό επιτόκιο.
Συζητήσαμε εκτενώς με τη Διοίκηση την
καταλληλότητα του ελέγχου απομείωσης και το
εύλογο των παραδοχών και με την υποστήριξη των
εξειδικευμένων σε θέματα αποτίμησης στελεχών μας,
διενεργήσαμε τις ακόλουθες διαδικασίες:
Πραγματοποιήσαμε συγκριτική αξιολόγηση των
κύριων παραδοχών των υποδειγμάτων ελέγχου
απομείωσης που εφαρμόστηκαν από τη Διοίκηση με
τις τάσεις της αγοράς.
Εξετάσαμε τον έλεγχο απομείωσης που
πραγματοποίησε εξωτερικός εμπειρογνώμονας για
τον οποίο αξιολογήσαμε την ανεξαρτησία και την
επαγγελματική του επάρκεια με βάση τις διατάξεις
της παρ. 8 του ΔΠΕ 500.
Εξετάσαμε τη μαθηματική ακρίβεια των ελέγχων
απομείωσης και συμφωνήσαμε τα σχετικά στοιχεία
με τα εγκεκριμένα επιχειρηματικά σχέδια.
Αξιολογήσαμε την αξιοπιστία και την ακρίβεια των
προβλέψεων της Διοίκησης επισκοπώντας τις
πραγματικές επιδόσεις έναντι των αντίστοιχων
προβλέψεων.
Αξιολογήσαμε την επίδραση στην ανακτήσιμη αξία
των Μονάδων Δημιουργίας Ταμιακών Ροών μιας
ενδεχόμενης μεταβολής των κύριων παραδοχών.
Για κάθε ΜΔΤΡ, συμφωνήσαμε το αντίστοιχο
αναπόσβεστο υπόλοιπο ληφθεισών επιχορηγήσεων.
Επιβεβαιώσαμε την καταλληλότητα των σχετικών
γνωστοποιήσεων που περιλαμβάνονται στις
σημειώσεις των οικονομικών καταστάσεων.
Με βάση τις διενεργηθείσες διαδικασίες μας,
θεωρούμε ότι οι κύριες παραδοχές της Διοίκησης