![Το τμήμα του φράκτη τούβλο](data:image/png;base64,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)
Το τμήμα του φράκτη τούβλο
Ύψος του στύλου 1875 mm ή 25 σειρά (λαμβάνοντας υπόψη το ύψος της ΚΓΠ)
Το μέγεθος του ένα πυλώνα 125 τούβλα ή 0.24 m3
Το ύψος της διόδου 1725 mm ή 23 σειρά (λαμβάνοντας υπόψη το ύψος της ΚΓΠ)
Εκτείνονται σε πλάτος 3510 mm
Το μέγεθος του ένα πέρασμα 311 τούβλα ή 0.61 m3
Ύψος μπάζας 300 mm ή 4 σειρά
![Πλευρά του φράχτη](data:image/png;base64,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)
Πλευρά του φράχτη
A
Αριθμός των Πολωνών 9
Συνολικές Δημοσιεύσεις 1125 τούβλα ή 2.19 m3
Όλες οι εξορμήσεις 2717 τούβλα ή 5.3 m3
Το ποσό της ΚΓΠ 1615 τούβλα ή 3.15 m3
Το ποσό της 5457 τούβλα ή 10.64 m3
Λύση για τις θέσεις 0.43 m3
Η λύση τους 1.03 m3
Λύση για την ΚΓΠ 0.61 m3
Το ποσοστό του σκυροδέματος για τη θεμελίωση 5.32 m3
Το ποσό της rockfill θεμέλιου 2.66 m3
Η τελευταία πτήση του μια μερική 3000 mm
Για την equal τα χρειάζεστε: 8 πυλώνες με μια έκταση 4375 mm ή 9 πυλώνες με μια έκταση 3889 mm
![Πλευρά του φράχτη](data:image/png;base64,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)
Πλευρά του φράχτη
B
Αριθμός των Πολωνών 10
Συνολικές Δημοσιεύσεις 1250 τούβλα ή 2.44 m3
Όλες οι εξορμήσεις 3105 τούβλα ή 6.05 m3
Το ποσό της ΚΓΠ 1846 τούβλα ή 3.6 m3
Το ποσό της 6201 τούβλα ή 12.09 m3
Λύση για τις θέσεις 0.47 m3
Η λύση τους 1.17 m3
Λύση για την ΚΓΠ 0.7 m3
Το ποσοστό του σκυροδέματος για τη θεμελίωση 6.08 m3
Το ποσό της rockfill θεμέλιου 3.04 m3
![Πλευρά του φράχτη](data:image/png;base64,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)
Πλευρά του φράχτη
C
Αριθμός των Πολωνών 10
Συνολικές Δημοσιεύσεις 1250 τούβλα ή 2.44 m3
Όλες οι εξορμήσεις 3027 τούβλα ή 5.9 m3
Το ποσό της ΚΓΠ 1800 τούβλα ή 3.51 m3
Το ποσό της 6077 τούβλα ή 11.85 m3
Λύση για τις θέσεις 0.47 m3
Η λύση τους 1.14 m3
Λύση για την ΚΓΠ 0.68 m3
Το ποσοστό του σκυροδέματος για τη θεμελίωση 5.93 m3
Το ποσό της rockfill θεμέλιου 2.96 m3
Η τελευταία πτήση του μια μερική 3000 mm
Για την equal τα χρειάζεστε: 9 πυλώνες με μια έκταση 4333 mm ή 10 πυλώνες με μια έκταση 3900 mm
![Πλευρά του φράχτη](data:image/png;base64,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)
Πλευρά του φράχτη
D
Αριθμός των Πολωνών 5
Συνολικές Δημοσιεύσεις 625 τούβλα ή 1.22 m3
Όλες οι εξορμήσεις 1553 τούβλα ή 3.03 m3
Το ποσό της ΚΓΠ 923 τούβλα ή 1.8 m3
Το ποσό της 3101 τούβλα ή 6.05 m3
Λύση για τις θέσεις 0.24 m3
Η λύση τους 0.59 m3
Λύση για την ΚΓΠ 0.35 m3
Το ποσοστό του σκυροδέματος για τη θεμελίωση 3.04 m3
Το ποσό της rockfill θεμέλιου 1.52 m3
Το άθροισμα όλων των υλικών
Πλινθοδομή 20836 τούβλα ή 40.63 m3
Λύση για τις θέσεις 11.79 m3
Η λύση τους 3.93 m3
Λύση για την ΚΓΠ 2.34 m3
Συνολική λύση 18.06 m3
Σκεπάσματα μόνο 20.37 m3
Γέμιση για το Ίδρυμα όλων 11.79 m3
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