English – 6
EN
7.5 (Professional) Cancelling ONE combina-
tion paired with the button (reference digit: 4).
I1I Enter the programming password. – Press the button
to confirm. I2I Enter the digit “4”. – Press the button to
confirm. I3I Enter the combination to be cancelled, chosen
among those paired with the button. – Press the but-
ton to confirm. I4I Re-enter the same combination to be can-
celled. – Press the button to confirm.
7.6 (Professional) Cancelling ONE combina-
tion paired with the button (reference digit: 5).
I1I Enter the programming password. – Press the button
to confirm. I2I Enter the digit “5”. – Press the button to
confirm. I3I Enter the combination to be cancelled, chosen
among those paired with the button. – Press the but-
ton to confirm. I4I Re-enter the same combination to be can-
celled. – Press the button to confirm.
7.7 (Professional) Cancelling ONE combina-
tion paired with the and buttons (reference
digits: 4-5).
I1I Enter the programming password. – Press the button
to confirm. I2I Enter the digits “4-5”. – Press the button
to confirm. I3I Enter the combination to be cancelled, chosen
among those paired with the and buttons. – Press the
button to confirm. I4I Re-enter the same combination to be
cancelled. – Press the button to confirm.
7.8 (Professional) Counting the number of
valid combinations paired with the button
(reference digit: 6).
I1I Enter the programming password. – Press the button to
confirm. I2I Enter the digit “6”. – Press the button to con-
firm. I3I Therefore, to obtain the number of valid combinations
paired with the button, count the sequences of the buzzes
emitted by the device and read their explanation in Table 4.
Note – To find the total quantity of combinations relative to the
button, also add the combinations paired with both the
and buttons, calculated using the procedure described in
Paragraph 7.10.
TABLE 4 - Counting of the stored combinations
The sequence of buzzes are emitted in the order shown:
hundreds, tens, sets of 1.
3 buzzes
hundreds (e.g.: 2 sequences of
3 buzzes = 200 combinations)
2 buzzes
tens (e.g.: 3 sequences of 2
buzzes = 30 combinations)
1 buzz
sets of 1 (e.g.: 5 sequences of 1
buzz = 5 combinations)
1 buzz (10 sequences) “zero” digit
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