|Product Name||Translation Of The Second Book Of The Ramayan: From The Hindi Of Tulsi Das, Into Literal English; With Copious Explanatory Notes And Allusions (1871)|
|Category||Book / Magazine / Publication|
|Amazon.com||Buy on Amazon ~ 1165150921|
|Price New||21.56 US Dollars (curriencies)|
|Price Used||21.58 US Dollars (curriencies)|
|Width||0.53 inches (convert)|
|Height||9.02 inches (convert)|
|Length||5.98 inches (convert)|
|Weight||12 ounces (convert)|
|Features||Translation of the Second Book of the Ramayan From the Hindi of Tulsi Das Into Literal English With Copious Explanatory Notes and Allusions 1871|
|Long Description||This scarce antiquarian book is a facsimile reprint of the original. Due to its age, it may contain imperfections such as marks, notations, marginalia and flawed pages. Because we believe this work is culturally important, we have made it available as part of our commitment for protecting, preserving, and promoting the world's literature in affordable, high quality, modern editions that are true to the original work.|
|Search Google||by EAN or by Title|
This symbology was developed by the Plessey Company in England. A variation of Plessey was used by the ADS Company and is known as Anker Code. Anker Code was used in European point of sale systems prior to the advent of EAN. Another variation is known as the MSI Code.
Plessey offers a full range of HEX digits 0-F. The bit pattern of the bits sets the high order bit at the right which is reverse of how we normally think of bits these days. (MSI puts the high order bit on the left).
The start bar is always "D" (1101) and the terminator can be two binary 1's (11) if the barcode is to be read from left to right only. If the barcode can be read in either direction the terminator will be a single binary 1 (1) and is followed by a reverse of the start character or the "B" (1011).
|Digit||Strip Bits||Binary Value|
|STOP < >||110110100110110||11011|
You can use the stripe bits can be used to generate the graphic pattern. If you want to see this trick, check out the MSI Code page. Plessey uses a cyclic (or polynomial) check code technique which is applied to the reading of barcode labels and transmission of data. This technique is a fair compromise between the extra redundancy and the error detecting power. Roughly one undetected error per hundred million 6 digit transactions.
If you would like to generate your own Plessey Barcode, please visit our free barcode generator page. Make your code, save it and use it how ever you like.