EG / Wednesday, May 14, 2014 / Categories: Ukraine, Luhansk Oblast, Methods of analysis, Reverse Engineering In Luhansk, addition was dismissed as a Bandera method. It can be considered proven that the "results" were determined arbitrarily. Boris Ovchinnikov writes: The results of voting are usually determined by an arithmetic operation called addition — first, data from precincts are summed up to get results for district election commissions, and then district results are further summed up into regional and national results. In Luhansk, summation was rejected as a "Bandera method," and multiplication was used instead. Multiplication of numbers made up from thin air. This is evident from the fact that there are two percentage figures — the percentage of turnout relative to the number of registered voters and the percentage of votes in favour of independence relative to valid ballots — that match with a precision of up to three decimal places. 75.2000% and 96.2000% (for reference: if real numbers were summed, with a probability of more than 99.9%, their ratio would yield non-rounded percentages — like 75.2637%). The probability that two rounded percentages coincidentally match this way is less than one in a million. Thus, it can be considered proven that the "results" of the referendum, at least in the Luhansk region, were determined arbitrarily by its organizers, without any connection to the actual voting results. Print 592 Tags: Ukraine Luhansk obl Referendum 2014 More links Voting results are usually determined by an arithmetic operation such as addition...The original Facebook post by Boris Ovchinnikov. Related articles On the fabricated results of the referendum in the Luhansk region Ukraine, Luhansk oblast, Referendum 2014 Please login or register to post comments.
Sergei Shpilkin "Statistical Analysis of Elections" Sergei Shpilkin "Statistical Analysis of Elections" Presentation at the I Round Table of Mathematicians Сергей Шпилькин / Friday, December 15, 2017 0 37009 Sergey Shpilkin "Statistical Analysis of Elections" Presentation at the First Roundtable of Mathematicians Read more
Boris Ovchinnikov "Statistics against electoral fraud" Boris Ovchinnikov "Statistics against electoral fraud" Presentation at the I Round Table of Mathematicians Boris Ovchinnikov / Friday, December 15, 2017 0 14069 Boris Ovchinnikov's presentation "Statistics against electoral fraud" Read more
Lev Krylenkov.Identification of drawn results Lev Krylenkov.Identification of drawn results Presentation at the I Round Table of Mathematicians Lev Krylenkov / Friday, December 15, 2017 0 13048 Lev Krylenkov shows in his presentation on how fraud was detected in the 2014 St. Petersburg gubernatorial election. Read more
Andrei Buzin Megastatistics of Russian quasi-elections Andrei Buzin Megastatistics of Russian quasi-elections Presentation at the I Round Table of Mathematicians Андрей Бузин / Friday, December 15, 2017 0 20478 A.Y. Buzin's presentation at the I Round Table of Mathematicians. "Megastatistics of Russian quasi-elections". Andrey Buzin proposed an extension of the Sobyanin-Sukhovolsky method. Read more
Azat Gabdulvaleev. Elections in graphs. Overview of Russian cities. Azat Gabdulvaleev. Elections in graphs. Overview of Russian cities. Presentation at the I Round Table of Mathematicians Azat Gabdulvaleev / Friday, December 15, 2017 0 12325 Azat Gabdulvaleev's presentation at the First Round Table of Mathematicians. Read more