With the currently reported 81,255,933 votes for Bidet, 11% is 8,938,152.63, which is enough to give GEOTUS the popular vote.
If we combine this with the 0.26% flip found in a test in Georgia, then it changes to 81,045,215.4~ votes cast, 11% at 8,914,973.7~ fraudulent votes, which is still enough to give GEOTUS the popular vote.
i am pretty sure that in Arizona the investigation is specifically regarding the duplicated (adjudicated) ballots.
Meaning the ones that machines couldn't read or were filled out not quite right and had to be created using poll worker's best judgement.... rather than their bias.
AZ got 2 different sample groups to work with, one was the dup ballots, the other was envelopes. The dup ballots found 3% discrepancies, the envelopes found 11% signature match discrepancies. I would wait for further info, ... they will be awarded a larger sample to look at I'm sure.
With the currently reported 81,255,933 votes for Bidet, 11% is 8,938,152.63, which is enough to give GEOTUS the popular vote.
If we combine this with the 0.26% flip found in a test in Georgia, then it changes to 81,045,215.4~ votes cast, 11% at 8,914,973.7~ fraudulent votes, which is still enough to give GEOTUS the popular vote.
that's just mail in ballots, I wonder how many were switched by the machines? the number on fraud is beginning to look gigantic.
i am pretty sure that in Arizona the investigation is specifically regarding the duplicated (adjudicated) ballots.
Meaning the ones that machines couldn't read or were filled out not quite right and had to be created using poll worker's best judgement.... rather than their bias.
not all votes.
AZ got 2 different sample groups to work with, one was the dup ballots, the other was envelopes. The dup ballots found 3% discrepancies, the envelopes found 11% signature match discrepancies. I would wait for further info, ... they will be awarded a larger sample to look at I'm sure.
Minimum. I'd put it around 30% but as long as we're acknowledging millions of fraudulent votes, it's a start.
And all we need is about 12,000 or so.
Investigate All Fifty!