I like this. However, one question comes to mind: How many machines were in the 4 referenced Detroit locations? Here's some quick math.

2000 max # of ballots/hour/machine estimated. 2 hours + (38 mins / 60 mins) = 2.6334 hours. 2000 * 2.6334 ≈ 5267 max # of ballots/machine.

94867 calculated as max # of processable ballots. 94867 / 5267 ≈ 18 min # of machines required for all 4 locations, based on the given data.

384733 counted ballots / 94867 ≈ 4.0555 times more machines required in total. 18 * 4.0555 ≈ 73 min # of machines required for all 4 locations, based on the given data.

73 / 4 locations = 18.25 min # of machines required per location to process 384733 ballots in 2.6334 hours, assuming 2000 ballots per hour per machine, or 5267 ballots per machine within 2.6334 hours.

Only thing left to do is find out how many Dominion machines were in these 4 locations, and compare them to: 5267 * ?? actual # of machines = 384733.

Assuming they know the total # of machines that were in the 4 Detroit locations in total (likely 18 machines), they should include how many Dominion machines were actually in Detroit, if they haven't already. Godspeed.

I like this. However, one question comes to mind: How many machines were in the 4 referenced Detroit locations? Here's some quick math.

2000 max # of ballots/hour/machine estimated. 2 hours + (38 mins / 60 mins) = 2.6334 hours. 2000 * 2.6334 ≈ 5267 max # of ballots/machine.

94867 calculated as max # of processable ballots. 94867 / 5267 ≈ 18 min # of machines required for all 4 locations, based on the given data.

384733 counted ballots / 94867 ≈ 4.0555 times more machines required in total. 18 * 4.0555 ≈ 73 min # of machines required for all 4 locations, based on the given data.

73 / 4 locations = 18.25 min # of machines per location to process 384733 ballots in 2.6334 hours, assuming 2000 ballots per hour per machine, or 5267 ballots per machine within 2.6334 hours.

Only thing left to do is find out how many Dominion machines were in these 4 locations, and compare them to: 5267 * ?? actual # of machines = 384733.

Assuming they know the total # of machines that were in the 4 Detroit locations in total (likely 18 machines), they should include how many Dominion machines were actually in Detroit, if they haven't already. Godspeed.

I like this. However, one question comes to mind: How many machines were in the 4 referenced Detroit locations? Here's some quick math.

2000 max # of ballots/hour/machine estimated. 2 hours + (38 mins / 60 mins) = 2.6334 hours. 2000 * 2.6334 ≈ 5267 max # of ballots/machine.

94867 calculated as max # of processable ballots. 94867 / 5267 ≈ 18 min # of machines required for all 4 locations, based on the given data.

384733 counted ballots / 94867 ≈ 4.0555 times more machines required in total. 18 * 4.0555 ≈ 73 min # of machines required for all 4 locations, based on the given data.

73 / 4 locations = 18.25 min # of machines per location to process 384733 ballots in 2.6334 hours, assuming 2000 ballots per hour per machine, or 5267 ballots per machine within 2 hours and 38 mins.

Only thing left to do is find out how many Dominion machines were in these 4 locations, and compare them to: 5267 * ?? actual # of machines = 384733.

Assuming they know the total # of machines that were in the 4 Detroit locations in total (likely 18 machines), they should include how many Dominion machines were actually in Detroit, if they haven't already. Godspeed.

I like this. However, one question comes to mind: How many machines were in the 4 referenced Detroit locations? Here's some quick math.

2000 max # of ballots/hour/machine estimated. 2 hours + (38 mins / 60 mins) = 2.6334 hours. 2000 * 2.6334 ≈ 5267 max # of ballots/machine.

94867 calculated as max # of processable ballots. 94867 / 5267 ≈ 18 min # of machines required for all 4 locations, based on the given data.

384733 counted ballots / 94867 ≈ 4.0555 times more machines required in total. 18 * 4.0555 ≈ 73 min # of machines required for all 4 locations, based on the given data.

73 / 4 locations = 18.25 min # of machines per location to process 384733 ballots in 2.6334 hours, assuming 2000 ballots per hour per machine, or 5267 ballots per machine within 2.6334 hours.

Only thing left to do is find out how many Dominion machines were in these 4 locations, and compare them to: 5267 * ?? actual # of machines = 384733.

Assuming they know the total # of machines that were in the 4 Detroit locations in total (likely 18 machines), they should include how many Dominion machines were actually in Detroit, if they haven't already. Godspeed.

I like this. However, one question comes to mind: How many machines were in the 4 referenced Detroit locations? Here's some quick math.

2000 max # of ballots/hour/machine estimated. 2 hours + (38 mins / 60 mins) = 2.6334 hours. 2000 * 2.6334 ≈ 5267 max # of ballots/machine.

94867 calculated as max # of processable ballots. 94867 / 5267 ≈ 18 min # of machines required for all 4 locations, based on the given data.

384733 counted ballots / 94867 ≈ 4.0555 times more machines required in total. 18 * 4.0555 ≈ 73 min # of machines required for all 4 locations, based on the given data.

73 / 4 locations = 18.25 min # of machines per location to process 384733 ballots in 2.6334 hours, assuming 2000 ballots per hour per machine, or 5267 max # of ballots per machine within 2.6334 hours.

Only thing left to do is find out how many Dominion machines were in these 4 locations, and compare them to: 5267 * ?? actual # of machines = 384733.

Assuming they know the total # of machines that were in the 4 Detroit locations in total (likely 18 machines), they should include how many Dominion machines were actually in Detroit, if they haven't already. Godspeed.

I like this. However, one question comes to mind: How many machines were in the 4 referenced Detroit locations? Here's some quick math.

2000 max # of ballots/hour/machine estimated. 2 hours + (38 mins / 60 mins) = 2.6334 hours. 2000 * 2.6334 ≈ 5267 max # of ballots/machine.

94867 calculated as max # of processable ballots. 94867 / 5267 ≈ 18 min # of machines required for all 4 locations, based on the given data.

384733 counted ballots / 94867 ≈ 4.0555 times more machines required in total. 18 * 4.0555 ≈ 73 min # of machines required for all 4 locations, based on the given data.

73 / 4 locations = 18.25 min # of machines per location to process 384733 ballots in 2.6334 hours, assuming 2000 ballots per hour per machine, or 5267 max ballots per machine within 2.6334 hours.

Only thing left to do is find out how many Dominion machines were in these 4 locations, and compare them to: 5267 estimated ballots * ?? actual # of machines = 384733.

Assuming they know the total # of machines that were in the 4 Detroit locations in total (likely 18 machines), they should include how many Dominion machines were actually in Detroit, if they haven't already. Godspeed.

I like this. However, one question comes to mind: How many machines were in the 4 referenced Detroit locations? Here's some quick math.

2000 max # of ballots/hour/machine estimated. 2 hours + (38 mins / 60 mins) = 2.6334 hours. 2000 * 2.6334 ≈ 5267 max # of ballots/machine.

94867 calculated as max # of processable ballots. 94867 / 5267 ≈ 18 min # of machines for all 4 locations, based on the given data.

384733 counted ballots / 94867 ≈ 4.0555 times more machines required in total. 18 * 4.0555 ≈ 73 min # of machines required for all 4 locations, based on the given data.

73 / 4 locations = 18.25 min # of machines per location to process 384733 ballots in 2.6334 hours, assuming 2000 ballots per hour per machine, or 5267 max ballots per machine within 2.6334 hours.

Only thing left to do is find out how many Dominion machines were in these 4 locations, and compare them to: 5267 estimated ballots * ?? actual # of machines = 384733.

Assuming they know the total # of machines that were in the 4 Detroit locations in total (likely 18 machines), they should include how many Dominion machines were actually in Detroit, if they haven't already. Godspeed.