First, here are the two posts claiming the 5% figure:
https://greatawakening.win/p/16a9v4XS1j/5-of-covid-vax-lot-s-are-respons/c/
https://greatawakening.win/p/16a9v3RWc8/whats-in-your-wallet/c/
and two good links that I gleaned from the comments:
https://knollfrank.github.io/HowBadIsMyBatch/batchCodeTable.html
Now, assuming this 5% figure is true and that the bad batches were randomly distributed worldwide, here is the probability distribution that a person who took both clot shots and all boosters on the time scale propagandized by the government and the mockingbird media of getting a poisonous shot.
The formula for the probability distribution of 2 events is: nCrp^rq^(n-r) where n is the number of vaccine doses taken, r is the number that is poisonous, p is the probability that the batch is not poisonous which would be .95 and q is the probability that the batch is poisonous which would be .05. For those of you who are not math literate, the C is the formula for combinations.
So a person who had only one shot, the probability is nonpoisonous: 95%, poisonous 5%
From here on out, all calculations are rounded to the nearest whole percent.
A person who had two shots, the probabilities are: both nonpoisonous: 90%, 1 poisonous: 10%, both poisonous 0% (actually 0.25%)
A person who had three shots, the probabilities are: all nonpoisonous: 86%, 1 poisonous: 14%, 2 poisonous: 1%, all 3 poisonous: 0% (actually 1/80th of a %) The reason why the total is above 100% is due to rounding error.
A person who had 4 shots, the probabilities are: all nonpoisonous: 81%, 1 poisonous: 17%, 2 poisonous: 1%, 3 poisonous: 0.05%, all 4 poisonous: 1/1600 of a %
A person who had 5 shots, the probabilities are: all nonpoisonous: 77%, 1 poisonous: 20%, 2 poisonous: 2%
A person who had 6 shots, the probabilities are:
all nonpoisonous: 74%, 1 poisonous: 23%, 2 poisonous: 3%
A person who had 7 shots, the probabilities are: all nonpoisonous: 70%, 1 poisonous: 26%, 2 poisonous: 4%
A person who had 8 shots, the probabilities are:
all nonpoisonous: 66%, 1 poisonous: 28%, 2 poisonous: 5%, 3 poisonous 1%
I'll stop here since I doubt that no one has yet had 8 shots. If you look at the figures, you can see that people getting these shots are playing a game of Russian roulette with the odds increasing going against their favor. Remember though that this relies on two key assumptions made at the beginning of this post.
As you can see, a person who takes 8 shots risks a 2 out of 3 chance of NOT getting poisoned. I you presented this person with a bowl of 300 M&Ms and told them that 1 out of 3 of them was poisonous, would they reach in and take a handleful?
What got me was how the probability of getting only one poisonous shot out of many rose with each shot taken. After all, it only takes one to cause an injury or death. I'm sure that others here on GAW can add other interpretations of these numbers and I welcome them to do so. I just wanted to throw this out there are continue the discussion that was started yesterday.
Very good post.
Let’s notice that the injury that ends with a fatal result (death) may require only 1 poisonous shot.
In the Russian roulette the first fatal shot ends the game, because the failure is immediate.
In case of the vaxx we don’t look at the probability of “1 poisonous”. We look at ANY. If ANY shot was poisonous - it can have fatal results after some time.
To calculate “ANY was poisonous” it’s as easy as to subtract:
ANY was poisonous = 100% - “all nonpoisonous”
which it’s increasing with the number of shots.
The conclusion is (and you can notice it just looking at “all nonpoisonous” figure only) that the longer you play the game - the chances to survive decrease.
And that’s what it makes it so similar to the Russian roulette.
My point exactly at the end of the post.
Oh, yes. True.