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Partial reply…
Step I:
Substituting $A = 1, B = 2, …, Z = 26$, discover the sum of all of the consonants and subtract the sum of all of the vowels, e.g. $”All” = (-1) + (12+12) = 23$.
So the outcome for the brand new enter could be:
$39, 10, 30, 36, 26, 41, 26$
Step II:
For every phrase within the sentence, multiply the earlier outcome by its place within the sentence (beginning with 1) after which add its place in the event that they had been numbered in reverse, e.g. “All” is the primary phrase in a 7-word sentence, so we take the earlier outcome ($23$), multiply by $1$ and add $7$ to get $30$; for the second phrase we take $32$, multiply by $2$ and add $6$ to get $70$, and so forth.
So the outcome for the brand new enter could be:
$46, 26, 95, 148, 133, 248, 183$
Step III:
Reorder the outcomes from the prior step in descending order. The outcomes for the brand new enter would now be:
$248, 183, 148, 133, 95, 46, 26$
Step IV:
Take the sum of the digits of the earlier reply, and add its place within the order (ranging from 1), e.g. $568$ -> $(5 + 6 + 8) + 1 = 20$, $328$ -> $(3 + 2 + 8) + 2 = 15$, and so forth.
So the brand new result’s:
$15, 14, 16, 11, 19, 16, 15$
Step V:
Double every quantity and add its place within the sequence, e.g. $20 * 2 + 1 = 41$. The new result’s:
$31, 30, 35, 26, 43, 38, 37$
That’s all I’ve thus far, will replace as soon as I determine the remainder.
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