We learn about Fractional Reserve Banking.
Banks are Jews that loan money to goys and Deposit money from other banks or other goys.
Goyim deposit shekels in banks and is given an receipt of deposit.

Jews have no clothes: they hold a reserve ratio between 0 and 1 of Deposit we call r, and (((Loans))) the rest.
Reserve = r * Deposit = Shekels the Jew really have at hand
(((Loans))) = (1-r)*Deposit

(((Loans))) + Reserve = Deposit

Let there exist a infinite sequence of Jews that love to Jew each other called the Kabbalah = [J_0,J_1,...J_inf]

The act of (((Loaning))) := Jewing.
The act of Depositing := Cuucking.

Let there be a partial order of Jews where the 0th index is the highest Jew that Jews the next Jew and so on.
The biggest Jew J_0, loans shekels to the cuuck Jew J_1 which J_1 interprets as a deposit.
Let's assume Jew J_0 magically has some initial deposit in its bank.

(((Loans_J_0))) = Deposit_J_1

Solve for arbitrary Jew, J_k, the Deposit_J_k:

Deposit_J_0 = Loans_J_0 + Reserve_J_0
Deposit_J_0 = Deposit_J_1 + Reserve_J_0
Deposit_J_1 = Deposit_J_0 - Reserve_J_0
Deposit_J_1 = Deposit_J_0 - (r)*Deposit_J_0
Deposit_J_1 = (1-r)*Deposit_J_0

Deposit_J_1 = (1-r)*Deposit_J_0
Deposit_J_2 = (1-r)*Deposit_J_1 = (1-r)*(1-r)*Deposit_J_0
Deposit_J_3 = ...

Deposit_J_k = ((1-r)^k )* Deposit_J_0

Lets sum the Deposits of the sequence of Jew using geometric series formula.
We get Deposit_Sum = Deposit_J_0/r
Note 0 < r < 1
Deposit_J_0 > (Deposit_J_0/r)
From the Deposit that exists in the biggest Jew and fractional reserve loaning system and the reserve ratio
Jews made money from thin air.
Let's call the ratio 1/r the JQ.
JQ * shekels = more magic shekels that do not physically exist