User:Aal4azr/Alfaca's theorem

Alfaca's love-forgetting theorem, or simply Alfaca's Theorem, is a mathematical formula that expresses the duration of mourning after a break-up. This formula is expressed by the ratio;

With; ΔT= duration of relation in months

$$t$$= time to forget in months

According to Alfaca's Theorem;

$$t$$=$''ΔT⁄6$

If ΔT= 12 months, then; $$t$$$$=\frac{12}{6}= 2$$

For example, it will take 2 months to forget a 6-month relationship.

Reciprocal
The reciprocal of this theorem exists. Once the mourning period is over, it lets us know how long the love has been going on. With the formula ΔT= 𝑡 ∗ 6

If you mourned in 3 months then;

$$t * 6$$ with $$t$$ = $$3$$

$$= 3*6$$

$$= 18$$

You therefore began to love this person 18 months before the breakup.

Relativity
Alfaca, specifies that "You can adjust the formula according to your vision of things [...]. Because time is relative.

A parallel theory involves replacing the constant 6 by a variable X. X being, on a scale of 1 to 12, your tendency to love others.

$$t$$=$ΔT⁄X$

with 0 < X ≤ 12

Someone who invests a lot in their love life will see their Alkafa index tend towards 0. On the other hand, a pessimist or loner will use a stronger denominator.

Others applications
Application in other types of mourning is controversial, but other theorems are being developed.