How can 1 1 1 =6. , 0 0 0 =6
Answers
Using any maths symbols or signs, can one prove that 0 0 0 = 6?
Here are ten possible answers, some cheatier than others. If any are unclear, feel free to ask for clarifications in the comments.
Factorial: (0!+0!+0!)!=6
Multiset: |[0,0,0]|!=6
Existential: ∃x.x+0+0+0=6
Successor: S(S(S(S(S(S(0))))))+0+0=6
Hexadecimal: C0hex−B0hex−0Ahex=6
Trigonometry: sec arctan(sec arctan(...(0.00))) = 6, with 36 sec arctans.
Inequality: 0 + 0 + 0 <= 6
International: ٥+٥/٥=6 (see )
Alarm clock:
Sport: NUMBER OF BALLS BOWLED IN AN OVER = 6
It's very simple.
To solve this problem we need to use 2 operators
1. factorial
2. addition
We know 0!=1 .
now there are 3 zeros . So if we take factorial of each of them and add the factorial values then we will get 3.
We also know that 3!=6
Hence to get the result 6 we have to take the factorial of 3 which we would get if we take the factorial of each zero and add them.
So finally it stands like this:
(0!+0!+0!)!
=(1+1+1)!
=3!
=6.