How many different triples f : A &#x2192;<!-- → --> S , g : B &#x2192;<!-- → --

telegrafyx

telegrafyx

Answered question

2022-06-08

How many different triples f : A S , g : B S , h : C S are there such that f, g, h are all injective, and f ( A ) = g ( B ) = h ( C )?
In this Question we know that the | A | , | B | , | C | = m > 0 and set S has cardinality n > 0..
Since the functions are one-to-one this means each domain maps a codomain and as all three sets (Domain) have same cardinality we can deduce that n C m possible codomain mapped by these functions.
And because these functions are One-One, so each function can form n P m number of One-One function so according to me this leads me to n P m / n C m as number of different triples that can be formed.

Answer & Explanation

Odin Jacobson

Odin Jacobson

Beginner2022-06-09Added 17 answers

Step 1
Let Ω represent one of the ( n m ) subsets of S of size m.
There are precisely m! different injections that map a set of size m into Ω. This means the number of required triples ( f 1 , f 2 , f 3 ) whose image is Ω equals ( m ! ) 3
Step 2
But since each candidate for Ω yields an entirely distinct triple ( f 1 , f 2 , f 3 ) we see there are ( n m ) ( m ! ) 3 possible triples.

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