Given two real sets A= a1 , a2 , a3 ldots a2 n and B b1 , b2 , ldots bn . If f:A arrow B is a function such that every element of B has an inverse image and f(a1)≤ f(a2)≤ f(a3)≤ f(a4) ldots ≤ f(a2 n), then the number of such mappings are

Question

Given two real sets A= a1 , a2 , a3 ldots a2 n and B b1 , b2 , ldots bn . If f:A arrow B is a function such that every element of B has an inverse image and f(a1)≤ f(a2)≤ f(a3)≤ f(a4) ldots ≤ f(a2 n), then the number of such mappings are (A) 2 nCn (B) 2 nCn - 1 (C) 2 n - 1Cn - 1 (D) 2 n + 1Cn

Tardigrade Admin · Accepted Answer

There is no loss of generality in considering the order of

b^{^{'}} s

as

b_{1} < b_{2} < b_{3} \dots < b_{n}

also given
that

f (a_{1}) \leq f (a_{2}) \cdot \cdot \cdot \cdot \leq f (a_{2 n}) .

Now suppose number of preimages of every

b_{i}

are

x_{i}

in numbers.
Therefore

x_{1} + x_{2} + \dots + x_{n} = 2 n

where

1 \leq x_{i} \leq n + 1........ (i)

Number of solutions of

(i)

is

^{2 n - 1} C_{n - 1}

or

^{2 n - 1} C_{n}

$^{2 n} C_{n}$

$^{2 n} C_{n - 1}$

$^{2 n - 1} C_{n - 1}$

$^{2 n + 1} C_{n}$

Q. Given two real sets A={a1​,a2​,a3​…a2n​} and B{b1​,b2​,…bn​}. If f:A→B is a function such that every element of B has an inverse image and f(a1​)≤f(a2​)≤f(a3​)≤f(a4​)…≤f(a2n​), then the number of such mappings are

2nCn​

2nCn−1​

2n−1Cn−1​

2n+1Cn​

$^{2 n} C_{n}$

$^{2 n} C_{n - 1}$

$^{2 n - 1} C_{n - 1}$

$^{2 n + 1} C_{n}$