Prove that the number of selections of n things from two sets of n identical things and n other distinct things is `(n+2)2^(n-1)`

Consider the following statement : (i) Numberof one-one functions from set A to set B, where O(A) = m and O(B) = n(m lt=n) is given by ""^nP_m (ii) Number of ways is which 'n' people can be arranged at a circular table is ( (n-1)!)/(2) (iii) Number of ways of selecting atleast one thing out of the given a distinct things is 2^n - 1 (iv) Number of ways in which distinguishable objects can be distributed into k distinguishable bins is ""^nC_(k-1) Then which one of the following is true?

A : the number of ways in which 5 boys and 3 girls can sit in a row so that two girls come together is 5 ! ""^(6) P_(5) R : the number of ways of ways in which m ( first type of different ) things and n ( second type of different ) things ( m + 1 ge n) can be arranged in a row so that no two things of second kind come together is m! ""^((m+1)) P_(n)

A : the number of ways in which 5 boys and 5 girls can sit in a row so that the boys and girls sit alternatively is 28800 . R : the number of ways in which n ( first type of differernt ) things and n ( second type of different ) things cna be arranged in a row alternatively is 2 xx n! xx n! ,

Find the number of surjections from a set A with n elements to a set B with 2 elements when n gt 1 .

Assertion (A): The number of ways in which 5 boys and 5 girls can sit in a row so that all the girls sit together is 86400. Reason (R) : The number of ways in which m (first type of different) things and n (second type of different) things can be arranged in a row so that all the second type of things come together is n!""^((n+1))P_(m) The correct answer is

Find the number of ways of arranging 'r' things in a line using the given 'n' different things in which atleast one thing is repeated.

The number of ways in which n things of which r are alike, can be arranged in a circular order, is