Question #24247

1 Answer
Alan P. · dani83
Mar 30, 2015

#P(a,b) = (a!)/((a-b)!)#
where #a! = a xx (a-1) xx(a-2)xx(a-3)xx ....xx3 xx 2 1#
and #(a-b)! = (a-b) xx (a-b-1) xx (a-b-2)xx .... xx 2 xx1#

So
#P(n,r) =(n!)/((n-r)!)#
and
#P(n-1,r-1) = ((n-1)!)/(((n-1)-(r-1))!) = ((n-1)!)/((n-r)!)#
so

#n*P(n-1,r-1)#

#= ((n)(n-1)!)/((n-r)!)#

#= (n xx (n-1) xx (n-2) xx ....xx2 xx1)/((n-r)!)#

#= (n!)/((n-r)!)#

#=P(n,r)#

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