There are 9 elements.
Let the
number of ways we can group 4 elements from 9 elements be
x.
The number of different ways can we arrange the 9
different elements in consecutive 4 places is 9P4 ways = 9*8*7*6
ways.
Alternatively , let number of ways of selection of 4
distinct elements from 9 elements be x . And each group could be arranged in 4!
arrangements within itself. So x different groups of 4 elements could be arranged in
4!*x ways.
Therefore x*4! =
9*8*7*6.
Therefore x =
9*8*7*6/4!.
x =
9*8*7*6/4*3*2*1.
x =
126.
Therefore the number of ways selecting the group of
4 elements from 9 elements is 126.
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