How many arrangements of three types of flowers are there if there are 6 types to choose from?
Answers
Answered by
7
no of flowers=6
no of flowers we should choose=3
no of ways=6P3=6!/(6!-3!)
=6!/3!=6×5×4=120
hope it helps
if u know permutations u can solve it
no of flowers we should choose=3
no of ways=6P3=6!/(6!-3!)
=6!/3!=6×5×4=120
hope it helps
if u know permutations u can solve it
Answered by
5
Solution :-
Different types of flowers = 6
Number of arrangements of flowers have to be chosen = 3 types
So, number of ways = 6P3
= 6!/3!
= (6*5*4*3*2*1)/(3*2*1)
= 720/6
= 120 ways
Answer.
Different types of flowers = 6
Number of arrangements of flowers have to be chosen = 3 types
So, number of ways = 6P3
= 6!/3!
= (6*5*4*3*2*1)/(3*2*1)
= 720/6
= 120 ways
Answer.
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