Answer :
[tex]6!= \\ 6*5*4*3*2*1= \\ 30*4*3*2*1= \\ 120*3*2*1= \\ 360*2*1= \\ 720*1= \\ 720[/tex]
Answer:
The number of different gardens a farmer can plant is:
720
Step-by-step explanation:
We are asked to find the different number of arrangements that can be done such that he gets one row each of six vegetables.
i.e. we can arrange 6 numbers in different ways.
This means that we have to use the method of permutation which is used to arrange a specific number of items.
We know that the arrangement of 6 elements is given as:
[tex]6![/tex]
The value of this expression is given as:
[tex]6!=6\times 5\times 4\times 3\times 2\times 1\\\\6!=720[/tex]
Hence, the different gardens that a farmer can plant if he wants one row each of six vegetables is:
720
