Evaluate the expression.
npr find the answer 6^P0
Thank you
nPr=n!/((n-r)!)
6P0=6!/(6-0)!=1
To evaluate the expression 6^P0, we need to understand the concept of permutations (nPr). The notation nPr represents the number of permutations of "r" objects taken from a total of "n" objects. The formula for nPr is:
nPr = n! / (n - r)!
Here, "n!" represents the factorial of "n," which means multiplying all the positive integers from 1 to "n" together.
In this case, the expression is 6^P0, which means we are looking for the number of permutations when selecting 0 objects from a set of 6 objects.
Using the formula, we can calculate it as:
6^P0 = 6! / (6 - 0)!
= 6! / 6!
= 720 / 720
= 1
Therefore, the answer to 6^P0 is 1.