Permutations in Floral Arrangements

How many possible flower arrangements are there?

Kate has 10 different types of flowers but she wants to make a floral arrangement with only 7 of them.

Answer:

The permutation shows that the number of arrangements when Kate has 10 different types of flowers but she wants to make a floral arrangement with only 7 of them will be 604800 arrangements.

Permutation is a mathematical concept that deals with arranging objects or elements in a particular order. In this case, Kate has 10 different types of flowers but she only wants to use 7 of them for her floral arrangement.

To calculate the number of possible arrangements, we use the formula for permutation which is nPr = n! / (n - r)!, where n is the total number of objects and r is the number of objects to be arranged.

Therefore, for Kate's situation:

10P7 = 10! / (10 - 7)! = 10! / 3! = 604800

So, there are a total of 604800 possible arrangements that Kate can create using 7 out of her 10 different types of flowers.

← Math accelerated chapter 11 congruence similarity and transformations Special right triangles solving the secrets →