holly chooses seven out of nine plants for the front of her house with the remaining plants to be used on…

holly chooses seven out of nine plants for the front of her house with the remaining plants to be used on the side of the house. if order does not matter, in how many ways can she choose the plants for the front of the house?\no 7\no 9\no 21\no 36

holly chooses seven out of nine plants for the front of her house with the remaining plants to be used on the side of the house. if order does not matter, in how many ways can she choose the plants for the front of the house?\no 7\no 9\no 21\no 36

Answer

Explanation:

Step1: Identify combination formula

The combination formula is $C(n,r)=\frac{n!}{r!(n - r)!}$, where $n$ is the total number of items and $r$ is the number of items to be chosen. Here, $n = 9$ and $r=7$.

Step2: Calculate factorial values

We know that $n!=n\times(n - 1)\times\cdots\times1$. So, $9! = 9\times8\times7\times6\times5\times4\times3\times2\times1$, $7! = 7\times6\times5\times4\times3\times2\times1$, and $(9 - 7)!=2!=2\times1$. Then $C(9,7)=\frac{9!}{7!(9 - 7)!}=\frac{9!}{7!2!}=\frac{9\times8\times7!}{7!\times2\times1}$.

Step3: Simplify the expression

Cancel out the $7!$ terms in the numerator and denominator. We get $\frac{9\times8}{2\times1}=\frac{72}{2}=36$.

Answer:

36