Find the number of ways in which 6 toffees can be distributed over 5 different people namely a, b, c, d and e?
Answers
Answered by
2
Answer:
we have to select 6 chocolates and arrange Or distributes to 5 people. Therefore use permutation such as
6P5 = 6! /(6-5)!
= 6!
= 720
Answered by
0
Answer:
Step-by-step explanation:
- We assume that all the toffees are similar , Then number of ways are (n+r-1)^Cr-1 .
- Here A+B+C+D+E =6 Here r=5, n = 6
- number of ways= 6+5-1^ C 5-1 = C4^10 =210
- When all the toffees are different then each toffee can be distributed to any of the five . So total ways are 5^6
To know more about such ways finding question , visit the site below:
https://brainly.in/question/51942955?source=quick-results&auto-scroll=true&q=find%20number%20of%20ways%20distribute%20%2B%20verified%20answer
Similar questions