Arrangement, permutation and combination formulas

Important
  • Arrangement: n items can be arranged in n! ways
  • Permutation: A way of selecting and arranging r objects out of a set of n objects: $$ ^{n}\textrm{P}_{r}$$ = $$\frac{n!}{(n-r)!}$$
  • Combination: A way of selecting r objects out of n (arrangement does not matter)  $$ ^{n}\textrm{C}_{r}$$ = $$\frac{n!}{r!(n-r)!}$$
  • Selecting r objects out of n is same as selecting (n-r) objects out of n $$^{n}C_{r}$$ = $$^{n}C_{n-r}$$
  • Also, one will note, $$^{n}\textrm{C}_{r} \times r!= ^{n}\textrm{P}_{r}$$
  • $$\sum_{k=0}^{n}$$ $$^{n}C_{k}=2^{n}$$
  • nCr + nC(r-1) = (n+1)Cr
  • nC0 = nCn = 1 
Question 1

The number of groups of three or more distinct numbers that can be chosen from 1, 2, 3, 4, 5, 6, 7 and 8 so that the groups always include 3 and 5, while 7 and 8 are never included together is

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Question 2

The number of ways of distributing 20 identical balloons among 4 children such that each child gets some balloons but no child gets an odd number of balloons, is

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Question 3

The number of integers greater than 2000 that can be formed with the digits 0, 1, 2, 3, 4, 5, using each digit at most once, is

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