Q. How many substrings (of all lengths inclusive) can be formed from a character string of length 8? (Assume all characters to be distinct)

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Q. The number of diagonals can be drawn in a hexagon is ______

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Q. The number of binary strings of 17 zeros and 8 ones in which no two ones are adjacent is ___________

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Q. How many words that can be formed with the letters of the word ‘SWIMMING’ such that the vowels do not come together? Assume that words are of with or without meaning.

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Q. A number lock contains 6 digits. How many different zip codes can be made with the digits 0–9 if repetition of the digits is allowed upto 3 digits from the beginning and the first digit is not 0?

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Q. Let M be a sequence of 9 distinct integers sorted in ascending order. How many distinct pairs of sequences, N and O are there such that i) each are sorted in ascending order, ii) N has 5 and O has 4 elements, and iii) the result of merging N and O gives that sequence?

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Q. 14 different letters of alphabet are given, words with 6 letters are formed from these given letters. How many number of words are there which have at least one letter repeated?

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Q. In how many ways can 10 boys be seated in a row having 28 seats such that no two friends occupy adjacent seats?

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Q. How many ways can 8 prizes be given away to 7 students, if each student is eligible for all the prizes?

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Q. In a playground, 3 sisters and 8 other girls are playing together. In a particular game, how many ways can all the girls be seated in a circular order so that the three sisters are not seated together?

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Q. How many numbers of three digits can be formed with digits 1, 3, 5, 7 and 9?

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Q. The size of a multiset is 6 which is equal to the number of elements in it with counting repetitions (a multiset is an unordered collection of elements where the elements may repeat any number of times). Determine the number of multisets can be grouped from n distinct elements so that at least one element occurs exactly twice?

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Q. How many words can be formed with the letters of the word ‘CASTLE’ when ‘O’ and ‘A’ occupying end places.

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Q. Determine the number of ways of choosing a cricket team (consists of 11 players) out of 18 players if a particular player is never chosen.

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Q. How many different choices can be made from 5 roses, 4 marigold and 8 sunflowers if at least one flower is to be chosen for making of garland?

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Q. In how many ways 6 pens can be selected from 15 identical black pens?

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Q. Determine the number of ways of selecting one or more letters from the letters BBBBBB?

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Q. Determine the number of ways such that 5 men and 5 women be seated at a round table if no two women are seated together.

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Q. Find the number of ways in which 4 people E, F, G, H, A, C can be seated at a round table, such that E and F must always sit together.

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Q. There are 6 equally spaced points A, B, C, D, E and F marked on a circle with radius R. How many convex heptagons of distinctly different areas can be drawn using these points as vertices?

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