![]() How many distinct words can be formed using the word MINIMUM?ĩ. How many different words can be formed from the alphabets of the word SCISSORS?ĩ. Find out the number of distinctive words that can be formed using the word GOOD.Ĩ. In how many ways can Kamal choose a consonant and a vowel from the letters of the word ALLAHABAD?ħ. If no repetition is not allowed then how many numbers between 20 can be formed using the digits from 0 to 7?Ħ. How many can 3 digits be formed using the digits from 1 to 5 if the digit 2 is never there in the number?ĥ. Find out how many distinct three-digit numbers can be formed using the digits 1, 2, 3, 4, 5, 6, 7, 8, 9 such that the digits are in ascending order.Ĥ. Find out the distinct four-letter words that can be formed using the word SINGAPORE.ģ. If repetition is not allowed then how many distinct three-digit numbers can be formed using the digits (1, 2, 3, 4, 5)?Ī. B 15 Part 2 Permutations of n things taking some of them at one time and when some things are alikeĭirections: Answer the questions based on the data given to youġ. What is the number of different sums of money the person can form?Ĩ. A person has 4 coins if different denominations. For the above word, if the vowels are always together than how many types of arrangement can be possible?Ĩ. In how many ways can the letters of the word BEAUTY be arranged?ħ. For the above word how many different types of arrangement are possible so that the vowels are always together?Ī. In how many different ways can the letters of the word MAGIC can be formed?Ī. In how many different ways can five friends sit for a photograph of five chairs in a row?Ī. Find out how many distinct three-digit numbers can be formed using all the digits of 1, 2, and 3.ģ. Using all the letters of the word GIFT how many distinct words can be formed?Ī. Permutation and Combination Practice Questions Part 1 Permutation of ‘x’ things using all of themĭirections: For the questions in the section you need to find the distinctive ways to find the answer.ġ. 3.11 Answer: Browse more Topics under Permutation And Combination ![]()
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