WebA can fill =1&1/2hr 1/3 rd can be filled in 1/2 B can empty in 3/4 hr Remaining 2/3 can empty by =(3/4)*(2/3)=1/2 Remaining 2/3 can fill by A=1hr So in 1hr it can be filled =1-1/2=1/2 Web3 Find the number of possible different 10-letter arrangements using the letters of the word “STATISTICS.” 4 Determine how many eleven-letter arrangements can be formed from the word "CATTARAUGUS." 5 The letters of any word can be rearranged. Carol believes that the number of different 9-letter arrangements of the word “TENNESSEE” is ...
Solved You are rearranging the letters in the word Chegg.com
WebAug 8, 2024 · The total number of different arrangements of 7 letters that are possible if the first letter will be w or k is: 617,831,552. Step-by-step explanation: The number of different arrangements of 7 letters can be formed if the first letter must be w or k such that the repetition of the letters are allowed are: WebJul 17, 2024 · Since all the letters are now different, there are 7! different permutations. Let us now look at one such permutation, say L E 1 M E 2 N E 3 T Suppose we form new permutations from this arrangement by only moving the E's. Clearly, there are 3! or 6 such arrangements. We list them below. highest peak in iceland
How many different arrangements can be made using all …
WebAnd we see that you can arrange three people, or even three letters. You can arrange it in six different ways. So this would be equal to 120 divided by six, or this would be equal to 20. … WebExpert Answer. SENSELESSi) Arranging all the nine letters = 9!4!.3!=5×6×7×8×93×2×1=2520ii) exactly 2 consecuti …. You are rearranging the letters in the word SENSELESS: i) If you rearrange all nine letters, how many different arrangements of the letters can be made? ii) If you rearrange all nine letters, how many arrangements have ... WebJul 3, 2016 · Explanation: There are a total of 10 letters. If they were all distinguishable then the number of distinct arrangements would be 10!. We can make them distinguishable by adding subscripts: If we remove the subscripts from the letter O 's, then it no longer makes any difference what order the O 's are in and we find that 1 2! = 1 2 of our 10 ... how great thou art indonesia