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What is the longest word which has most number of double letters?
bookkeeper
What number when spelled out has no repeated letters and has each of the vowels?
Five thousand
What is the answer to number 8 in the impossible quiz 2?
click on ten letters in
How do you make letters smaller on word documents?
you can change the font number
What number begins with a e and ending with a t with 5 letters?
eight (8)
How many ways can you rearrange the letters in the word pencil?
To calculate the number of ways the letters in the word "pencil" can be rearranged, we first determine the total number of letters, which is 6. Since there are two repeated letters (the letter 'e'), we divide the total number of letters by the factorial of the number of times each repeated letter appears. This gives us 6! / 2! = 360 ways to rearrange the letters in the word "pencil."
How many different ways can you rearrange the letters of the word 'chocolate'?
Make notes that:There are 2 c's in the given word.There are 2 o's in the given word.Since repetition is restricted when rearranging the letters, we need to divide the total number of ways of rearranging the letters by 2!2!. Since there are 9 letters in the word to rearrange, we have 9!. Therefore, there are 9!/(2!2!) ways to rearrange the letters of the word 'chocolate'.
How many ways are there to rearrange the letters in inaneness?
The number of permutations of the letters of the word depends upon the number of letters in the word and the number of repeated letters. Since there are nine letters, if there were no repetitions, the number of ways to rearrange these letters would be 9! or 9 X 8 X 7 X 6 X 5 X 4 X 3 X 2 X 1. But don't do the multiplication just yet. To account for the repeated letters, we need to divide by 3! (for the 3 Ns) by 2! (for the 2Es) and by another 2! (for the 2 Ss). This gives a final answer of 15,120 permutations of these letters.
How many times can the word RANDOM be re-arranged?
The word "RANDOM" consists of 6 distinct letters. The number of ways to rearrange these letters is calculated by finding the factorial of the number of letters, which is 6! (6 factorial). Thus, the total number of rearrangements is 720.
How many ways to rearrange the letters of the word 'CHEESE'?
CHEESE cheese has 6 letters in it. if you have a word with different letters, you do the factorial of the number of letters there are. but you can not do that in this word. since it has 3 E's, then you mut do 6!(factorial) divided by 3! then the answer would be 120
What is the answer to the fortress riddle number 6?
To solve Fortress Riddle number 6, you must rearrange the letters in the word "scaffold" to form another word. The word you are looking for is "floods."
How many ways can you rearrange the letters in the word function?
In the word "function" you have 8 letters. 6 different letters and 2 equal letters.The number of different arrangements that are possible to get are:6!∙8C2 = 720∙(28) = 20 160 different arrangements.
What is the minimum number of four-way switches required to control a ceiling-mounted fan from seven locations?
To control a ceiling-mounted fan from seven locations, you would need a minimum of three four-way switches. Each four-way switch allows you to control the fan from three different locations by working in conjunction with two three-way switches.
What is the max number of ports on a switch?
The minimum number of ports on most brands of switches is four. While there is no industry rule that limits the number of ports on a single switch, practical application has shown that a minimum of four ports is about right.
What are the purposes of switches and hubs?
Switches increase the number of collision domains in the network.
Why does Portuguese alphabet only have 23 letters?
Firstly, Portuguese has 26 letters. Secondly, every language, including Portuguese is written with at least the minimum number of symbols required to represent that language.
How many ways can you rearrange the letters in POSSESSES?
9! (nine factorial)However, since the S is repeated 4 times you need to divide that by 16, and since the E is repeated once, you need to divide that by 2. The final result, which is the number of distinctcombinations of the letters POSSESSES is 11340.
