**Step by step solution by experts to help you in doubt clearance & scoring excellent marks in exams. Therefore, total no. of words =2×120×6= 1440.**

In the same way, How many 5 letter arrangements of the letters can be created if each letter is used only once?

1 Answer. If you can only use each letter once and since each letter is distinct , there are **120** possible arrangements .

How many different words with or without meaning can be formed from the word Covid? 0

Hence, How many different words with or without meaning can be made using all the vowels at a time? Step by step solution by experts to help you in doubt clearance & scoring excellent marks in exams. Therefore, total no. of words =2×120×6=**1440**.

Then, How many words with or without meaning can be formed by using all letters of the word refund?

Thus, required number of words that can be formed = 8! = **40320**. Was this answer helpful?

**How many combinations of 5 letters are there?**

The number of combinations possible with 5 letters is **65,780**.

**How many ways can you order 5 letters?**

This is simply 5! =**120** different ways.

**How many 5-letter word combinations are there?**

The answer depends on the dictionary. According to Free Dictionary, there are **158,390 words** with five letters. Volume 6 of Office’s Scrabble Dictionary claims there are 8,996 available words with five letters while other sources claim that there are only 5,350 words that you can create with five letters in word games.

**How many words with or without meaning can be formed by using the letters of the word triangle?**

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**How many words with or without meaning can be formed using all letters of the word EQUATION using each letter exactly one?**

Summary: The number of words, with or without meaning, that can be formed using all the letters of the word EQUATION, using each letter exactly once is **40,320**.

**How many words with or without meaning can be formed by using all the letters of the word orange?**

**720** words with or without meaning, can be formed by using all the letters of the word, ‘ORANGE’, using each letter exactly once because we have 6 character and whn we calculate factorial of 6 which is 720 .

**How many words with or without meaning can be formed using all the letters of the word university in how many of them vowels are never together?**

A total number of arrangements of 7 letters (here all distinct) is 7! And the total number of arrangements of grouped letters (Here U, I, E, I) is . Hence, a total number of words formed during the arrangement of letters of word UNIVERSITY such that all vowels remain together is equals to **60480**.

**How many words with or without meaning can be formed using all the letters of the word match at a time so that the vowels and consonants occur together?**

Therefore, **1440 words** with or without meaning, can be formed using all the letters of the word ‘EQUATION’, at a time so that the vowels and consonants occur together. Note: Always keep an eye on the keywords used in the question.

**How many words with or without meaning can be formed using all the letters of the word Monday?**

Therefore, the number of words that can be formed using all the letters of the word MONDAY, using each letter exactly once is 6×5×4×3×2×1=6! =**720**.

**How many words with or without meaning can be formed by using the letters of the word mixture so that vowels are never together?**

So, **2160** is the answer. In given word, we treat the vowels AUE as one letter.

**How many words with or without meaning can be formed by using all the letters of the word pinky using each letter exactly once?**

The number of words, with or without meaning, that can be formed using all the letters of the word EQUATION, using each letter exactly once is **40,320**.

**How many combinations are there with 5 numbers without repetition?**

Most Helpful Expert Reply. Total Number of Numbers which can be formed by numbers 1,2,3,4,5 (without repeating digitsi) = 5*4*3*2*! = 5! = **120**.

**Can 5 letter words?**

5-letter words starting with CAN

canal | Cando |
---|---|

candy | caned |

caneh | caner |

canes | CANEX |

cangs | canid |

**How many ways can you select 5 letters from the set of letters in the English alphabet?**

5! = 26 · 25 · 24 · 23 · 22 5 · 4 · 3 · 2 · 1 = **65780**.

**What is the number of ways to arrange 5 objects?**

So we say that there are 5 factorial = 5! = 5x4x3x2x1 = **120** ways to arrange five objects.

**How many ways can you arrange 5 letters in the word daddy?**

Now, you have got 5 letters(or different items), i.e., F, A, TH, E, R, which can be arranged in **5!** ways. So your answer should be 5! = 120.

**How many different arrangements of 5 letters can be made from the 26 letters of the alphabet?**

The different arrangements of five letters that can be made from 26 letters of the alphabet are **7,893,600 ways**.