Only once if they are: V L or D
Four times if they are: I X C or M
Only once if they are: V, L or D Only four times if they are: I, X, C or M
In Roman numerals, M represents the value 1000. There is no limit to how many times M can be repeated in a Roman numeral representation, so it can appear as many times as needed to represent the desired value. For example, MMM represents 3000.
chocolate = 9 letters, where o and c are repeated 2 times. There are 9!/(2!2!) = 90,720 ways.
If the numbers and letters can be repeated then there are 45,697,600 possible outcomes. If the letters and numbers can not be repeated there are 32,292,000 possible outcomes.
about 6966 times
Only once if they are: V, L or D Only four times if they are: I, X, C or M
In Roman numerals, M represents the value 1000. There is no limit to how many times M can be repeated in a Roman numeral representation, so it can appear as many times as needed to represent the desired value. For example, MMM represents 3000.
26. There are only 26 letters in the alphabet therefore there only 26 letters can be used but repeated hundreds of times.
chocolate = 9 letters, where o and c are repeated 2 times. There are 9!/(2!2!) = 90,720 ways.
It is repeated 85 times in Quran.
If the numbers and letters can be repeated then there are 45,697,600 possible outcomes. If the letters and numbers can not be repeated there are 32,292,000 possible outcomes.
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.
Without allowing repeated letters there are 38 possible words:GEEGHEEGLEELEGEREGERGREEVERGEHEELHELVEHEREEELLEELEERREELELVERLEVERREVELEREREEEVERVEEREVEVEEGELLEGERGREGVEGHEEHHERLLEHRHERELLEVERREREV
Ther are 6 letters in the word letter two of which are repeated which gives a total of four different letters.
50 times
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."
"Almond has been" is not repeated in the Bible