SOLUTION: A code of six letters must be chosen. The letters cannot be repeated. How many different codes are possible?
Algebra.Com
Question 531441: A code of six letters must be chosen. The letters cannot be repeated. How many different codes are possible?
Answer by oberobic(2304) (Show Source): You can put this solution on YOUR website!
| Position
| Possible Choices
|
| 1
| 26
|
| 2
| 25
|
| 3
| 24
|
| 4
| 23
|
| 5
| 22
|
| 6
| 21
|
Total possibilies = 26*25*24*23*22*21 = 165765600
.
Done.
RELATED QUESTIONS
A code consists of 3 letters. None of the letters can be repeated. How many different... (answered by josmiceli)
A code consists of 2 letters and then 4 digits. Any of the letters and numbers can be... (answered by Fombitz)
How many different codes can be made using letters of the word BEAUTY if each code must... (answered by ewatrrr)
How many 4-letter code words are possible using any of the letters of the alphabet if... (answered by TimothyLamb)
An airport identification code is made up of three letters, like the examples shown: ABQ, (answered by jim_thompson5910)
A code consists of 3 letters and then 3 digits. Any of the letters and numbers can be... (answered by stanbon)
a four-letter identification code can be formed from the letters A, B, C, D, and E.... (answered by jim_thompson5910)
An identification code is to consist of 4 letters followed by 3 digits. Determine the... (answered by VFBundy)
The access code for a car's security system consists of 4 digits. The first digit cannot (answered by stanbon)