Table of Contents
- 1 How many license plates can be made using either three digits followed by three uppercase English letters or three uppercase English letters followed by three dig its?
- 2 How many license plates can be made using either three uppercase English letters followed by three digits or two uppercase English letters followed by four digits?
- 3 How many license plates can be made using two uppercase English letters followed by two digits?
- 4 How many automobile license plates can be made involving 3 letters followed by either 2 or 3 digits?
- 5 How many license plates can be made using?
- 6 How many different license plates are possible if each contains 2 letters?
How many license plates can be made using either three digits followed by three uppercase English letters or three uppercase English letters followed by three dig its?
For each of those choices we have 26 possible choices for the second character. For each of these two choices we have 26 choices for the third character. So far we seen a possible 263 choices. For each of those choices of three letters we need to choose 3 numbers (0-9).
How many license plates can be made using either three uppercase English letters followed by three digits or two uppercase English letters followed by four digits?
Example: How many different license plates can be made if each plate contains a sequence of three uppercase English letters followed by three digits? Solution: By the product rule, there are 26 ∙ 26 ∙ 26 ∙ 10 ∙ 10 ∙ 10 = 17,576,000 different possible license plates.
How many license plates can be made using two uppercase English letters followed by two digits?
Combining these results, it follows that there are 676 x 1000 = 676,000 different license plates possible.
How many license plates can be made using either two uppercase English letters followed by four digits or?
So the result, the real result number of plates that we can make a is the sum of these two. So L one plus L two. And the result of this is 52,457,600 ways for possible license plates.
How many Licence plates can be made using either?
Solution: By the product rule, there are 26 ∙ 26 ∙ 26 ∙ 10 ∙ 10 ∙ 10 = 17,576,000 different possible license plates.
How many automobile license plates can be made involving 3 letters followed by either 2 or 3 digits?
Each of the three letter combinations can be combined with any of the three number combinations so the total is 17,576 x 1000 = 17,576,000 different combinations possible.
How many license plates can be made using?
And so on for every letter of the alphabet. The same applies for the three digits. So for a license plate which has 2 letters and 3 digits, there are: 26×26×10×10×10=676,000 possibilities.
How many different license plates are possible if each contains 2 letters?
The same applies for the three digits. So for a license plate which has 2 letters and 3 digits, there are: 26×26×10×10×10=676,000 possibilities.