How many license plates are possible with 3 letters and 3 numbers?

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 car number plates can be made if each plate contains 3 different letters followed by 3 different digits?

So, the correct answer is “468000”.

How many combinations are there with 3 letters and numbers?

26⋅26⋅26=263=17576. If you want the letters to be unique, the calculation changes slightly.

How many license plates with 3 letters followed by 3 digits exist if exactly one of the digits is 1?

5 How many license-plates with 3 letters followed by 3 digits exist if exactly one of the digits is 1? 8 · 7 · 6 · 5 · 4 · 3 · 2 · 1 = 40,320 ways.

How many license plates using the English alphabet can be made using 2 or 3 letters followed by 2 or 3 digits?

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 combinations are there with 3 numbers and letters?

How many license plates can you make when a license plate consists of 3 numbers and 3 letters and there can be no repeats of numbers or letters?

By the multiplication principle, there are a total of possible license plates that can be made. Thus, there are 17,576 possible license plates.

How many license plates with 3 letters followed by 3 digits exist if exactly one of the digit is 1?

How many license plates of 3 symbols letter and digits can be made using at least 2 letters for each?

How many license plates of 3 symbols (letters and digits) can be made using at least 2 letters for each? The answer is 37,856 but I am not quite sure how to get to that and yes that is truly the answer.

How many possible letters can a license plate begin with?

If you are not familiar with the n! (n factorial notation) then have a look the factorial lessons. A license plate begins with three letters. If the possible letters are A, B, C, D and E, how many different permutations of these letters can be made if no letter is used more than once?

How many different types of permutations can be created with 26 letters?

Since repetitions are allowed, we have that for each letter used, 26 still remain for the next choice, and for each digit used, 10 still remain for the next choice. Hence, by the multiplication principle, the total different number of letter permutations is 26 ×26 ×26 = 17576 and the total number of digit permutations is 10 ×10 × 10 = 1000

How many permutations are there for the license plate?

Finally, there are 3 possible choices. The problem involves 5 things (A, B, C, D, E) taken 3 at a time. There are 60 different permutations for the license plate. How To Use The Permutation Formula To Solve Word Problems?