Each license plate in a certain state has six characters with repeats allowed here are the possibilities for each character
First: The digits 1 2 3 4 or 5
Second: the 26 letters of the alphabet
Third: the 26th letters of the alphabet
Fourth: the 10 digits 0 through 9
Fifth: the 10 digits 0 through 9
6th: the 10 digits 0 through 9
How many license plates are possible in this state
Since each license plate has six characters and repeats are allowed for each character, we can find the total number of possibilities for each character and multiply them together to get the total number of possible license plates.
For the first character, there are 5 possibilities (digits 1 through 5).
For the second character, there are 26 possibilities (letters of the alphabet).
For the third character, there are 26 possibilities (letters of the alphabet).
For the fourth character, there are 10 possibilities (digits 0 through 9).
For the fifth character, there are 10 possibilities (digits 0 through 9).
For the sixth character, there are 10 possibilities (digits 0 through 9).
To find the total number of possible license plates, we multiply the number of possibilities for each character:
Total = 5 * 26 * 26 * 10 * 10 * 10 = 3,380,000
Therefore, there are 3,380,000 possible license plates in this state.
To find the total number of possible license plates in this state, we need to multiply the number of possibilities for each character position together.
For the first character position, we have 5 possibilities (digits 1 through 5).
For the second character position, we have 26 possibilities (the 26 letters of the alphabet).
For the third character position, we also have 26 possibilities (the 26 letters of the alphabet).
For the fourth character position, we have 10 possibilities (digits 0 through 9).
For the fifth character position, we have 10 possibilities (digits 0 through 9).
For the sixth character position, we have 10 possibilities (digits 0 through 9).
To calculate the total number of possibilities, we multiply these numbers together:
5 * 26 * 26 * 10 * 10 * 10 = 6,760,000
Therefore, there are 6,760,000 possible license plates in this state.
To find the number of possible license plates in this state, you need to multiply the number of possibilities for each character.
First character: There are 5 possible digits (1, 2, 3, 4, or 5).
Second character: There are 26 possible letters in the alphabet.
Third character: There are 26 possible letters in the alphabet.
Fourth character: There are 10 possible digits (0 through 9).
Fifth character: There are 10 possible digits (0 through 9).
Sixth character: There are 10 possible digits (0 through 9).
To find the total number of possible license plates, multiply these numbers together:
5 (possibilities for the first character) x 26 (possibilities for the second character) x 26 (possibilities for the third character) x 10 (possibilities for the fourth character) x 10 (possibilities for the fifth character) x 10 (possibilities for the sixth character) = 1,690,000 possible license plates.
So, there are 1,690,000 possible license plates in this state.