Currently, each student in our school system is assigned a 6-digit (each

digit is 0-9) student identification number.

As the school system plans for the future, they are considering using a 7th

character, that will be a letter (each letter can be A-Z).

Use the counting principle to determine how many unique student

identification codes can be created with these 7 characters (1 letter

followed by 6 digits).

Question

Mathematics

Kennedy Barber

4 January, 07:01

Currently, each student in our school system is assigned a 6-digit (each

digit is 0-9) student identification number.

As the school system plans for the future, they are considering using a 7th

character, that will be a letter (each letter can be A-Z).

Use the counting principle to determine how many unique student

identification codes can be created with these 7 characters (1 letter

followed by 6 digits).

+2

Answers (1)

Know the Answer?

Evangeline Chandler · Answer 1

26,000,000 codes

Step-by-step explanation:

To find how many unique codes can be created, we just need to check how many possibilities there are for each letter or digit in the code.

Each letter has 26 possible values, and each digit has 10 possible values, so as we have 1 letter and 6 digits, the total number of unique codes are:

26 * 10 * 10 * 10 * 10 * 10 * 10 = 26,000,000 codes.