Ask Question
1 November, 23:45

How many 3 digit numbers can be formed if the leading and ending digit cannot be zero

+3
Answers (2)
  1. 2 November, 02:52
    0
    Since we can't use a zero at the start and end, then we have 810 different ways.

    If we can't have a leading digit of zero, then we still have 9 available digits to choose from (9P1)

    Now, the second term can be of any number, so we will have 10 different digits to choose 1 (10P1)

    Now, the final term cannot be a zero, so we will have 9 available digits to choose from (9P1)

    Hence, our final number of ways is: 9 * 10 * 9 = 810 ways.
  2. 2 November, 03:09
    0
    (A) The Leading Digit Cannot Be Zero

    9 Choices For First Digit (1, 2, ..., 9)

    10 Choices For The Second Digit

    10 Choices For The Third Digit

    9*10*10 = 900

    (B) The Leading Digit Cannot Be Zero And No Repetition Of Digits Is Allowed. (Im just going to write lower case letters now xD)

    9 choices for first digit (1, 2, ..., 9)

    9 choices for the second digit, anything different from the first

    8 choices for the third digit, anything different from first and second

    9*9*8 = 648

    (C) The leading digit cannot be zero and the number is a multiple of 5

    9 choices for first digit (1, 2, ..., 9)

    10 choices for the second digit

    2 choices for the third digit (0 or 5)

    9*10*2 = 180

    (D) the number is at least 400

    6 choices for first digit (4, 5, ..., 9)

    10 choices for the second digit

    10 choices for the third digit

    6*10*10 = 600
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “How many 3 digit numbers can be formed if the leading and ending digit cannot be zero ...” in 📘 Mathematics if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers