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28 October, 06:50

The sum of the digits of a two digit number is 15. if the digits are reversed, the new number is 27 less than the original number. find the original number.

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Answers (2)
  1. 28 October, 07:44
    0
    Let 10x+y be the original number

    x+y=15

    10x+y-27=10y+x

    Solving the equation, we have x=9, y=6

    Hence the number is 96
  2. 28 October, 09:18
    0
    Define original value of the two digit

    I make an example, a is the first digit and b is the second digit. The original value of the digit will be

    10a + b

    because a stands as tens and b stands as units

    Make an equation system

    The sum of two digit is 15

    ⇒ a + b = 15 (this is first equation)

    If the digits are reversed, the new number is 27 less than the original number. That means b will stand as tens, and a will stand as units.

    ⇒ 10b + a = (10a + b) - 27 (this is second equation)

    Solve the equation

    To find the numbers, we should solve the first and second equation.

    From the first equation

    a + b = 15

    a = 15 - b

    Subtitute 15 - b to a in the second equation

    10b + a = 10a + b - 27

    10b + (15 - b) = 10 (15 - b) + b - 27

    9b + 15 = 150 - 10b + b - 27

    9b + 10b - b = 150 - 27 - 15

    18b = 108

    b = 6

    Subtitute 6 as b to the first equation

    a = 15 - b

    a = 15 - 6

    a = 9

    The original number is 96
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