Algebra II Review Word Problem?

anonymousanonymous
in Science & Mathematics

The sum of the digits of a three digit number is 9. When the order of the digits is reversed, the newly formed number is 396 greater than the original number. If the leftmost digit is one-third of the middle digit, what is the number?

If you can please explain the work for me thanks in advance.

Comments

  • rachaelrachael

    There are only two possibilities 135 and 261 that meet condition 1 and condition 3. 135 also meets condition 2 so its 135.

  • ireadlotsireadlots

    If the first digit of the original number is a, the second b and the third c, then the original number is

    100a + 10b + c

    The reversed number is 100c + 10b + a

    100a + 10b + c + 396 = 100c + 10b + a

    99a -99c + 396 =0

    99(c-a) = 396

    c-a = 396/99 = 4, => c = a+4

    We also know that a + b + c = 9 , and the leftmost digit of the number (a) is 1/3 of the middle number (b), 3a = b

    a + b + c = 9

    a + 3a + a+4 = 9

    5a = 5

    a = 1

    c = 5

    b = 3

    The original number was 135, the middle number is 3

  • dejavu-studejavu-stu

    The number is 135.

    I started by looking at the "leftmost digit is one-third of the middle digit.." So, the number can be 135 and 261, since 1 is one-third of 3, and 2 is one-third of 6.

    135 reversed is 531, and 531-135=396.

    261 reversed is 162, and 162 is obviously not 396 more than 261, so 135 is the answer.

  • northstarnorthstar

    The number is 135.

    _________

    Let the number be abc.

    We have:

    a + b + c = 9

    a = b/3

    (100c + 10b + a) - (100a + 10b + c) = 396

    From the second equation:

    a = b/3

    b = 3a

    From the third equation:

    (100c + 10b + a) - (100a + 10b + c) = 396

    100(c - a) + (a - c) = 396

    100(c - a) - (c - a) = 396

    99(c - a) = 396

    c - a = 396/99 = 4

    c = a + 4

    Plug these values back into the first equation.

    a + b + c = 9

    a + 3a + (a + 4) = 9

    5a + 4 = 9

    5a = 5

    a = 1

    Now solve for b and c.

    b = 3a = 3*1 = 3

    c = a + 4 = 1 + 4 = 5

    The number is 135.

  • millie-stewart_60c26c7fbf339millie-stewart_60c26c7fbf339

    if the left digit is x,middle digit=3x ,last digit is y

    the sum of all digits x+3x+y=9

    4x +y=9..................(1)

    the original number =100x+30x+y=130x+y

    the reversed number=100y+30x+x=31x+100y

    hence 31x +100y=130x+y +396

    i.e. 99x-99y=-396

    x-y=-4.......................................(2)

    solving equations

    x=1 y=5

    the number=130*1+5=135

  • dreydrey

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  • eawoodalleawoodall

    A+B+C=9.

    100A+10B+1C

    100C+10B+1A-396=100A+10B+1C.

    99C+0B-99A-396=0.

    99C=99A+396.

    divide by 99.

    C=A+4.

    A*3=B.

    substitute

    (A)+(3A)+(A+4)=9.

    5A+4=9.

    5A=5.

    A=1.

    1*3=B.

    3=B.

    C=1+4.

    C=5.

    135.

    1+3+5=9. checked.

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