<u>SOLUTION:</u> Let the two-digit number be ab, where 'a' is the tens digit and 'b' is the units digit. <span>"The sum of the digits of a two-digit number is 10" implies a + b = 10 (Equation 1)
</span><span>"When the digits are reversed, the new number is 18 less than the original number" is algebraically written as ba = ab - 18 >> bx10 + ax1 = (ax10 + bx1) - 18 </span>>> 10b + a = 10a + b - 18 >> 9a - 9b = 18 >> 9(a - b) = 18 >> a - b = 2 >> a = b + 2 (Equation 2)
Now substitute equation 2 in equation 1 to get a + b = 10 >> (b + 2) + b = 10 >> 2b = 8 >> b = 4
Plug this value back in equation 1 to get a = b + 2 = 4 + 2 = 6
So a = 6 and b = 4. Hence, the original number is 64.
<u>CHECK</u><u>:</u> <span><u>Given</u>: The sum of the digits of a two-digit number is 10 </span><u>Check</u>: 6 + 4 = 10 (so it is true)
<span><u>Given</u>: When the digits are reversed, the new number is 18 less than the original number </span><u>Check</u>: Digits reversed: 64 reversed becomes new number 46, and 46 is 18 less than 64, that is, 46 = 64 - 18.
