Question : The product of the digits of a 2-digit number is 24. If we add 45 to the number, the new number obtained is a number formed by interchanging the digits. What is the original number?
Option 1: 54
Option 2: 83
Option 3: 38
Option 4: 45
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Correct Answer: 38
Solution : Let the unit digit of the number be y and the tens digit be $x$. Number = $10x + y$ Product of digits = $x × y = 24$ ------(i) According to the question, $10x + y + 45 = 10y + x$ $9y - 9x = 45$ $y - x = $$\frac{45}{9}$ = 5 ---------(ii) Solving (i) and (ii), we get: $x=3$ and $y=8$ Number = 38 Hence, the correct answer is 38.
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