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Question
The sum of the digits in a two-digit number is 7. The number obtained by interchanging the digits exceeds the original number by 27. Find the two-digit number.
Let the units place digit in original number bey and tens place be x.
So, Original number = `square`
Now, from the first condition, x + y = `square` ...(i)
From the second condition, 10y + x = `square` + `square`
10y + x – `square` = `square`
`square` – `square` = `square`
9(y – `square`) = `square`
y – `square = square/9 = square` ...(ii)
Adding equation (i) and (ii), we get
2y = `square`
⇒ y = `square`
Putting y = `square` equation (i), we get
x + `square` = 7
⇒ x = `square`
So, Original number = 10x + y = 10 × `square` + `square`
= `square`
Solution
Let the units place digit in original number be y and tens place be x.
So, Original number = 10x + y
Now, from the first condition, x + y = 7 ...(i)
From the second condition, 10y + x = 10x + y + 27
10y + x – 10x + y = 27
9y – 9x = 27
9(y – x) = 27
y – x = `bb27/9` = 3 ...(ii)
Adding equation (i) and (ii), we get
2y = 10
⇒ y = 5
Putting y = 5 equation (i), we get
x + 5 = 7
⇒ x = 2
So, Original number = 10x + y = 10 × 2 + 5
= 25
