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Question
The sum of the two-digit number and the number obtained by interchanging the digits is 132. The digit in the ten’s place is 2 more than the digit in the unit’s place. Complete the activity to find the original number.
Activity: Let the digit in the unit’s place be y and the digit in the ten’s place be x.
∴ The number = 10x + y
∴ The number obtained by interchanging the digits = `square`
∴ The sum of the number and the number obtained by interchanging the digits = 132
∴ 10x + y + 10y + x = `square`
∴ x + y = `square` .....(i)
By second condition,
Digit in the ten’s place = digit in the unit’s place + 2
∴ x – y = 2 ......(ii)
Solving equations (i) and (ii)
∴ x = `square`, y = `square`
Ans: The original number = `square`
Solution
Let the digit in the unit’s place be y and the digit in the ten’s place be x.
∴ The number = 10x + y
∴ The number obtained by interchanging the digits = 10y + x
The sum of the number and the number obtained by interchanging the digits = 132
∴ 10x + y + 10y + x = 132
∴ 11x + 11y = 132
∴ x + y = `132/11` ......[Dividng both side by 11]
∴ x + y = 12 .....(i)
By second condition,
Digit in the ten’s place = digit in the unit’s place + 2
∴ x = y + 2
∴ x – y = 2 ......(ii)
Adding equations (i) and (ii), we get
x + y = 12
+ x – y = 2
2x = 14
∴ x = `14/2` = 7
Substituting x = 7 in equation (i), we get
7 + y = 12
∴ y = 12 – 7 = 5
Solving equations (i) and (ii),
∴ x = 7, y = 5
The original number = 10x + y
= 10(7) + 5
= 70 + 5
= 75
