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In a two digit number if it is known that its units digit exceeds its tens digit by 2 and that the product of the given number and the sum of its digits is equal to 144, then the number is
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- 46
- 42
- 26
- 24
- 46
Correct Option: D
Let the ten’s digit be x
∴ Unit’s digit = x + 2
Therefore, the two digit number
= 10x + x + 2
= 11x + 2 ...(i)
Again,
(11x + 2) (x + x + 2)
= 144
⇒ (11x + 2) (2x + 2) = 144
(11x + 2) (x + 1) = 72
⇒ 11x2 + 2x + 11x + 2 = 72
⇒ 11x2 + 13x – 70 = 0
⇒ 11x2 – 22x + 35x – 70 = 0
⇒ 11x (x – 2) + 35 (x – 2) = 0
⇒ (x – 2) (11x + 35) = 0
| ⇒ x= 2 , − | |
| 11 |
| ⇒ x= 2 , − | |
| 11 |
is not admissible.
∴ The number = 11x + 2
= 11 × 2 + 2 = 24
