If aabb is a four digit number and also a perfect square then the value of $a + b$ is

12

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11

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10

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9

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Solution

The correct option is B $11$
Given number is $a a b b = 1000 a + 100 a + 10 b + b$
$= 1100 a + 11 b$
$= 11 (100 a + b)$
For $a a b b$ to be a perfect square, $100 a + b$ should be of the type
$11 \times n^{2}$ where n is natural number
$∴ a a b b = 11 \times 11 \times n^{2}$
By Hit and Trial
When $n = 4$
$11 \times 11 \times n^{2} = 121 \times 16 = 1936$ . This is not in the form aabb.
When $n = 5$
$11 \times 11 \times n^{2} = 121 \times 25 = 3025$ . This is not in form aabb.
When $n = 6$
$11 \times 11 \times n^{2} = 121 \times 36 = 4356$ . This is not in form aabb.
When $n = 7$
$11 \times 11 \times n^{2} = 121 \times 49 = 5629$ . This is not in form aabb.
When $n = 8$
$11 \times 11 \times n^{2} = 121 \times 64 = 7744$ . This is of the form aabb.
So, $7744$ is the four digit number.
$∴ a + b = 7 + 4 = 11$
Hence, option 'B' is correct.

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Similar questions

If aabb is a 4 digit number and also a perfect square then the value of a+b is?

Question 141

A three-digit perfect square is such that, if it is viewed upside down, the number seen is also a perfect square. What is the number?

[Hint: The digits 1, 0 and 8 stay the same when viewed upside down, whereas 9 becomes 6 and 6 becomes 9].

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