\(\left( {\frac{{\sqrt {625} }}{{11}} \times \frac{{14}}{{\sqrt {25} }} \times \frac{{11}}{{\sqrt {196} }}} \right){\kern 1pt} \) is equal to :
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The number of perfect square numbers between 50 and 1000 is = ?
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2
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If 1537* is a perfect square, then the digit which replace * is = ?
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3
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Given \(\sqrt 2 = 1.414.\) Then the value of \(\sqrt 8\) + \(2\sqrt {32} \) - \(3\sqrt {128}\) + \(4\sqrt {50}\) is = ?
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4
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The cube root of .000216 is:
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5
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The least number by which 294 must be multiplied to make it a perfect square, is = ?
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6
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\(\sqrt {\frac{{16}}{{25}}} \times \sqrt {\frac{?}{{25}}} \times \frac{{16}}{{25}} = \frac{{256}}{{625}}\)
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7
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The value of \(\sqrt {0.000441} \) is = ?
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8
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The value of \(\sqrt {\frac{{0.16}}{{0.4}}} \) is = ?
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9
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If \(a = \frac{{\sqrt 3 + \sqrt 2 }}{{\sqrt 3 - \sqrt 2 }}, b = \frac{{\sqrt 3 - \sqrt 2 }}{{\sqrt 3 + \sqrt 2 }}\) then the value of \({a^2} + {b^2}\) would be = ?
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10
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A man born in the first half of the nineteenth century was x years old in the year x2. He was born in ?
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