Question

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1. Rationalise the denomi
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Answer 1

Answer:

√ Verified Answer

Across

1. The \small\underline\pink{Prime}Prime Factorisation of composite numbers is unique.

4. Between any two real numbers their lie \small\underline\pink{rational}rational real numbers.

5. The union of all rational and irrational numbers is \small\underline\pink{real \: numbers.}realnumbers.

6. A number that cannot be represented in p/q form is \small\underline\pink{irrational \: numbers.}irrationalnumbers.

8. For any two numbers HCF × LCF = \small\underline\pink{product}product of the numbers.

9. Name the set of whole numbers and their opposites \small\underline\pink{integers.}integers.

10. To Rationalize the denominator, we have to multiply the given number by its \small\underline\pink{numerator.}numerator.

Down

2. A number that can be expressed as the ratio of two integers \small\underline\pink{rational \: numbers.}rationalnumbers.

3. 2.35 is a \small\underline\pink{non–terminatin,

$√ Verified Answer \\ </p><p>Across \\ </p><p>1. The \small\underline\pink{Prime}Prime Factorisation of composite numbers is unique. \\ </p><p>4. Between any two real numbers their lie \small\underline\pink{rational}rational real numbers. \\ </p><p>5. The union of all rational and irrational numbers is \small\underline\pink{real \: numbers.}realnumbers. \\ </p><p>6. A number that cannot be represented in p/q form is \small\underline\pink{irrational \: numbers.}irrationalnumbers. \\ </p><p>8. For any two numbers HCF × LCF = \small\underline\pink{product}product of the numbers. \\ </p><p>9. Name the set of whole numbers and their opposites \small\underline\pink{integers.}integers. \\ </p><p>10. To Rationalize the denominator, we have to multiply the given number by its \small\underline\pink{numerator.}numerator. \\ </p><p>Down \\ </p><p>2. A number that can be expressed as the ratio of two integers \small\underline\pink{rational \: numbers.}rationalnumbers. \\ </p><p>3. 2.35 is a \small\underline\pink{non–terminating}non–terminating decimal expansion. \\ </p><p>7. There is a real number corresponding to every point on \small\underline\pink{number \: line}numberline \\ </p><p>\huge\fbox\red{hope}{\colorbox{yellow}{it}}\fbox\orange{helps} \\ hopeithelps</p><p>$

g}non–terminating decimal expansion.

7. There is a real number corresponding to every point on \small\underline\pink{number \: line}numberline

\huge\fbox\red{hope}{\colorbox{yellow}{it}}\fbox\orange{helps}hopeithelps