297740
How many rational numbers are there between two rational numbers?
1 1
2 0
3 Unlimited.
4 100
Explanation:
Unlimited. (c) There are unlimited numbers between two rational numbers.
RATIONAL NUMBERS
297819
\(1\div\frac{1}{3}=\)
1 \(\frac{1}{3}\)
2 \(3\)
3 \(1\frac{1}{3}\)
4 \(3\frac{1}{3}\)
Explanation:
\(3\) \(1\div\frac{1}{3}\) \(=1\times3\) \(\Big(\text{x}\div\text{y}=\text{x}\times\frac{1}{\text{y}}\Big)\) \(=3\) Hence, the correct answer is option (b).
RATIONAL NUMBERS
297820
Decimal representation of a rational number cannot be:
1 Terminating
2 Non-Terminating
3 Non-Terminating, Repeating
4 Non-Terminating, Non-Repeating
Explanation:
Non-Terminating, Non-Repeating
RATIONAL NUMBERS
297844
The standard form of \(\frac{-48}{60}\) is:
1 \(\frac{48}{60}\)
2 \(\frac{-601}{48}\)
3 \(\frac{-4}{5}\)
4 \(\frac{-4}{-5}\)
Explanation:
\(\frac{-4}{5}\) Given rational number is \(\frac{-48}{60}.\) For standrad/ simplest form, divide numerator and denomin by their HCF i.e. \(\frac{-48+12}{60+12}=\frac{-4}{5}\) Hence, the standard form of \(\frac{-48}{60}\) is \(\frac{-4}{5}.\)
297740
How many rational numbers are there between two rational numbers?
1 1
2 0
3 Unlimited.
4 100
Explanation:
Unlimited. (c) There are unlimited numbers between two rational numbers.
RATIONAL NUMBERS
297819
\(1\div\frac{1}{3}=\)
1 \(\frac{1}{3}\)
2 \(3\)
3 \(1\frac{1}{3}\)
4 \(3\frac{1}{3}\)
Explanation:
\(3\) \(1\div\frac{1}{3}\) \(=1\times3\) \(\Big(\text{x}\div\text{y}=\text{x}\times\frac{1}{\text{y}}\Big)\) \(=3\) Hence, the correct answer is option (b).
RATIONAL NUMBERS
297820
Decimal representation of a rational number cannot be:
1 Terminating
2 Non-Terminating
3 Non-Terminating, Repeating
4 Non-Terminating, Non-Repeating
Explanation:
Non-Terminating, Non-Repeating
RATIONAL NUMBERS
297844
The standard form of \(\frac{-48}{60}\) is:
1 \(\frac{48}{60}\)
2 \(\frac{-601}{48}\)
3 \(\frac{-4}{5}\)
4 \(\frac{-4}{-5}\)
Explanation:
\(\frac{-4}{5}\) Given rational number is \(\frac{-48}{60}.\) For standrad/ simplest form, divide numerator and denomin by their HCF i.e. \(\frac{-48+12}{60+12}=\frac{-4}{5}\) Hence, the standard form of \(\frac{-48}{60}\) is \(\frac{-4}{5}.\)
297740
How many rational numbers are there between two rational numbers?
1 1
2 0
3 Unlimited.
4 100
Explanation:
Unlimited. (c) There are unlimited numbers between two rational numbers.
RATIONAL NUMBERS
297819
\(1\div\frac{1}{3}=\)
1 \(\frac{1}{3}\)
2 \(3\)
3 \(1\frac{1}{3}\)
4 \(3\frac{1}{3}\)
Explanation:
\(3\) \(1\div\frac{1}{3}\) \(=1\times3\) \(\Big(\text{x}\div\text{y}=\text{x}\times\frac{1}{\text{y}}\Big)\) \(=3\) Hence, the correct answer is option (b).
RATIONAL NUMBERS
297820
Decimal representation of a rational number cannot be:
1 Terminating
2 Non-Terminating
3 Non-Terminating, Repeating
4 Non-Terminating, Non-Repeating
Explanation:
Non-Terminating, Non-Repeating
RATIONAL NUMBERS
297844
The standard form of \(\frac{-48}{60}\) is:
1 \(\frac{48}{60}\)
2 \(\frac{-601}{48}\)
3 \(\frac{-4}{5}\)
4 \(\frac{-4}{-5}\)
Explanation:
\(\frac{-4}{5}\) Given rational number is \(\frac{-48}{60}.\) For standrad/ simplest form, divide numerator and denomin by their HCF i.e. \(\frac{-48+12}{60+12}=\frac{-4}{5}\) Hence, the standard form of \(\frac{-48}{60}\) is \(\frac{-4}{5}.\)
297740
How many rational numbers are there between two rational numbers?
1 1
2 0
3 Unlimited.
4 100
Explanation:
Unlimited. (c) There are unlimited numbers between two rational numbers.
RATIONAL NUMBERS
297819
\(1\div\frac{1}{3}=\)
1 \(\frac{1}{3}\)
2 \(3\)
3 \(1\frac{1}{3}\)
4 \(3\frac{1}{3}\)
Explanation:
\(3\) \(1\div\frac{1}{3}\) \(=1\times3\) \(\Big(\text{x}\div\text{y}=\text{x}\times\frac{1}{\text{y}}\Big)\) \(=3\) Hence, the correct answer is option (b).
RATIONAL NUMBERS
297820
Decimal representation of a rational number cannot be:
1 Terminating
2 Non-Terminating
3 Non-Terminating, Repeating
4 Non-Terminating, Non-Repeating
Explanation:
Non-Terminating, Non-Repeating
RATIONAL NUMBERS
297844
The standard form of \(\frac{-48}{60}\) is:
1 \(\frac{48}{60}\)
2 \(\frac{-601}{48}\)
3 \(\frac{-4}{5}\)
4 \(\frac{-4}{-5}\)
Explanation:
\(\frac{-4}{5}\) Given rational number is \(\frac{-48}{60}.\) For standrad/ simplest form, divide numerator and denomin by their HCF i.e. \(\frac{-48+12}{60+12}=\frac{-4}{5}\) Hence, the standard form of \(\frac{-48}{60}\) is \(\frac{-4}{5}.\)
