297916
Which of the following pairs of rational numbers are on the opposite side of the zero on the number line?
1 \(\frac{3}{7}\text{ and }\frac{5}{12}\)
2 \(-\frac{3}{7}\text{ and }\frac{-5}{12}\)
3 \(\frac{3}{7}\text{ and }\frac{-5}{12}\)
4 None of these.
Explanation:
\(\frac{3}{7}\text{ and }\frac{-5}{12}\) The rational numbers \(\frac{3}{7}\text{ and }\frac{5}{12}\) are positive rational numbers. We know that every positive rational number is greater than 0, so both the rational numbers \(\frac{3}{7}\text{ and }\frac{5}{12}\) are represented by points on the right of the zero on the number line. The rational numbers \(-\frac{3}{7}\text{ and }\frac{-5}{12}\) are negative rational numbers. We know that every negative rational number is less than 0, so both the rational numbers \(\frac{3}{7}\text{ and }\frac{5}{12}\) are represented by points on the left of the zero on the number line. The rational numbers \(\frac{3}{7}\) is a positive rational number whereas the rational number \(\frac{-5}{12}\) is a negative rational numbers. We know that every negative rational number is less than 0 and every positive rational number is greater than 0, so the rational number \(\frac{3}{7}\) is represented by point on the right of the zero and \(\frac{-5}{12}\) is represented by point on the left of the zero on the number line. Thus, the rational numbers \(-\frac{3}{7}\text{ and }\frac{-5}{12}\) are on the opposite side of the zero on the number line. Hence, the correct answer is option (c).
RATIONAL NUMBERS
297905
A fraction is a rational number, and a rational number:
1 is also a fraction.
2 can never be a fraction.
3 may or may not be a fraction.
4 can always be reduced to a f raction.
Explanation:
may or may not be a fraction. (b) may or may not be a fraction.
RATIONAL NUMBERS
297737
What per cent is the least rational number of the greatest rational number if \(\frac{1}{2},\frac{2}{5},\frac{1}{3}\) and \(\frac{5}{9}\) are arranged in ascending order?
1 60%
2 10%
3 20%
4 30%
Explanation:
60%
RATIONAL NUMBERS
297739
The sum of \(\frac{5}{4}+\frac{(-25)}{4}=............\)
297916
Which of the following pairs of rational numbers are on the opposite side of the zero on the number line?
1 \(\frac{3}{7}\text{ and }\frac{5}{12}\)
2 \(-\frac{3}{7}\text{ and }\frac{-5}{12}\)
3 \(\frac{3}{7}\text{ and }\frac{-5}{12}\)
4 None of these.
Explanation:
\(\frac{3}{7}\text{ and }\frac{-5}{12}\) The rational numbers \(\frac{3}{7}\text{ and }\frac{5}{12}\) are positive rational numbers. We know that every positive rational number is greater than 0, so both the rational numbers \(\frac{3}{7}\text{ and }\frac{5}{12}\) are represented by points on the right of the zero on the number line. The rational numbers \(-\frac{3}{7}\text{ and }\frac{-5}{12}\) are negative rational numbers. We know that every negative rational number is less than 0, so both the rational numbers \(\frac{3}{7}\text{ and }\frac{5}{12}\) are represented by points on the left of the zero on the number line. The rational numbers \(\frac{3}{7}\) is a positive rational number whereas the rational number \(\frac{-5}{12}\) is a negative rational numbers. We know that every negative rational number is less than 0 and every positive rational number is greater than 0, so the rational number \(\frac{3}{7}\) is represented by point on the right of the zero and \(\frac{-5}{12}\) is represented by point on the left of the zero on the number line. Thus, the rational numbers \(-\frac{3}{7}\text{ and }\frac{-5}{12}\) are on the opposite side of the zero on the number line. Hence, the correct answer is option (c).
RATIONAL NUMBERS
297905
A fraction is a rational number, and a rational number:
1 is also a fraction.
2 can never be a fraction.
3 may or may not be a fraction.
4 can always be reduced to a f raction.
Explanation:
may or may not be a fraction. (b) may or may not be a fraction.
RATIONAL NUMBERS
297737
What per cent is the least rational number of the greatest rational number if \(\frac{1}{2},\frac{2}{5},\frac{1}{3}\) and \(\frac{5}{9}\) are arranged in ascending order?
1 60%
2 10%
3 20%
4 30%
Explanation:
60%
RATIONAL NUMBERS
297739
The sum of \(\frac{5}{4}+\frac{(-25)}{4}=............\)
297916
Which of the following pairs of rational numbers are on the opposite side of the zero on the number line?
1 \(\frac{3}{7}\text{ and }\frac{5}{12}\)
2 \(-\frac{3}{7}\text{ and }\frac{-5}{12}\)
3 \(\frac{3}{7}\text{ and }\frac{-5}{12}\)
4 None of these.
Explanation:
\(\frac{3}{7}\text{ and }\frac{-5}{12}\) The rational numbers \(\frac{3}{7}\text{ and }\frac{5}{12}\) are positive rational numbers. We know that every positive rational number is greater than 0, so both the rational numbers \(\frac{3}{7}\text{ and }\frac{5}{12}\) are represented by points on the right of the zero on the number line. The rational numbers \(-\frac{3}{7}\text{ and }\frac{-5}{12}\) are negative rational numbers. We know that every negative rational number is less than 0, so both the rational numbers \(\frac{3}{7}\text{ and }\frac{5}{12}\) are represented by points on the left of the zero on the number line. The rational numbers \(\frac{3}{7}\) is a positive rational number whereas the rational number \(\frac{-5}{12}\) is a negative rational numbers. We know that every negative rational number is less than 0 and every positive rational number is greater than 0, so the rational number \(\frac{3}{7}\) is represented by point on the right of the zero and \(\frac{-5}{12}\) is represented by point on the left of the zero on the number line. Thus, the rational numbers \(-\frac{3}{7}\text{ and }\frac{-5}{12}\) are on the opposite side of the zero on the number line. Hence, the correct answer is option (c).
RATIONAL NUMBERS
297905
A fraction is a rational number, and a rational number:
1 is also a fraction.
2 can never be a fraction.
3 may or may not be a fraction.
4 can always be reduced to a f raction.
Explanation:
may or may not be a fraction. (b) may or may not be a fraction.
RATIONAL NUMBERS
297737
What per cent is the least rational number of the greatest rational number if \(\frac{1}{2},\frac{2}{5},\frac{1}{3}\) and \(\frac{5}{9}\) are arranged in ascending order?
1 60%
2 10%
3 20%
4 30%
Explanation:
60%
RATIONAL NUMBERS
297739
The sum of \(\frac{5}{4}+\frac{(-25)}{4}=............\)
297916
Which of the following pairs of rational numbers are on the opposite side of the zero on the number line?
1 \(\frac{3}{7}\text{ and }\frac{5}{12}\)
2 \(-\frac{3}{7}\text{ and }\frac{-5}{12}\)
3 \(\frac{3}{7}\text{ and }\frac{-5}{12}\)
4 None of these.
Explanation:
\(\frac{3}{7}\text{ and }\frac{-5}{12}\) The rational numbers \(\frac{3}{7}\text{ and }\frac{5}{12}\) are positive rational numbers. We know that every positive rational number is greater than 0, so both the rational numbers \(\frac{3}{7}\text{ and }\frac{5}{12}\) are represented by points on the right of the zero on the number line. The rational numbers \(-\frac{3}{7}\text{ and }\frac{-5}{12}\) are negative rational numbers. We know that every negative rational number is less than 0, so both the rational numbers \(\frac{3}{7}\text{ and }\frac{5}{12}\) are represented by points on the left of the zero on the number line. The rational numbers \(\frac{3}{7}\) is a positive rational number whereas the rational number \(\frac{-5}{12}\) is a negative rational numbers. We know that every negative rational number is less than 0 and every positive rational number is greater than 0, so the rational number \(\frac{3}{7}\) is represented by point on the right of the zero and \(\frac{-5}{12}\) is represented by point on the left of the zero on the number line. Thus, the rational numbers \(-\frac{3}{7}\text{ and }\frac{-5}{12}\) are on the opposite side of the zero on the number line. Hence, the correct answer is option (c).
RATIONAL NUMBERS
297905
A fraction is a rational number, and a rational number:
1 is also a fraction.
2 can never be a fraction.
3 may or may not be a fraction.
4 can always be reduced to a f raction.
Explanation:
may or may not be a fraction. (b) may or may not be a fraction.
RATIONAL NUMBERS
297737
What per cent is the least rational number of the greatest rational number if \(\frac{1}{2},\frac{2}{5},\frac{1}{3}\) and \(\frac{5}{9}\) are arranged in ascending order?
1 60%
2 10%
3 20%
4 30%
Explanation:
60%
RATIONAL NUMBERS
297739
The sum of \(\frac{5}{4}+\frac{(-25)}{4}=............\)
