297891
The multiplicative inverse of \(\frac{4}{-5}\) of:
1 \(-\frac{4}{5}\)
2 \(\frac{5}{4}\)
3 \(\frac{5}{-4}\)
4 \(\frac{-5}{-4}\)
Explanation:
\(\frac{5}{-4}\) We know that the multiplicative inverse of the rational number \(\frac{\text{a}}{\text{b}}\text{ is }\frac{\text{b}}{\text{a}}\) \(\therefore\) Multiplicative inverse of \(\frac{4}{-5}=\frac{-5}{4}=\frac{5}{-4}\) Hence, the correct answer is option (c).
RATIONAL NUMBERS
297892
Which is greater number in the following?
1 \(\frac{1}{-2}\)
2 \(0\)
3 \(\frac{1}{2}\)
4 \(-2\)
Explanation:
\(\frac{1}{2}\) (c) Obviously, \(\frac{1}{2}\) is greater, since this is ony number which is on the rightmost side of the number line among others.
RATIONAL NUMBERS
297893
If p: every fraction is a rational numberq: every rational number is a fractionthen which of the following is correct?
1 P is true and q is false.
2 P is false and q is true.
3 Both p and q are true.
4 Both p and q are false.
Explanation:
P is true and q is false.
RATIONAL NUMBERS
297895
Rational number \(\frac{-18}{5}\) lies between consecutive integers ........
1 -2 and -3
2 -3 and -4
3 -4 and -5
4 -5 and -6
Explanation:
-3 and -4 \(\frac{-18}{5}\) = -3.6 - 4 < -3.6 < -3 - 3.6 lies between -3 and -4.
RATIONAL NUMBERS
297896
If S > 0 and \(\sqrt { \frac { \text{r} }{\text{ s} } } =\text{s}\) what is r in terms of s?
1 \(\frac{1}{\text{s}}\)
2 \(\sqrt{\text{s}}\)
3 \(\text{s}\sqrt{\text{s}}\)
4 None of the above
Explanation:
None of the above Solution: given that \(\sqrt { \frac { \text{r} }{\text{ s} } } =\text{s}\) where S > 0 squaring both sides \(\Rightarrow \frac{\text{r}}{\text{s}} = \text{s}^{2}\) r = s\(^{1}\)× s r =s\(^{1}\)
297891
The multiplicative inverse of \(\frac{4}{-5}\) of:
1 \(-\frac{4}{5}\)
2 \(\frac{5}{4}\)
3 \(\frac{5}{-4}\)
4 \(\frac{-5}{-4}\)
Explanation:
\(\frac{5}{-4}\) We know that the multiplicative inverse of the rational number \(\frac{\text{a}}{\text{b}}\text{ is }\frac{\text{b}}{\text{a}}\) \(\therefore\) Multiplicative inverse of \(\frac{4}{-5}=\frac{-5}{4}=\frac{5}{-4}\) Hence, the correct answer is option (c).
RATIONAL NUMBERS
297892
Which is greater number in the following?
1 \(\frac{1}{-2}\)
2 \(0\)
3 \(\frac{1}{2}\)
4 \(-2\)
Explanation:
\(\frac{1}{2}\) (c) Obviously, \(\frac{1}{2}\) is greater, since this is ony number which is on the rightmost side of the number line among others.
RATIONAL NUMBERS
297893
If p: every fraction is a rational numberq: every rational number is a fractionthen which of the following is correct?
1 P is true and q is false.
2 P is false and q is true.
3 Both p and q are true.
4 Both p and q are false.
Explanation:
P is true and q is false.
RATIONAL NUMBERS
297895
Rational number \(\frac{-18}{5}\) lies between consecutive integers ........
1 -2 and -3
2 -3 and -4
3 -4 and -5
4 -5 and -6
Explanation:
-3 and -4 \(\frac{-18}{5}\) = -3.6 - 4 < -3.6 < -3 - 3.6 lies between -3 and -4.
RATIONAL NUMBERS
297896
If S > 0 and \(\sqrt { \frac { \text{r} }{\text{ s} } } =\text{s}\) what is r in terms of s?
1 \(\frac{1}{\text{s}}\)
2 \(\sqrt{\text{s}}\)
3 \(\text{s}\sqrt{\text{s}}\)
4 None of the above
Explanation:
None of the above Solution: given that \(\sqrt { \frac { \text{r} }{\text{ s} } } =\text{s}\) where S > 0 squaring both sides \(\Rightarrow \frac{\text{r}}{\text{s}} = \text{s}^{2}\) r = s\(^{1}\)× s r =s\(^{1}\)
297891
The multiplicative inverse of \(\frac{4}{-5}\) of:
1 \(-\frac{4}{5}\)
2 \(\frac{5}{4}\)
3 \(\frac{5}{-4}\)
4 \(\frac{-5}{-4}\)
Explanation:
\(\frac{5}{-4}\) We know that the multiplicative inverse of the rational number \(\frac{\text{a}}{\text{b}}\text{ is }\frac{\text{b}}{\text{a}}\) \(\therefore\) Multiplicative inverse of \(\frac{4}{-5}=\frac{-5}{4}=\frac{5}{-4}\) Hence, the correct answer is option (c).
RATIONAL NUMBERS
297892
Which is greater number in the following?
1 \(\frac{1}{-2}\)
2 \(0\)
3 \(\frac{1}{2}\)
4 \(-2\)
Explanation:
\(\frac{1}{2}\) (c) Obviously, \(\frac{1}{2}\) is greater, since this is ony number which is on the rightmost side of the number line among others.
RATIONAL NUMBERS
297893
If p: every fraction is a rational numberq: every rational number is a fractionthen which of the following is correct?
1 P is true and q is false.
2 P is false and q is true.
3 Both p and q are true.
4 Both p and q are false.
Explanation:
P is true and q is false.
RATIONAL NUMBERS
297895
Rational number \(\frac{-18}{5}\) lies between consecutive integers ........
1 -2 and -3
2 -3 and -4
3 -4 and -5
4 -5 and -6
Explanation:
-3 and -4 \(\frac{-18}{5}\) = -3.6 - 4 < -3.6 < -3 - 3.6 lies between -3 and -4.
RATIONAL NUMBERS
297896
If S > 0 and \(\sqrt { \frac { \text{r} }{\text{ s} } } =\text{s}\) what is r in terms of s?
1 \(\frac{1}{\text{s}}\)
2 \(\sqrt{\text{s}}\)
3 \(\text{s}\sqrt{\text{s}}\)
4 None of the above
Explanation:
None of the above Solution: given that \(\sqrt { \frac { \text{r} }{\text{ s} } } =\text{s}\) where S > 0 squaring both sides \(\Rightarrow \frac{\text{r}}{\text{s}} = \text{s}^{2}\) r = s\(^{1}\)× s r =s\(^{1}\)
NEET Test Series from KOTA - 10 Papers In MS WORD
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RATIONAL NUMBERS
297891
The multiplicative inverse of \(\frac{4}{-5}\) of:
1 \(-\frac{4}{5}\)
2 \(\frac{5}{4}\)
3 \(\frac{5}{-4}\)
4 \(\frac{-5}{-4}\)
Explanation:
\(\frac{5}{-4}\) We know that the multiplicative inverse of the rational number \(\frac{\text{a}}{\text{b}}\text{ is }\frac{\text{b}}{\text{a}}\) \(\therefore\) Multiplicative inverse of \(\frac{4}{-5}=\frac{-5}{4}=\frac{5}{-4}\) Hence, the correct answer is option (c).
RATIONAL NUMBERS
297892
Which is greater number in the following?
1 \(\frac{1}{-2}\)
2 \(0\)
3 \(\frac{1}{2}\)
4 \(-2\)
Explanation:
\(\frac{1}{2}\) (c) Obviously, \(\frac{1}{2}\) is greater, since this is ony number which is on the rightmost side of the number line among others.
RATIONAL NUMBERS
297893
If p: every fraction is a rational numberq: every rational number is a fractionthen which of the following is correct?
1 P is true and q is false.
2 P is false and q is true.
3 Both p and q are true.
4 Both p and q are false.
Explanation:
P is true and q is false.
RATIONAL NUMBERS
297895
Rational number \(\frac{-18}{5}\) lies between consecutive integers ........
1 -2 and -3
2 -3 and -4
3 -4 and -5
4 -5 and -6
Explanation:
-3 and -4 \(\frac{-18}{5}\) = -3.6 - 4 < -3.6 < -3 - 3.6 lies between -3 and -4.
RATIONAL NUMBERS
297896
If S > 0 and \(\sqrt { \frac { \text{r} }{\text{ s} } } =\text{s}\) what is r in terms of s?
1 \(\frac{1}{\text{s}}\)
2 \(\sqrt{\text{s}}\)
3 \(\text{s}\sqrt{\text{s}}\)
4 None of the above
Explanation:
None of the above Solution: given that \(\sqrt { \frac { \text{r} }{\text{ s} } } =\text{s}\) where S > 0 squaring both sides \(\Rightarrow \frac{\text{r}}{\text{s}} = \text{s}^{2}\) r = s\(^{1}\)× s r =s\(^{1}\)
297891
The multiplicative inverse of \(\frac{4}{-5}\) of:
1 \(-\frac{4}{5}\)
2 \(\frac{5}{4}\)
3 \(\frac{5}{-4}\)
4 \(\frac{-5}{-4}\)
Explanation:
\(\frac{5}{-4}\) We know that the multiplicative inverse of the rational number \(\frac{\text{a}}{\text{b}}\text{ is }\frac{\text{b}}{\text{a}}\) \(\therefore\) Multiplicative inverse of \(\frac{4}{-5}=\frac{-5}{4}=\frac{5}{-4}\) Hence, the correct answer is option (c).
RATIONAL NUMBERS
297892
Which is greater number in the following?
1 \(\frac{1}{-2}\)
2 \(0\)
3 \(\frac{1}{2}\)
4 \(-2\)
Explanation:
\(\frac{1}{2}\) (c) Obviously, \(\frac{1}{2}\) is greater, since this is ony number which is on the rightmost side of the number line among others.
RATIONAL NUMBERS
297893
If p: every fraction is a rational numberq: every rational number is a fractionthen which of the following is correct?
1 P is true and q is false.
2 P is false and q is true.
3 Both p and q are true.
4 Both p and q are false.
Explanation:
P is true and q is false.
RATIONAL NUMBERS
297895
Rational number \(\frac{-18}{5}\) lies between consecutive integers ........
1 -2 and -3
2 -3 and -4
3 -4 and -5
4 -5 and -6
Explanation:
-3 and -4 \(\frac{-18}{5}\) = -3.6 - 4 < -3.6 < -3 - 3.6 lies between -3 and -4.
RATIONAL NUMBERS
297896
If S > 0 and \(\sqrt { \frac { \text{r} }{\text{ s} } } =\text{s}\) what is r in terms of s?
1 \(\frac{1}{\text{s}}\)
2 \(\sqrt{\text{s}}\)
3 \(\text{s}\sqrt{\text{s}}\)
4 None of the above
Explanation:
None of the above Solution: given that \(\sqrt { \frac { \text{r} }{\text{ s} } } =\text{s}\) where S > 0 squaring both sides \(\Rightarrow \frac{\text{r}}{\text{s}} = \text{s}^{2}\) r = s\(^{1}\)× s r =s\(^{1}\)
