Converting with same denominators, we have
and
∴ Five rational numbers between
Converting with same denominators, we have
and
∴ Five rational numbers between
Complete the following table:
Numbers |
Commutative for |
|||
Addition |
Subtraction |
Multiplication |
Division |
|
Rational numbers |
Yes |
... |
||
Integers |
No |
|||
Whole numbers |
Yes |
|||
Natural numbers |
No |
Complete the following table:
Numbers |
Associative for |
|||
Addition |
Subtraction |
Multiplication |
Division |
|
Rational numbers |
No |
|||
Integers |
Yes |
|||
Whole numbers |
Yes |
|||
Natural numbers |
No |
If a property holds for rational numbers, will it also hold for integers? For whole Numbers? Which will? Which will not?
Mention the rational number that does not have reciprocal.
Mention the rational numbers that are equal to their reciprocals.
Mention the rational number that is equal to its negative.
Zero has ______ reciprocal.
The numbers ______ and ______ are their own reciprocals.
The reciprocal of –5 is ______.
The reciprocal of 1/x, where x # 0 is
Mock Test Series