Rational Numbers

(i)
Using Commutative property we write,

Now taking common we get,

Taking LCM, we have





= 2

(ii)
Using commutative property we get,

Take common to get,

(i) The additive inverse of “a” is given as “-a”

Therefore,

(ii) The additive inverse of “a” is given as “-a”

Therefore,

(iii) The additive inverse of “a” is given as “-a”

Therefore,

(iv) The additive inverse of “a” is given as “-a”

Therefore,

(v) The additive inverse of “a” is given as “-a”

Therefore,

(i) The multiplicative inverse of “a” is given as “”

Therefore,

(ii) The multiplicative inverse of “a” is given as “”

Therefore,

(iii) The multiplicative inverse of “a” is given as “”

Therefore,

(iv) The multiplicative inverse of “a” is given as “”

Therefore,

(v) The multiplicative inverse of “a” is given as “”

Therefore,

(vi) The multiplicative inverse of “a” is given as “”

Therefore,

Multiplicative inverse of -1 is

(i) Multiplicative identity is applied in
As, 1 × m = m × 1, where m is any rational number.

(ii) Commutative property is applied in

(iii) Multiplicative inverse property is applied here in
Multiplication of any rational number to its inverse gives identity of multiplication that is 1

The reciprocal of

Now,

Associative Property: a x (b x c) = (a x b) x c
According to this property, the way we group during multiplication does not matter. As shown above multiplying the L.H.S is same as the multiplication of R.H.S
The associative property allows us to write as

0.3 can be written as,







Yes

(i) Zero is one such number that does not have a reciprocal.

(ii) 1 and -1 are the rational numbers that are equal to their reciprocals.

(iii) Zero is the only rational number that is equal to its negative.

(i) Zero has No reciprocal

(ii) The numbers 1 and -1 are their own reciprocals.

(iii) The reciprocal of – 5 is

(iv) Reciprocal of where is x.

(v) The product of two rational numbers is always a rational number.

(vi) The reciprocal of a positive rational number is a positive rational number.

(i) is equivalent to 1.75

So, we will plot this on number line with making divisions of 4 between any two numbers as shown in the figure below
Therefore,

(ii) is equivalent to -0.83
-5/6 = -1 + 1/6 = - 0.833

In a rational number, the number below the bar i.e. the denominator tells the number of equal parts into which the first unit has been divided. The numerator tells ‘how many’ of these parts are considered.

We will divide the distance between -1 and 0 in 11 equal parts.

Here, means 2, 5 and 9 markings of each on the left of zero and starting from 0 respectively.

Let us multiply and divide 2 by any number greater than 1, let it be 2 for instance.
Then,

We have to find rational numbers less than 2.
Now, we can write rational numbers less that
Therefore, the rational numbers less than 2 are
Now it need not be that the number you multiply or divide by has to be 2, Let the number be 3 for instance.
then,

Now, the rational number less than 2, will be less than
Therefore, the rational numbers less than 2 are
Try yourself forming other rational numbers less than 2.

(i) can be written as

Five rational numbers between are

(ii) can be written as

Five rational numbers between are

(iii) can be written as

Five rational numbers between are

Any number which lies after -2 are greater than -2. Example,

Then, rational numbers are,

Or we can see that, 1, 2, 3, 4, 5, ... are all greater than -2 and are rational number.

For finding rational numbers between two rational numbers 3/5 and 5/4.
Take L.C.M of the denominators of the numbers.
We have 4 and 5 as the denominators. L.C.M of 4 and 5 = 20
Now we have to make the denominators of each rational numbers 20 by multiplying and dividing.


But this way we will have only three rational numbers in between, so multiply numerator and denominator by any number greater than 1, Let us multiply by 4
we get

Now keeps on increasing the numerator by one and start getting the Numbers between the Rational numbers
We will have