Express the following numbers in the form $\dfrac{p}{q}$, where p and q are both integers and q ≠ 0.

$\begin{matrix} \text{(i)} & 0.\overline{3} \\[1.5em] \text{(ii)} & 5.\overline{2} \\[1.5em] \text{(iii)} & 0.404040… \\[1.5em] \text{(iv)} & 0.4\overline{7} \\[1.5em] \text{(v)} & 0.1\overline{34} \\[1.5em] \text{(vi)} & 0.\overline{001} \\[1.5em] \end{matrix}$

(i) Let x = $0.\overline{3}$ = 0.333333… $\qquad \text{….(i)}$

As there is one repeating digit after decimal point,

So multiplying both sides of (i) by 10

we get,

10x = 3.3333…$\qquad \text{….(ii)}$

Subtracting (i) from (ii), we get

9x = 3

x = $\dfrac{3}{9}$ = $\bold{\dfrac{1}{3}}$,

which is in the form of $\dfrac{p}{q}$, q ≠ 0.

(ii) Let x = $5.\overline{2}$ = 5.2222… $\qquad \text{….(i)}$

As there is one repeating digit after decimal point,

So multiplying both sides of (i) by 10

we get,

10x = 52.2222…$\qquad \text{….(ii)}$

Subtracting (i) from (ii), we get

9x = 47

x = $\bold{\dfrac{47}{9}}$,

Which is in the form of $\dfrac{p}{q}$, q ≠ 0.

(iii) Let x = $0.\overline{40}$ = 0.4040… $\qquad \text{….(i)}$

As there are two repeating digit after decimal point,

So multiplying both sides of (i) by 100

we get,

100x = 40.4040…$\qquad \text{….(ii)}$

Subtracting (i) from (ii), we get

99x = 40

x = $\bold{\dfrac{40}{99}}$,

Which is in the form of $\dfrac{p}{q}$, q ≠ 0

(iv) Let x = $0.4\overline{7}$ = 0.477777… $\qquad \text{….(i)}$

As there is one repeating digit after decimal point ,

So multiplying both sides of (i) by 10

we get,

10x=4.7777…$\qquad \text{….(ii)}$

Multiply by 100 on both sides

100x=47.77777…..$\qquad \text{….(iii)}$

subtracting (ii) from (iii), we get

100x-10x=47.7777.. -4.777…

90x= 43

x = $\bold{\dfrac{43}{90}}$

Which is in the form of $\dfrac{p}{q}$, q ≠ 0

(v) Let x = $0.1\overline{34}$ = 0.13434 … $\qquad \text{….(i)}$

So multiplying both sides of (i) by 10

we get,

10x=1.343434…$\qquad \text{….(ii)}$

Again multiply by 100 on both sides ,

1000x =134.3434…..$\qquad \text{….(iii)}$

Subtracting (ii) from (iii), we get

1000x - 10x = 134.3434… - 1.3434…

990x = 133

x = $\bold{\dfrac{133}{990}}$

which is in the form of $\dfrac{p}{q}$, q ≠ 0

(vi) Let x = $0.\overline{001}$ = 0.001001001… $\qquad \text{….(i)}$

So multiplying both sides of (i) by 1000,

we get,

1000x = 1.001001…$\qquad \text{….(ii)}$

Subtracting (i) from (ii), we get

1000x - x = 1.001001… - 0.001001…

999x = 1

x = $\bold{\dfrac{1}{999}}$

which is in the form of $\dfrac{p}{q}$, q ≠ 0.