Question

Express in the form of p/ Q 0.32 bar

Answer 1

Solution:

Given non terminating repeating decimal 0.323232...

Let x = 0.323232....----(1)

Multiply equation (1) by 100,

we get

=> 100x = 32.323232...---(2)

Subtract equation (1) from equation (2) , we get

=> 99x = 32

=> x = 32/99 [ p/q form ]

Therefore,

x = 0.323232.....

= 32/99 [ p/q from ]

•••••

Answer 2

Answer:

32 / 99

Step-by-step explanation:

x = 0.32 ( bar on 32)

The last two digits are recurring.

100x = 100 * (0.32 ( bar on 32))

100x = 32.32 (bar on decimal part 32 not on the whole number part 32)

100x – x = 32.32 (bar on decimal part 32) – (0.32 ( bar on 32))

99x = 32

x = 32 / 99

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