How can we write #3.11....# (repeated) as fraction?

1 Answer
Shwetank Mauria
May 12, 2017

#3.1# repeated#=28/9=3 1/9#

Explanation:

#3.1# repeated can be written as #3.11111111111............#

and when a single digit, say #k# (where #k# is a natural number from #1# and #9#) is repeated after decimal point, the result is #k/9# plus the number before decimal.

Hence, #3.1# repeated is #3 1/9# i.e. #28/9#
There is another way too.

Let #x=3.1111111.......# and then

#10x=31.111111..........#

Subtracting former from latter we get

#9x=31-3=28#

i.e. #x=28/9=3 1/9#

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