Question

convert the reccuring decimal to fraction -0.27 the 7 is recurring
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Answer 1

Answer:

Let x equal the repeating decimal you are trying to convert to a fraction. Examine the repeating decimal to find the repeating digit(s). Place the repeating digit(s) to the left of the decimal point. Place the repeating digit(s) to the right of the decimal point.

Answer 2

$\huge{\underline{\sf{\red{S}\pink{O}\green{L}\blue{U}\purple{T}\orange{I}\pink{O}\red{N ᭄}}}}$

• $\sf{One \: approach \: is \: algebraically.}$

$\implies\sf{x = 0.277777....}$

Because one digit recurs multiply by 10 na dthen follow the method below.

$\implies\sf{10x = 0.2777777....}$

$\implies\sf{x = 0.0277777....}$

• subtract, the term..Then,

$\implies\sf{9x = 0.25}$

$\implies\sf{x = \frac{0.25}{9} }$

$\implies\sf{x = \frac{5}{18}}$