9.3 Repeating As A Fraction
9.3 Repeating As A Fraction. Then, divided that decimal value by 1, like this decimal / 1. Converting a repeating decimal into a fraction look at some patterns of repeating decimals:
10x − x = 33.¯3 −3.¯3. The greatest common factor (gcf) of the numerator (9) and the denominator (3) is 3. So the initial form of the fraction is 3.
Multiply Both Numerator And Denominator By 10 For Every Number After.
Write down the number as a fraction of one: 9.3 = 9310 = 9310 as a fraction. 9 / 3 = 9 ÷ 3 / 3 ÷ 3 = 3 / 1
Now Let's Learn How To Convert A Repeating Decimal To A Fraction.
9 ⋅ 3 3 + 2 3 9 ⋅ 3 3 + 2 3. 10x − x = 33.¯3 −3.¯3. Input the integer number in the given box (ex.
The Greatest Common Factor (Gcf) Of The Numerator (9) And The Denominator (3) Is 3.
Next, add the whole number to the left of the decimal. Since there is 1 1 number to the right of the decimal point, place the decimal number over 101 10 1 (10) ( 10). It is a fraction in decimal formrather than in the form of a ratio.
Hereof, What Is 3/4 As A Decimal?
To write 9 9 as a fraction with a common denominator, multiply by 3 3 3 3. 10x − 1x = (33+ 0.¯3) −(3 +0.¯3) Combine the numerators over the common denominator.
The First Repeating Decimal Above Is Equal To The Fraction 1/3.
Take the decimal value for calculation. 0.9 3 repeating as a fraction. Next, we can multiply each side by 10 giving:
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