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3.48 Repeating As A Simplified Fraction

3.48 Repeating As A Simplified Fraction. It's also known as the greatest common divisor and put simply, it's the highest number that divides exactly into two or more numbers. Since there are 2 2 numbers to the right of the decimal point, place the decimal number over 102 10 2 (100) ( 100).

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Divide both the numerator and the denominator by the gcf. Find the greatest common factor (gcf) of the numerator and denominator. → (2) subtract (1) from (2) thus eliminating the decimal.

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Multiply both top and bottom by 10 for every number after the decimal point: 3.24¯8 = 2924 100(10− 1) = 2924 900 = 4 ⋅ 731 4 ⋅ 225 = 731 225. Step 1 observe the input parameters and what to be found:

As We Have 2 Numbers After The Decimal Point, We Multiply Both Numerator And Denominator By 100.


Algebra linear equations conversion of decimals, fractions, and percent. 3.48 repeating as a fraction is: We multiply and divide the number by 100:

We Have To Create 2 Equations With The Repeating Decimal Placed After The Decimal Point.


Therefore, 3.48 repeating as a fraction is 115/33 and it is written as 3 16/33 in mixed number form. 48 repeating into a fraction, begin writing this simple equation: Convert the decimal number to a fraction by placing the decimal number over a power of ten.

Where, D = The Whole Decimal Number;


The greatest common factor (gcf) of the numerator (3) and the denominator (48) is 3. The simplest form of 3 / 48 is 1 / 16. Find the gcd (or hcf) of numerator and denominator gcd of 3 and 48 is 3;

10(100 − 1)3.2¯¯¯ ¯48 = 3248.¯¯¯ ¯48 − 32.¯¯¯ ¯48 = 3216.


1 2 4 5 10 20 25 50 100. The multiplier we need is 1000 −1: Find what is the lowest term of 3/48.

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