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).
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.
It Is Not Clear From The Question Whether The.
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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