3.41 Repeating As A Fraction
3.41 Repeating As A Fraction. Now subtract equation 1 from equation 2 to cancel the repeating block (or repetend) out. Let's create an equation such that x equals the decimal number.
Its lowest terms, find gcd (greatest common divisor) for 338 & 99, which is 1. Write down the number as a fraction of one: Let's create an equation such that x equals the decimal number.
Notice That There Are 2 Digitss In The Repeating Block (41), So Multiply Both Sides By 1 Followed By 2 Zeros, I.e., By 100.
Then, divide that value by 1. This is the shorthand version of the decimal number 3.414141. To turn a finite decimal number into a repeating decimal number, simply place a horizontal bar over the decimal digits you wish to have repeated.
3.2¯¯¯ ¯48 = 3216 10(100 −1) = 3216 990 = 2 ⋅ 1608 2 ⋅ 495 = 1608 495.
What is 41.66666667 as a fraction? For calculation, here's how to convert 3.41 as a fraction using the formula above, step by step instructions are given below. 2.5 + 0.0 ( 34) = 2.5 + 0.034 ⋅ 10 0 + 0.034 ⋅ 10 − 2 + 0.034 ⋅ 10 − 4.
The Multiplier We Need Is 10(100 − 1):
Let's create an equation such that x equals the decimal number. Write down the number as a fraction of one: 3.41 * 100 1 * 100.
Next, Add The Whole Number To The Left Of The Decimal.
F = 10 if one repeating number, 100 if two repeating numbers, 1000 if three repeating numbers, etc. Asked may 23, 2019 in fraction problems by kmoney | 335 views. Let's multiply x by 1000.
Let’s Understand The Solution In Detail.
2.5 + 34 1000 1 − 10 − 2 = 25 10 + 34 990. 0.3 repeating as a fraction is equal to 1/3. 41.66 (repeating) as a fraction is 125/3 in improper fraction form.
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