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What is 5.92111 repeating decimal using bar notation?
_ 5.921
What is 2.161616 repeating decimal using bar notation?
2.16 with a bar on top of the 16
What is 0.424242 repeating decimal using bar notation?
In bar notation, it is .42. The bar rests atop the 42.
What is 0.4444 repeating decimal using bar notation?
you just take the first 3 fours and put a line on top of it
Repeating decimals can be expressed exactly using?
Repeating Decimal can be expressed exactly using what
What is 5.92111 repeating decimal using bar notation?
_ 5.921
What is 0.735353535 repeating decimal using notation bar?
Sorry, but it is not possible to use a notation bar with this browser.
What is 2.161616 repeating decimal using bar notation?
2.16 with a bar on top of the 16
What is 3.5888 repeating decimal using bar notation?
3.58 with the bar only over the 8
What is 5.126126126 repeating decimal using bar notation?
5.126 with a bar over the 126
What is 0.424242 repeating decimal using bar notation?
In bar notation, it is .42. The bar rests atop the 42.
Using bar notation how do you convert a fraction and decimal?
To convert a fraction to a decimal using bar notation, divide the numerator by the denominator. If the division results in a repeating decimal, you represent the repeating part with a bar over the digits that repeat. For example, the fraction ( \frac{1}{3} ) converts to the decimal 0.333..., which can be expressed as ( 0.\overline{3} ) to indicate that the digit '3' repeats indefinitely.
What is 0.4444 repeating decimal using bar notation?
you just take the first 3 fours and put a line on top of it
What is a non example of bar notation?
A non-example of bar notation is writing a repeating decimal without using a bar, such as 0.3333... or 0.142857142857..., where the repeating part is not clearly indicated. In contrast, using bar notation, these would be represented as (0.\overline{3}) or (0.\overline{142857}), respectively. This lack of clarity in indicating the repeating sequence makes it a non-example of bar notation.
What is 796179617961 repeating decimal using bar notation?
It would be 0.7961 with a bar over the 7961. Using dot notation it would be 0.7961 with a dot over the 7 and another dot over the 1.
Repeating decimals can be expressed exactly using?
Repeating Decimal can be expressed exactly using what
How do you rewrite 2.7666 using bar notation?
To rewrite the number 2.7666 using bar notation, you identify the repeating part of the decimal. In this case, the digit "6" is the only digit that repeats. Therefore, you can express the number as (2.7\overline{66}), indicating that the "66" repeats indefinitely.
