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.
a straight line kind of like sasquatch EXAMPLE: 531.313131= 531.31 with bar raised over the .31
It is bar 0.58585 :)
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0.765 with a bar over the 765.
it is 3.5030303 with a - or a bar over it.
2.01 the bar notation is overthe .01
a straight line kind of like sasquatch EXAMPLE: 531.313131= 531.31 with bar raised over the .31
It is bar 0.58585 :)
Yes, in music notation, a bar is equivalent to a measure.
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In bar notation, it is .42. The bar rests atop the 42.
0.765 with a bar over the 765.
0.42
8778i
it is 3.5030303 with a - or a bar over it.
It would be 0.6734 with a bar over the 34.
The purpose of the repeat bar in music notation is to indicate that a section of music should be played again.