Mathematics
Grade-3-
Easy
Question
The shaded part in the given picture is _______________.
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)
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![2 over 8](data:image/png;base64,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)
![3 over 8](data:image/png;base64,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)
The correct answer is: ![3 over 8](data:image/png;base64,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)
to find - the shaded part fraction in the given picture.
In the given picture, the total parts are 8, out of which 3 parts are shaded.
fraction of shaded parts = number of parts shaded / total number of parts.
So, the shaded part of the fraction is
.
Therefore, the shaded part in the given picture is .