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प्रश्न
Compare the following number.
`(-7)/11, (-3)/4`
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उत्तर
Let us first compare `-7/11 and -3/4`.
Here, the denominators of the given numbers are not the same.
LCM of 11 and 4 = 44
\[-\frac7{11}=-\frac{7\times4}{11\times4}=-\frac{28}{44}\]
\[-\frac34=-\frac{3\times11}{4\times11}=-\frac{33}{44}\]
Since 28 < 33
∴ \[\frac{28}{44}<\frac{33}{44}\]
∴ \[-\frac{28}{44}>-\frac{33}{44}\]
∴ \[-\frac7{11}>-\frac34\]
संबंधित प्रश्न
Compare the following number.
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Compare the following number.
`-17/20, (-13)/20`
Compare the numbers `5/4 and 2/3`. Write using the proper symbol of <, =, >.
Compare the numbers `(-7)/3 and (-5)/2`.
`(-4)/5` lies to the left of `(-3)/4`
`(-19)/5` is greater than `15/(-4)`
Arrange the following rational numbers in ascending and descending order
`(-17)/10, (-7)/5, 0, (-2)/4, (-19)/20`
`-3/5` is ______ than 0.
Given that `p/q` and `r/s` are two rational numbers with different denominators and both of them are in standard form. To compare these rational numbers we say that:
`p/q = r/s`, if ______ = ______
Given that `p/q` and `r/s` are two rational numbers with different denominators and both of them are in standard form. To compare these rational numbers we say that:
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