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\frac{5!}{5-\left(3!\right)^{2}}\times \frac{9}{1024}=\frac{90}{1024}
Multiply 3! and 3! to get \left(3!\right)^{2}.
\frac{120}{5-\left(3!\right)^{2}}\times \frac{9}{1024}=\frac{90}{1024}
The factorial of 5 is 120.
\frac{120}{5-6^{2}}\times \frac{9}{1024}=\frac{90}{1024}
The factorial of 3 is 6.
\frac{120}{5-36}\times \frac{9}{1024}=\frac{90}{1024}
Calculate 6 to the power of 2 and get 36.
\frac{120}{-31}\times \frac{9}{1024}=\frac{90}{1024}
Subtract 36 from 5 to get -31.
-\frac{120}{31}\times \frac{9}{1024}=\frac{90}{1024}
Fraction \frac{120}{-31} can be rewritten as -\frac{120}{31} by extracting the negative sign.
\frac{-120\times 9}{31\times 1024}=\frac{90}{1024}
Multiply -\frac{120}{31} times \frac{9}{1024} by multiplying numerator times numerator and denominator times denominator.
\frac{-1080}{31744}=\frac{90}{1024}
Do the multiplications in the fraction \frac{-120\times 9}{31\times 1024}.
-\frac{135}{3968}=\frac{90}{1024}
Reduce the fraction \frac{-1080}{31744} to lowest terms by extracting and canceling out 8.
-\frac{135}{3968}=\frac{45}{512}
Reduce the fraction \frac{90}{1024} to lowest terms by extracting and canceling out 2.
-\frac{540}{15872}=\frac{1395}{15872}
Least common multiple of 3968 and 512 is 15872. Convert -\frac{135}{3968} and \frac{45}{512} to fractions with denominator 15872.
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Compare -\frac{540}{15872} and \frac{1395}{15872}.

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