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-1187840000000000000000000
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-1187840000000000000000000
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\frac{\left(125^{-2}\times 8^{-3}\right)^{-1}\times \left(64\times 25\right)^{2}}{\left(25^{3}\times 16\right)^{-2}\left(5^{-3}\times 3^{2}-1\right)^{-1}}
Divide \frac{\left(125^{-2}\times 8^{-3}\right)^{-1}}{\left(25^{3}\times 16\right)^{-2}} entre \frac{\left(5^{-3}\times 3^{2}-1\right)^{-1}}{\left(64\times 25\right)^{2}} mediante a multiplicación de \frac{\left(125^{-2}\times 8^{-3}\right)^{-1}}{\left(25^{3}\times 16\right)^{-2}} polo recíproco de \frac{\left(5^{-3}\times 3^{2}-1\right)^{-1}}{\left(64\times 25\right)^{2}}.
\frac{\left(\frac{1}{15625}\times 8^{-3}\right)^{-1}\times \left(64\times 25\right)^{2}}{\left(25^{3}\times 16\right)^{-2}\left(5^{-3}\times 3^{2}-1\right)^{-1}}
Calcula 125 á potencia de -2 e obtén \frac{1}{15625}.
\frac{\left(\frac{1}{15625}\times \frac{1}{512}\right)^{-1}\times \left(64\times 25\right)^{2}}{\left(25^{3}\times 16\right)^{-2}\left(5^{-3}\times 3^{2}-1\right)^{-1}}
Calcula 8 á potencia de -3 e obtén \frac{1}{512}.
\frac{\left(\frac{1}{8000000}\right)^{-1}\times \left(64\times 25\right)^{2}}{\left(25^{3}\times 16\right)^{-2}\left(5^{-3}\times 3^{2}-1\right)^{-1}}
Multiplica \frac{1}{15625} e \frac{1}{512} para obter \frac{1}{8000000}.
\frac{8000000\times \left(64\times 25\right)^{2}}{\left(25^{3}\times 16\right)^{-2}\left(5^{-3}\times 3^{2}-1\right)^{-1}}
Calcula \frac{1}{8000000} á potencia de -1 e obtén 8000000.
\frac{8000000\times 1600^{2}}{\left(25^{3}\times 16\right)^{-2}\left(5^{-3}\times 3^{2}-1\right)^{-1}}
Multiplica 64 e 25 para obter 1600.
\frac{8000000\times 2560000}{\left(25^{3}\times 16\right)^{-2}\left(5^{-3}\times 3^{2}-1\right)^{-1}}
Calcula 1600 á potencia de 2 e obtén 2560000.
\frac{20480000000000}{\left(25^{3}\times 16\right)^{-2}\left(5^{-3}\times 3^{2}-1\right)^{-1}}
Multiplica 8000000 e 2560000 para obter 20480000000000.
\frac{20480000000000}{\left(15625\times 16\right)^{-2}\left(5^{-3}\times 3^{2}-1\right)^{-1}}
Calcula 25 á potencia de 3 e obtén 15625.
\frac{20480000000000}{250000^{-2}\left(5^{-3}\times 3^{2}-1\right)^{-1}}
Multiplica 15625 e 16 para obter 250000.
\frac{20480000000000}{\frac{1}{62500000000}\left(5^{-3}\times 3^{2}-1\right)^{-1}}
Calcula 250000 á potencia de -2 e obtén \frac{1}{62500000000}.
\frac{20480000000000}{\frac{1}{62500000000}\left(\frac{1}{125}\times 3^{2}-1\right)^{-1}}
Calcula 5 á potencia de -3 e obtén \frac{1}{125}.
\frac{20480000000000}{\frac{1}{62500000000}\left(\frac{1}{125}\times 9-1\right)^{-1}}
Calcula 3 á potencia de 2 e obtén 9.
\frac{20480000000000}{\frac{1}{62500000000}\left(\frac{9}{125}-1\right)^{-1}}
Multiplica \frac{1}{125} e 9 para obter \frac{9}{125}.
\frac{20480000000000}{\frac{1}{62500000000}\left(-\frac{116}{125}\right)^{-1}}
Resta 1 de \frac{9}{125} para obter -\frac{116}{125}.
\frac{20480000000000}{\frac{1}{62500000000}\left(-\frac{125}{116}\right)}
Calcula -\frac{116}{125} á potencia de -1 e obtén -\frac{125}{116}.
\frac{20480000000000}{-\frac{1}{58000000000}}
Multiplica \frac{1}{62500000000} e -\frac{125}{116} para obter -\frac{1}{58000000000}.
20480000000000\left(-58000000000\right)
Divide 20480000000000 entre -\frac{1}{58000000000} mediante a multiplicación de 20480000000000 polo recíproco de -\frac{1}{58000000000}.
-1187840000000000000000000
Multiplica 20480000000000 e -58000000000 para obter -1187840000000000000000000.
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