[list][*]Apuesta a [b]PAR/IMPAR[/b] : [/*][/list]Apostando [math]\$100[/math] (Una ficha).[br][br][img]data:image/png;base64,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[/img][br]Probabilidad de ganar: [math]\frac{18}{37}[/math][br]Probabilidad de perder: [math]\frac{19}{37}[/math][br][b]E(x)=[/b] [math]200\times\frac{18}{37}+\left(-100\right)\times\frac{19}{37}[/math][br][b]E(x)=[/b] [math]45,94[/math][br][list][*]Apuesta a [b]Negro/Rojo :[br][/b][/*][/list]Apostando [math]\$100[/math] (Una ficha).[br][img]data:image/png;base64,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[/img][br]Probabilidad de ganar: [math]\frac{18}{37}[/math][br]Probabilidad de perder: [math]\frac{19}{37}[/math][br][b]E(x)= [math]200\times\frac{18}{37}+\left(-100\right)\times\frac{19}{37}[/math][br]E(x)=[math]45,94[/math][/b][br][list][*]Apuesta a un Número[/*][/list]Apostando [math]\$100[/math] (una ficha)[br][img]data:image/png;base64,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[/img][br]Probabilidad de ganar: [math]\frac{1}{37}[/math][br]Probabilidad de perder:[math]\frac{36}{37}[/math][br][b]E(x)= [math]500\times\frac{1}{37}+\left(-100\right)\times\frac{36}{37}[/math][/b][br][b]E(x)= [math]-83,78[/math][/b][br][br]