Análise Combinatória
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Análise Combinatória
A figura ilustra um trenzinho infantil formado por uma
locomotiva – guiada por um adulto – e dez vagões idênticos
enfileirados, nos quais as crianças viajam sentadas, uma
em cada vagão.
![Análise Combinatória 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)
Quatro pares de irmãos, formados por um menino e
uma menina cada, irão ocupar oito vagões do trenzinho
para dar início a um passeio.
De quantas maneiras distintas as crianças podem ocupar
o brinquedo, de modo que cada irmão sente-se próximo à
sua irmã, em vagões consecutivos?
A 360
B 720
C 2 880
D 5 760
E 11 520
locomotiva – guiada por um adulto – e dez vagões idênticos
enfileirados, nos quais as crianças viajam sentadas, uma
em cada vagão.
Quatro pares de irmãos, formados por um menino e
uma menina cada, irão ocupar oito vagões do trenzinho
para dar início a um passeio.
De quantas maneiras distintas as crianças podem ocupar
o brinquedo, de modo que cada irmão sente-se próximo à
sua irmã, em vagões consecutivos?
A 360
B 720
C 2 880
D 5 760
E 11 520
- Spoiler:
- D
estudosxlia- Jedi
- Mensagens : 360
Data de inscrição : 25/04/2022
Re: Análise Combinatória
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Licenciatura em Matemática (2022 - ????)
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