Probabilidade e Estatística
Página 1 de 1
Probabilidade e Estatística
Gostaria de ajuda nesta questão não consegui resolver
Após pesquisa alunos encontram a altura em cm de 40 alunos
![Probabilidade e Estatística A0Y1TqrZk1EtAAAAAElFTkSuQmCC](data:image/png;base64,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)
1- Montar uma tabela usando a distribuição de frequência contínua para agrupamento dos dados
2 - frequência absoluta da terceira classe, frequência relativa da segunda classe e a interpretação da frequência absoluta acumulada da quarta classe
3- Calcular a média, mediana e moda
A minha dificuldade está em montar a tabela...podem me ajudar?
Após pesquisa alunos encontram a altura em cm de 40 alunos
1- Montar uma tabela usando a distribuição de frequência contínua para agrupamento dos dados
2 - frequência absoluta da terceira classe, frequência relativa da segunda classe e a interpretação da frequência absoluta acumulada da quarta classe
3- Calcular a média, mediana e moda
A minha dificuldade está em montar a tabela...podem me ajudar?
Joaocos- Iniciante
- Mensagens : 1
Data de inscrição : 21/04/2021
![-](https://2img.net/i/empty.gif)
» Probabilidade- Estatistica
» estatística e probabilidade
» Probabilidade e Estatística
» Probabilidade e estatística
» probabilidade e estatística
» estatística e probabilidade
» Probabilidade e Estatística
» Probabilidade e estatística
» probabilidade e estatística
Página 1 de 1
Permissões neste sub-fórum
Não podes responder a tópicos
|
|