[b][color=#ff0000]I. Estatísticas de uma variável[/color][br][br]Objetivos[/b]:[br][list][*][color=#0000ff]Classificar variáveis;[/color][/*][*][color=#0000ff]Utilizar gráficos e tabelas adequados para apresentar dados;[/color][/*][*][color=#0000ff]Calcular medidas de localização e de dispersão;[/color][/*][*][color=#0000ff]Utilizar e interpretar as medidas estatísticas;[/color][/*][/list][br]
A agência de viagens [b]Ir&Voltar[/b] foi inaugurada a 3 de Janeiro de 2015. [br]Desde essa data até ao dia 3 de Janeiro de 2018, houve um grupo de funcionários que se manteve na empresa.[br][br]Na tabela seguinte, estão representadas as idades desses funcionários no dia da inauguração da [b]Ir&Voltar[/b], em que b representa o número de funcionários com 31 anos.[br][br] [img]data:image/png;base64,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[/img][br] Adaptado do Exame de MACS | 2022 | 1ª fase[br]
Qual a variável em estudo? Como a classificas (qualitativa, quantitativa discreta ou quantitativa contínua)?
No dia 3 de Janeiro de 2018, a média das idades desses funcionários era de 31,5. Determine quantos desses funcionários tinham 31 anos quando a agência foi inaugurada?[br][br][br]
Com base na tabela apresentada (considerando b = 4 ), vamos [br]- elaborar uma tabela de frequências absolutas e relativas, simples e acumuladas;[br]- elaborar o gráfico de barras da distribuição;[br]- determinar as medidas de localização e dispersão.[br][br][b]Ajuda[/b]: seleciona as duas primeiras colunas da tabela e o ícon 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[/img]com o gráfico do painel superior e seleccionar, no gráfico, o íon com o somatório [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACkAAAAtCAYAAAAz8ULgAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAAYTSURBVFhH1Vn5T1NbEObPw+gPbLJpUBEjSwhBE1ZBjCwxMRggQNjVSGQPEHysAo+ylaXSjccOsnVnlU2W8X5jCy20tPhIi18yKbf39Jzvnpn5Zu7Bjf4C/J0kT05OXGrWYEFSo9aSdExBvSIxdXf1OdWwpkyqJK1Gb2RzBia5v39ASsUEjQyP0cz0HKlVWtJp9U41tUpDU1OzNDz0jcbHp+jg4CcTBJikQj5B3yQy0usM9PPn2U1nA2trtDoaHZXRuHLS+K1AUrWqZvZraxvGr1wPnbBZQ0MSwfU6vnYbEkvo+8KSzaB1BY6Pj2lmZp7zA7zc2lq7aWtry3j75kCvXyNRzwAdHR2R25cv7bS3t2e8dXOwsblFXZ29v0n+I5Dc3b2BJDccJInYODw8vNSQkZjoumGXJBbX6XQ0MTFBUqn0UhsbGyOlUkkqlepaw8YuycXFRaqpqaHU1FRKTEyk5ORkSkpKOv00Ga5fvHhBL1++pLKyMkGEx3n3rwN2SYpEInr+/Dl5eHiQr68vPX78mEJCQtiePHlyak+fPqVHjx7RnTt36OHDh9TU1MReuA7YJdnT00PPnj2ju3fvUlRUFJWXl1NXVxe1trZSW1vbqXV3d1N1dTUTxcNUVlY6jyTcXVxczIvD6urq6MePH8a7Z50SsLKyQrGxsfTgwQMOEaeRRFwhvnJycig4OJhCQ0OpoaGBtre3jSPOsL6+Tp8+faKsrCzq6+vjSa8DdkkC+/v7nL2ZmZkUGBjIbm9paWFS5oAEYTfn5+eF+r92beXVIZLAzs6O0JGM0uvXr8nPz48SEhKos7PzAtHzAFFMDrNF2jQGXrM2xmGSALRvYGCApQg7+urVK87+y+o94lcsFtPIyAhptdoLsoTdn5ubEzqdIaGRmGGvnceVSAJIht7eXpaloKAgSk9P5wUODg6MIywB90ND4+PjOUT0estuG4lZVFTEGltbW8thch5XJgmA6NevX1kbAwICKDc3l5aWlox3LQGSKSkp5O3tzUQRIggdAMlXUVFB9+7dY62tr6+nzc1NvmeOPyIJKBQKXtTf358yMjK4bFoDdlgul3MM+/j4cEWC6xEijY2NLGvwSH5+Ps3Ozv7/mDRhYWGBJ4UkhYeHs5sui0sQhdjHxMQwIZTRDx8+8DWE/+3bt/zQtnT1SiQxaHl5md6/f887AHd//PiRSdsDYg3uRPVCiKB0wguIV8T07u6uceRFOEwSTwmCiCHUbyyCgEdG4seOAGPhAUiYu7s7k/38+bPVwmAOh0hCNtB+odKEhYWxi7Kzs2lyctLijRLxhB1BYljL9unpacrLy+Pf37p1i+7fv8+9ADLeloYCDpHEJM3NzewqLy8vevPmDSeKOUEAOookgfuQ7eYLYw40HREREbyD6KLgbsQlGpaNDdtvqHZJYmc6OjooOjqaZSQtLc1mr4jmGKUzLi6OuyRTImAsMhlJhlhGouA+Euj27dscl8PDw1aFHLBLUiaTccOLCoMOp7+/n4ljQnyaDIQgIXgYxBx2DZNiHMQfXsDOwQt4SIQD5kIfgIdHUUCG/5EEtbe3s4ugcZGRkRyLpaWlVFhYaGH47t27d/ww6D2rqqqYIDIfO+vp6cmiPjg4eLrDCA+EEVQC8Yl5kJznYZckuh+4B24CAegc+kV8mv6GIdtxjcUQZ9BFkMTuml4x8N15PdVoNNwsow8oKCjg5DoPuyQxKRoEiC/KH7LT3CAp5lZSUsKlb3V1lWMRZQ7dvUQiIYPBcMGduEbpxA7jRc5aV2WXJABJUavVPJm5gYjJTNcYhwfDhACIohNCDNqSGYxBXMP91hLSIZKuhgXJv+KYpbW1i7a3Li9RroBBv0Y9/xoPrMSDo7T4fdlm7LgCx8cngkIs0Ng3OfNyW11RCcqPDLvYeLoKBsMaH+yq1Vq+5uNomfQ/gbVCaK3WbfZ3zgDWxrmkRCLnI3KTd5nk3t4+yWXjfLA/NzvPx8E4nnam6XR6oa2b5x1UKCaEonDWUVn8i0S1quE4EPUMcmY507Amjp816t/n5OawIAlAWJFRh4fONaxpTdSBCyRvHoh+AcW1qKut4ub7AAAAAElFTkSuQmCC[/img][br]
Imagina que estás a descrever esta distribuição. Se não puderes apresentar a tabela nem qualquer gráfico, que medida de localização utilizarias? E referiras-te ao desvio padrão? Porquê?
No gráfico seguinte, está parcialmente apresentada, em percentagem, a taxa de utilização da cantina[br]pelos alunos inscritos numa universidade, em cada um dos meses do ano de 2019, em que a e b representam a taxa correspondente ao mês 5 e ao mês 8, respectivamente.[br] [img]data:image/png;base64,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[/img][br][br][br] Adaptado do Exame de MACS | 2021 | 2ª Fase[br][br]
No mês 6, frequentaram a cantina 1016 alunos. [br]No mês 7, o número de alunos que frequentaram a cantina diminui, aproximadamente, x%, relativamente ao número de alunos qua frequentaram no mês anterior. [br]Qual o valor de x, arredondado às unidades?[br][br][br][br]
Admita que a mediana dos dados recolhidos, relativos à taxa de utilização da cantina ao longo dos meses do ano de 2019, é 14,9%. Determine o valor de a.[b][br][br][/b][br][br]
Imagina que nos enganamos ao contar o número de utilizadores da cantina no mês 8. [b][br][/b]Seleciona, na apliqueta, o ponto do mês 8 e altera-o. [br]Observa a(s) a(s) possível(eis) alteração(ões) da média e da mediana.[br][br]
Fazendo alterar o ponto relativo ao mês apliqueta do geogebra, o que concluís relativamente à alteração da média e da mediana?[br][br]
Deslizando as setas para obter o conjunto de dados, é possível observar a alteração das medidas de localização e dispersão, assim como o diagrama de extremos e quartis.[br]Desliza, de forma a obteres [br]a) uma média igual a 10[br]b) uma mediana igual a 10[br]c) um desvio igual a 0[br]d) um diagrama de extremos e quartis simétrico[br]e) um diagrama de extremos e quartis com maior área antes da mediana
Regista aqui os teus exemplos de distribuições com [br]a) uma média igual a 10[br]b) uma mediana igual a 10[br]c) um desvio igual a 0[br]d) um diagrama de extremos e quartis simétrico[br]e) um diagrama de extremos e quartis com maior área antes da mediana
[list][b][color=#ff0000]II. Estatística de duas variáveis[/color][br][br]Objetivos:[br][/b][*]Estudar a correlação entre duas variáveis[/*][*]Elaborar diagramas de dispersão[/*][*]Determinar o coeficiente de correlação entre duas variáveis e analisar o seu valor[/*][/list][list]Gráfico de correlação ou diagrama de dispersão é um gráfico em que a cada ponto correspondem duas coordenadas, que são os valores das duas variáveis em estudo. Este gráfico permite analisar de que forma se relacionam duas variáveis. Diz-se que existe correlação entre duas variáveis quando a variação de uma delas implica uma alteração na outra. A correlação diz-se linear se a nuvem de pontos se ajustar em torno de uma linha reta, que é a reta de regressão. A correlação linear pode ser:[*]Linear positiva [/*][*]Nula [/*][*]Linear negativa [/*]Chama-se centro de gravidade da nuvem de pontos ao ponto cujas coordenadas são as médias das distribuições da análise .O estudo da correlação entre duas variáveis e, em particular, da respetiva reta de regressão permite fazer previsões sobre uma das variáveis quando se conhecem os valores da outra. O coeficiente de correlação linear, ou coeficiente de Pearson, mede o grau de associação linear entre duas variáveis. Representa-se por r e varia entre –1 e 1.[/list]
[center][b][color=#0000ff]ESTAMOS A FICAR VELHOS (revista Educação e Matemática nº 53, 1999)[/color][/b][/center][br]Um dos problemas a que o EUROSTAT tem vindo a dedicar bastante atenção nos últimos anos é o da evolução da população. Na tabela seguinte apresentam-se os valores relativos aos nascimentos e mortes,[br]por cada 1000 habitantes, que ocorreram na Comunidade Europeia entre 1960 e 1990 (Fonte: Estatísticas Demográficas, EUROSTAT, 1992).[br][br] 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[/img]
A partir dos dados fornecidos, estuda a evolução da variável nascimentos, representando graficamente os dados respectivos. Discute as razões da variação que se verificou neste caso.
Faz agora um estudo semelhante para a variável mortes. Como se tem comportado esta variável? A que se poderá dever a sua variação ao longo dos anos?
Constrói a tabela que representa o crescimento natural da população na CE ao longo dos anos, obtendo os valores, para cada ano, através da diferença entre os nascimentos e as mortes.
Representa os dados numa nuvem de pontos. O que te sugere o gráfico? Consegues construir um modelo matemático que permita fazer previsões sobre a evolução populacional? Qual será, segundo o teu modelo, a previsão para 2050? Discute a sua validade.