Uma pessoa mediu dez vezes os seus batimentos cardíacos através do seu pulso e obteve os resultados apresentados em batimentos por minuto (bpm) no seguinte diagrama de pontos:[br][img]data:image/png;base64,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[/img][br][br]Sobre os dados obtidos por ela é correto afirmar que:

O gráfico de frequências acumuladas abaixo mostra a performance de um grupo de 80 estudantes em uma prova final de matemática. As notas são apenas números naturais de 0 a 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[/img][br]É correto afirmar que:

As notas dos 10 alunos de uma turma foram as seguintes:[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAYsAAAAqCAYAAABC13d0AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAEnQAABJ0Ad5mH3gAABKgSURBVHhe7Z0HsBTF08AXs+JTFDArKBhBMWHCiAlzxEAZMGCixKyIOZeopaWWiqEwlTmgiArGshQxgTkHQAFzABVMzDe/edPHvr2Nt/ce/Pn6VzX17uZmNvTOTvd09+5rZSyBoiiKoqQwj/+rKIqiKImoslAURVEyUWWhKIqiZKLKQlEURclElYWiKIqSiSoLRVEUJRNVFoqiKEomqiwURVGUTFRZKIqiKJmoslAURVEyUWWhKIqiZKLKQlEURclElYWiKIqSiSoLRVEUJRNVFoqiKEomqiwURVGUTGb7Pz8aM2ZM0NDQEHTp0sXXFOeXX34Jpk+fHiyyyCKuLLDAAsFvv/0WzJw50/1daaWVgnnmmf16ccaMGcFnn33mjqXM+c5NIJPJkydXrs/iiy8etGrVyn0Os/DCCwcLLrig/9YUhvCECROCxRZbLJhvvvnc37/++suNCQr9llxySd+65fhfGZfNAefIWOc8u3fvHntNlXS+/PLLyvho3bp1MP/887vPYajjtzjK9q8CZVGEjz76yOy///6mTZs2KBmz6KKLmr322st8+umnvkU248ePNxdffLFZddVV3TZuuukm/0ttHHfccW47SeWHH37wLeN5//33Te/evd250L5t27amT58+7lzrAdvZZ599jL0wpmPHjqZnz57GXkj/azL1kHWUr7/+2hx++OGmXbt2bpt2cnb7+Pzzz32LdOotqxEjRrjtZJVHH33U96jm+++/j+0jpX///r5lMexkb04++WSz4ooruu1YRWQ222wzM3LkSN8inbLjMomnnnrKbL311sYqQbedpZde2pxwwgnGTsy+RTqvvvqq6dWrl7EKzPVfYYUVzKmnnmqmTp3qW9QOMjvppJPcuGKMbbHFFqnXTigr6yTKyGrKlClOLlapV46J83nmmWd8i+bjjz/+cPvMKpxLHGX7x1FIWbz77rvGWm1m2WWXNffff79588033aRvrQazzDLLmF9//dW3rObbb781Z511lunWrZtrb62sygHfc889vlVtnHLKKU0EEC1pMHmGjyVcONfXX3/dt6yNu+66yw3U1VZbzbz88su+Npsysk5i0qRJZrnllnPnduWVV5q3337bHHbYYe47NzaySKM5ZPXCCy/Ebi9cUJYohCSmTZsW20/Keeed51vm5/fffzddu3Z1EwSyGjt2rLnzzjudcrTWmhk9erRvmUyZcZnE7bff7vpuuumm5rnnnjOvvPKKOfDAA13dTjvt5FslM2rUKGe02JWWeeSRR5zi2GijjVz/Hj16mH///de3LA4yQvE0NDSYO+64w/zzzz/+l3TqIes4ysrqqKOOcm2jhWN69tlnfavmI27f0ZKmuOLaR0sRxVdoxO62225uB9dee62vaeSAAw5w9Q888ICvqYYBwCBlcvrggw/MHnvsUTlgrMsyMBmsueaa5uqrrzY333yzGTp0qCvXXXedK2kwgXMM++67r7nvvvtce7EkKFgltYI82AbbS5vs4igj6yQOOeQQ1zd8o/z999/O2qKea5NGc8jqpZdecn333ntvZ+WEi9ysV111lW+dDO2waJGXXP9bbrnFjYk33njDt8oP+5TjCsMqmHpWDVmUGZdxcK2Y5Nk/xoTABL/88su7+rRxRruVV17Ztbv88st9baNhQh2FSb4WPvnkE7PEEkuYeeed103KRaiHrKOUlRWst956ZttttzUvvviiM6xOP/1014+Cp6C5QSmhyKP3BYVzY45Io2z/KIWUxVJLLeUEddlll/maRs4++2xX//DDD/uaav777z/zzTff+G+mibLAuiwDNyXbq4V7773XLXfDMDDk2HC31MLkyZOdhcU2WF0UpYys4+Amwfqn78CBA31tI3vuuaer53hnzpzpa6tpDlmxYurQoYP/1pRLL73UuSX+/PNPX5MM+x83bpz/Vp799tvPbXPHHXf0NY1gUVJ//PHH+5pkyozLOD788MOKrFkRhNl8881d/Y8//uhrqkFpSv+nn37a1zYirs5dd93V1+SHMdO9e3fX/4gjjvC1+amHrKOUlRVjDiMKd06Y9ddf3/XFddvccD999dVX/tssUMYogrASjKNs/yiFomsEosHexIGdOFwQy2rwYNiwYYG1WAJrsbrf47AHF1iN7r9lY5eNQbt27dx2rdXia/Nhz8t/ysYulQN74f23Rrp16+YCkmAHjPsLVuEF1vpxgUprZfjaeKy1FEybNs21tVaIr81PEVnnkdVPP/0UTJ061X3mPMJYi9D95XitQnef42gOWbHPzp07+2+zIOh9ySWXBIMGDXLB7SKkXf+840rkP3LkyODcc88N7KThvtsVnQuY20nRfS9C0nFNmjQp6Nq1q9unNQJ8bTVyTNC3b9/ATv7us50Q3Ge76gzatm3r6uIg4CkkjQE7ybq/MHjwYHeuPXv2dIkISYwYMaJyLH369HF/i1BE1i0lK7tCCkaPHl0Z2wL3IUHh/v37+5pskM/GG2/ski/ou9VWWwXPP/+8/zUZkjRIggjD/gcMGBD07t07WHvttX1tPGX7V4HGyItYtVJWX311F/Dp0qVLroBtmKyVxfbbb1/5PcuywILD4kXby9Kzffv2zsohVlIUfKiyb5aeAhpZ6il2Ava/VIPvljZYIsgGXylxC47z7rvv9q2SKSLrPLIKB4FpH2b33Xev/FbUOi8rK/zabCPKwQcf7OIrdsD7mnTYBwFSfN+4O3GHYO3iLguTd1yJVSsF/znJBazO8vp5845LqxQr+7E3sK+NR6xiKdtss43p1KmTcw1GreAo4halsE+BVb+sLAhMg51UmsSn0layBx10UKUdQWHGAeOUc0EGWdewiKxbSlZRGKOy0s17/dkH+2LfxGuffPLJyr2GZW8Vhm8ZT1xc8rbbbnP933vvPV+TTNn+UQopCy56XIYHN+dpp51WKDiWpSzCkyXujzTIWJC20cLgKJrlgduIvixDf/75Z19rXPaK3FT4ornJ4iCQLPtfZ511KplH4cI+0igi67yyCh/Hgw8+6OpYri+00EKV+o8//tjV56WsrOLAbUA/fP15CCusuHLDDTf4lsXG1ZAhQ0zr1q2bbIuyyy67pLowhLzjkslH6o8++mhXlwSuXGJD4W1RmGCzjBAy2aQ9SotrD8RRpJ7kCUEmW7uyM1988YWvrUayGsmu2mSTTSrbkpLHNZVX1i0lK2H69OkVlzCFBBMU4UMPPeRbJENsgD7MAQLuadkWWZFFIIOLY6nVtVm2fyFlgR8Pawyr+dBDD3WDSE6ccv755/uW2WQpCywb0t7GjBnja5IhsInfkxQ9BhNaXFLlKNdcc41vmQ2Do3Pnzu7c4gJ1EydOdAOFVL8k7DK3sm8yPGjP5HnRRRdV6tdYYw3fOp4iss4rK7vEb7INLDcsSUlX5EYgsygv9ZBVFM6FoByTVp5YBbBqIdBOoJSsF5SAXfZXzpPJQZRrkXFFgBUF269fv0oSgJQ8wfwi45IEkOHDh2caXBMmTHCrIzJ88PFzzWR7fM6yVrfccssm7fFrsxqTOlZjAmOBFUWaooDwJD9o0CC3anriiScqRgj7YZJMo4isW0pWgEJl5XTkkUe6sS79WRm89tprvlU1GEfcW7RldcE9IIVEAOqTYnVJYCTSj/OvhbL9CykLJngmv3feecd9Z1D07dvXHQCFi52XLGVRhDirlawO2X4eywaYSDgfJj8mnVoh1U/2vfPOO/vaRiRARklbCtdT1gI315lnnukmT7axwQYbuMw0sQzDFlAW9ZJVFEl3zLuqEKJjYMaMGU4hi7yy0oKjsH/6yaqE7Q0ePNit7GSbWOpp1GtcCrgVUIqrrLJKRamTYBC25pmY0sAdiQJjImd80Z4JUfoPGDDAt8yPuKsaGhqaTOC4BWW7aRmP9ZB1lHrIKgoZVuF564wzzvC/VMP9Ku3iCoZakf3zbBXyYP+1ULY/5FYWPHTFScZZVKS8iRDyuhvqqSziwI2D9mf7LAfzwMXnIhZ5HiIOLoycW3SpfMwxx1R+i/PVQ71lnQZWuVhc3KB5qZeswnBT81wJ/v0k2RQh7HIqsroBrFsmwai/ndRc2WYtSrKWcSnceOONrl90BY/RITEy4lpFYeUj51TLszLy7A5xtTDEi2S7rDSSaA5ZN5esWJHKMaUpi7C7ad1113VZSRRcY7WMbUmlj2Z25aVsf8idDTVx4kT3l+yEKGRLgL0Isa8vsJOa/1Sc8ePHN8niiGKX900yOOLo1auX/zSL6DENHDgwsAMsGDVqVNCjRw9fG48d1C5TwsrP1zSlU6dO7rUVQBZSGGvRub92Uqx6zN5a626btco6S1ZxWEvX7ZPjOfbYY31tU5pTVmHIfpoyZUrQr1+/zFcQiKzI0hkyZIivjYdMlDZt2vhvjaTJiqyz7777zmXEkMESRuQPHTp08J9mIbKqZVxahRaMGzfOf6smaVyQsWMtZvc57phEVkkMHTrU/bUTins1Rxj6jR071r22Iwm7QnV/k8Y62NWr/zQLZFWrrJtbVieeeGJgjTZfOwu7kvafApfVlET79u0rmVS89sQaQEHHjh1dRmjW2I5Cltjw4cPdOJZjTyN6v+bpb1dCLrvMrsh8TQxWMLnA/0dzglhR/yMPc/EblpyAKwbLiQygCy+80NfOImtlcf3111fcCGkxB55DwD8ddenIcn+77bZzLhNAs19wwQVuKSoZQfwm1j4+PYJ97I8nScnk4JkEecIcqwANjQzwqeOzTwIfJ9vEUmb5KkjADX+2wBPaZP8QdOQhtaKyziurKHYQO78qriT2G6YlZQX4xfHnY3Vz/klEZUU2FT7zaLaOuKHYHg9VCXllhfuCNo899pivaUTGFcFfIU5WRcYlvnOenuZYeeYlCZ5qpu+GG27YxN3DZ/Gnh58sjsoqDhId6EfAHddJmHD8IC1LjmAxbShhdxFWPXU83CbEyaqIrFtKVsQJrTKoWu3gxqUvwWm5fknI8yMUMuIYkwLHkcc1yvgmQYRtpAXlk+bbPP3xLnDetFlrrbUSPRa5lQVYbes2SEDs8ccfdwPonHPOcXUINhyQ5EahHt9odMLjAuAv53fKrbfe6n+ZBQfNbwRfoxcsjGTOsARmImDAEWRj4uHpy3D6GMtG2ae8rybsFkoqPEkM4dRDlrlpMFmiKGjLBI9rSpbGnJscF5OJuIFYrsoALCLrvLISSG9kiU/cgz5xrqSWlBXIg4G8syiJJFkRvCRVln0z+TFRMP5QItHU2byy4lUY7IuMLp6+JnbE5IXrjesafpdWnKyKjEvJemN/xJCS4Hjl1RzIi0kNtwhpptSFU5eTZAV8Jk5BthZxC9wxjNcw4VRrJro0mFzECCJATgCViZjYGHGMt956y7eMl1URWbeUrDCA+I5SI2GCBAUmY9qhKMLXLwlS3GUSpjDmiFOhlIinkHCSBQYNfTHqwsomStJ8m6e/jFUpSe8sK6QsECJBKCYwhMYNymeyUMLWM8LnpmDHDEgBzcaL9BhA4YOj4PdEiGCXpZV6Bk8aDAqCyGR10J4BtsMOO7gLHNWQ3BS0YUDLzSP7SSusEkAGKueQZ1JmsHCjcUz0Y+Az4MIppvhiZT9hv25eWReRFRMEcmbgIAteOZGUcdSSsgo/k5H2nrAkWaEQCNJjbSInLEeUbXSFUkRWwARBbr4EcLnB2S7bCRMnqyLjUhQYL2TMgnRb7inxuzM5YDwMGzbMt2gkSVbIFyVKCiWTKP3kmMOIskeejJssiDex2pRXaXDeEjwPEycryCvrlpIVwXBWNKy6qUeRYcgw1uLklQQZgdwTEtdBnrwfD2XEPJkGsQ1JPxcjLI6k+TZvf1YfPLmP4ZD27FEhZZEXLGEOkAGZpoERuqSTUSRrgRuZ/qw+kpZERWGphTDYLku2onAcMuiiy+UySMZI9FUHeZlbZCVjIe0c5kZZSTIEk2vUui9DWVkxGdM/7C4ty9wqq+YGpZdmcGXNt1n989IsygJrmoNnKVkLaHSsaZ5XqBfiAsIlVAvylCl++HqB3xKLA2uKG6EWVFb5mRNlJRlbrBjrRVlZ8fAWsSa2IQ8O1oO5UVZzAmXn27zUXVnw9DL5vCw3iyzXBG5klmo8wFQvOA5cOKRkRpe1eeFJUlwquJbqhQQXw8HqIqis8jMnygoXIHEjYhi4AupFWVldccUVzm0WddeUYW6V1eym7HxbhLorCwlOpQVj0iCwVs8lJuDewhrJeiVxGpxXvVwXAgE+/KW1XmSVVX7mRFkx6dXyjp4sysoKC7sez7mEmVtlNbspO98WYbb/W1VFURRlzqfQK8oVRVGU/5+oslAURVEyUWWhKIqiZKLKQlEURclElYWiKIqSQRD8H24wMPNcEeljAAAAAElFTkSuQmCC[/img][br]Considere as seguintes afirmações envolvendo as notas acima:[br][b]I[/b]. A média aritmética das notas é 7,7. [br][b]II[/b]. A mediana das notas é 7,9. [br][b]III[/b]. A moda das notas é 6,8. [br][br]É correto o que se afirma em

(ENEM 2022) O gráfico apresenta os totais de receitas e despesas de uma empresa, expressos em milhão de reais, no decorrer dos meses de um determinado ano. A empresa obtém lucro quando a diferença entre receita e despesa é positiva e tem prejuízo quando essa diferença é negativa.[br][img width=279,height=219]https://foconoenem.com/wp-content/uploads/2023/05/image-1.png[/img][br]Qual é a mediana, em milhão de reais, dos valores dos lucros apurados pela empresa nesse ano?

Das dez avaliações aplicadas em um curso, um aluno, por motivos de saúde, faltou à nona e à décima prova. O professor decidiu então substituir a ausência de cada nota pela moda x das oito primeiras avaliações, conforme registrado a seguir:[br][img]https://d23vy2bv3rsfba.cloudfront.net/questoes_imagens/0_8e74fe69670b70a67dcdc39e37663124_13222203.jpg.png[/img][br]A média aritmética final desse aluno foi:

Realizou-se um estudo sobre a violência no Brasil. As taxas obtidas para os homicídios de mulheres de 1980 a 2010 estão registradas no gráfico.[br][img]https://s3.amazonaws.com/files-s3.iesde.com.br/resolucaoq/questao/2021_02_11_602560ee747ca.png[/img][br]De acordo com os dados apresentados, o aumento percentual relativo da taxa de 2007 para 2010 foi mais próximo de

Considere que a safra nacional de cereais, leguminosas e oleaginosas, em 2012, aponte uma participação por região conforme indicado no gráfico. Em valores absolutos, essas estimativas indicam que as duas regiões maiores produtoras deveriam produzir juntas um total de 119,8 milhões de toneladas em 2012.[br][img width=329,height=235]https://s3.amazonaws.com/files-s3.iesde.com.br/resolucaoq/questao/2019_12_30_5e09f0261a516.png[/img][br]De acordo com esses dados, a produção estimada, em milhão de tonelada, de cereais, leguminosas e oleaginosas, em 2012, na Região Sudeste do país, foi um valor mais aproximado de

A unidade de medida utilizada para anunciar o tamanho das telas de televisores no Brasil é a polegada, que corresponde a 2,54 cm. Diferentemente do que muitos imaginam, dizer que a tela de uma TV tem X polegadas significa que a diagonal do retângulo que representa sua tela mede X polegadas, conforme ilustração.[br][img width=301,height=179]https://s3.amazonaws.com/files-s3.iesde.com.br/resolucaoq/questao/2019_12_30_5e09ff114329a.png[/img][br]   O administrador de um museu recebeu uma TV convencional de 20 polegadas, que tem como razão do comprimento (C) pela altura (A) a proporção 4 : 3, e precisa calcular o comprimento (C) dessa TV a fim de colocá-la em uma estante para exposição.[br]A tela dessa TV tem medida do comprimento C, em centímetro, igual a