Question #279615

Assuming the mean and SD are the same for this year’s national exam, what percentage of test-takers scored above and below you if your score is 1900 and given that X ~ N(1600, 140). Using the empirical rule, find the percentage of students who scored between 1880 and 1920?


1
Expert's answer
2021-12-15T08:00:33-0500

Given that XN(1600,140).X\sim N(1600, 140).

Then


μ=1600,σ2=140,σ=140\mu=1600, \sigma^2=140, \sigma=\sqrt{140}


P(X<1900)=P(Z<1900μσ)P(X<1900)=P(Z<\dfrac{1900-\mu}{\sigma})

=P(Z<19001600140)P(Z<25.3546)=P(Z<\dfrac{1900-1600}{\sqrt{140}})\approx P(Z<25.3546)

1(100%)\approx1(100\%)

The empirical rule formula:

68% of data falls within 1 standard deviation from the mean - that means between μσμ - σ  and μ+σ.μ + σ.

95% of data falls within 2 standard deviations from the mean - between μ2σμ – 2σ  and μ+2σ.μ + 2σ.

99.7% of data falls within 3 standard deviations from the mean - between μ3σμ - 3σ and μ+3σ.μ + 3σ.

Given


μ=1600,σ=14011.83\mu=1600, \sigma=\sqrt{140}\approx11.83

Then


(μσ,μ+σ)(1588.2,1611.8)(\mu-\sigma, \mu+\sigma)\approx(1588.2, 1611.8)

(μ2σ,μ+2σ)(1576.3,1623.7)(\mu-2\sigma, \mu+2\sigma)\approx(1576.3, 1623.7)

(μ3σ,μ+3σ)(1564.5,1635.5)(\mu-3\sigma, \mu+3\sigma)\approx(1564.5, 1635.5)

We cannot use the empirical rule to find the percentage of students who scored between 1880 and 1920.


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Guyana #340795 on Jan 2024