1 Answer

Marie · Answer 1 · 2022-05-29T12:06:18+0000

Answer:

P(p>0.43) = 0.0436

Explanation:

Given

$p = 40\%$ -- proportion of baseball players

n = 781 --- selected sample

Required

Determine P(p>43%)

First, calculate the z score using:

$Z = \frac{\^(p)-p}{\sqrt{(p(1-p))/(n)}}$

This gives:

$Z = \frac{48\%-40\%}{\sqrt{(40\% *(1 - 40\%))/(781)}}$

Convert % to decimal

$Z = \frac{0.43-0.40}{\sqrt{(0.40 *(1 - 0.40))/(781)}}$

$Z = \frac{0.43-0.40}{\sqrt{(0.40 *0.60)/(781)}}$

$Z = \frac{0.43-0.40}{\sqrt{(0.24)/(781)}}$

Z = (0.03)/(√(0.00030729833))

Z = (0.03)/(0.01752992669)

Z = 1.71

So:

P(p>0.43) = P(Z>1.71)

P(p>0.43) = 1 - P(Z<1.71)

P(p>0.43) = 1 - 0.9564

P(p>0.43) = 0.0436

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