1 Answer

Gary Houbre · Answer 1 · 2021-04-20T15:26:06+0000

Answer:

0.0066

Explanation:

Given that:

Mean
$\mu$ = 75

Variance
$\sigma^2 =961$

The standard deviation
$\sigma = √(961) = 31$

The sample size n = 100

$\mu = \mu_(\overline x) = 75$

$\sigma _(\overline x) = (\sigma )/(√(n))$

$\sigma _(\overline x) = (31 )/(√(100))$

$\sigma _(\overline x) = (31 )/(10)}$

$\sigma _(\overline x) = 3.1$

$P(\overline x > 83.7) = 1 - P( \overline x < 83.7)$

$P(\overline x > 83.7) = 1 -P\bigg ( (\overline x - \mu_(\overline x) )/(\sigma _(\overline x)) < (83.7 - 76)/(3.1) \bigg)$

$P(\overline x > 83.7) = 1 -P\bigg ( Z< (7.7)/(3.1) \bigg)$

$P(\overline x > 83.7) = 1 -P ( Z< 2.48)$

Using the Z table;

P(x > 83.7) = 1 - 0.9934

P(x > 83.7) = 0.0066

Thus, probability = 0.0066

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