The popping times of the kernels in a certain brand of microwave popcorn are

normally distributed, with a mean of 150 seconds and a standard deviation of

13 seconds.

The first kernel pops 128 seconds after the microwave oven is started. What

is the z-score of this kernel? Round your answer to two decimal places.

O

O

O

O

A. - 1.69

B. 0.59

c. - 0.59

D. 1.69

Question

Mathematics

Stevenson

23 October, 20:46

The popping times of the kernels in a certain brand of microwave popcorn are

normally distributed, with a mean of 150 seconds and a standard deviation of

13 seconds.

The first kernel pops 128 seconds after the microwave oven is started. What

is the z-score of this kernel? Round your answer to two decimal places.

O

O

O

O

A. - 1.69

B. 0.59

c. - 0.59

D. 1.69

+5

Answers (1)

Know the Answer?

Allison Deleon · Answer 1

The correct answer is A. - 1.69

Step-by-step explanation:

1. Let's review the information given to us to answer the question correctly:

Mean of the popping time of the kernels in a brand of microwave popcorn = 150 seconds

Standard deviation of the popping time of the kernels in a brand of microwave popcorn = 13 seconds

Time that first kernel pops = 128 seconds

2. What is the z-score of this kernel? Round your answer to two decimal places.

z-score = (Time that first kernel pops - Mean of the popping time) / Standard deviation of the popping time

Replacing with the real values, we have:

z-score = (128 - 150) / 13

z-score = - 22/13

z-score = - 1.69

The correct answer is A. - 1.69