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The weights of steers in a herd are distributed normally. The standard deviation is 100lbs and the mean steer weight is 1300lbs. Find the probability that the weight of a randomly selected steer is between 1169 and 1400lbs. Round your answer to four decimal places.

User Matuku
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1 Answer

11 votes
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So in order to find the probability that the weight of a randomly selected steer is between 1169lbs and 1400lbs we first need to find the z values corresponding to 1169 and 1400. The z values are calculated by using the mean and the standard deviation of the population of steers:


z(x)=(x-\mu)/(\sigma)

Where mu is the mean and sigma the standard deviation. Then we have:


z(x)=(x-1300)/(100)

And the two z values that we need are:


\begin{gathered} z(1169)=(1169-1300)/(100)=-1.31 \\ z(1400)=(1400-1300)/(100)=1 \end{gathered}

Then we look at a z value table and see the values corresponding to these two z values:

So the values given by the table are 0.0951 and 0.8413. This means that the probability that the weight of a randomly selected steer is between 1169lbs and 1400lbs is 0.8413-0.0951=0.7462. Then the answer is 0.7462.

The weights of steers in a herd are distributed normally. The standard deviation is-example-1
The weights of steers in a herd are distributed normally. The standard deviation is-example-2
User Durga Mohan
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