107 728
Assignments Done
100%
Successfully Done
In April 2024
In April 2024
Your physics assignments can be a real challenge, and the due date can be really close — feel free to use our assistance and get the desired result.
Physics
Be sure that math assignments completed by our experts will be error-free and done according to your instructions specified in the submitted order form.
Math
Our experts will gladly share their knowledge and help you with programming projects. Keep up with the world’s newest programming trends.
Programming
Answer to Question #5349 in Statistics and Probability for val
Question #5349
the mean clotting time of blood is 7.45 seconds with a standard deviation of 3.6 seconds. what is the probability an individual's clotting time will be less than 3 seconds or greater than 11 seconds?
Expert's answer
Let`s use normal distribution:
The distribution function of standard normal random variable
<img style="width: 259px; height: 53px;" src="data:image/png;base64,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" alt="">
<img style="width: 329px; height: 28px;" src="data:image/png;base64,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" alt="">
The probability an individual's clotting time will be less than 3 seconds
<img style="width: 218px; height: 33px;" src="data:image/png;base64,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" alt="">
The probability an individual's clotting time will be greater than 11 seconds
<img style="width: 264px; height: 29px;" src="data:image/png;base64,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" alt="">
The distribution function of standard normal random variable
<img style="width: 259px; height: 53px;" src="data:image/png;base64,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" alt="">
<img style="width: 329px; height: 28px;" src="data:image/png;base64,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" alt="">
The probability an individual's clotting time will be less than 3 seconds
<img style="width: 218px; height: 33px;" src="data:image/png;base64,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" alt="">
The probability an individual's clotting time will be greater than 11 seconds
<img style="width: 264px; height: 29px;" src="data:image/png;base64,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" alt="">
Learn more about our help with Assignments: Statistics and Probability
Comments
Leave a comment