7-5. A synthetic fiber used in manufacturing carpet has tensile strength that is normally distributed with...
7-5. A synthetic fiber used in manufacturing carpet has tensile strength that is normally distributed with mean 520 KN/m² and standard deviation 25 KN/m². Find the probability that a ran- dom sample of n= 6 fiber specimens will have sample mean tensile strength that exceeds 525 KN/m².
A synthetic fiber used in manufacturing carpet has tensile strength that is normally distributed with mean 75.5 psi and standard deviation 3.5 psi. Let X = tensile strength of the synthetic fiber from a fiber specimen used in carpet manufacturing (in psi). Suppose you randomly pick a sample of n = 36 fiber specimens and perform tensile testing on them. (round 5 decimal places) a.) For n = 36 fiber specimens, what's the probability that the average tensile strength of all...
a synthetic fiber used in manufacturing carpet has tensile strength that is normally distributed usted with mean 75.5 psi and standard deviation 3.5 psi. find the probability that a random sample n=6 fiber specimens will have sample mean tensile strength that is between 75.25 and 75.75 psi
A synthetic fiber used in manufacturing carpet has tensile strength that is normally distributed with mean 75.5 psi and standard deviation 3.5 psi. Suppose we measure the sample mean for n independent samples How is the variance of the sample mean changed when the sample size is increased from n-9 to n 36? What does this imply about the relationship between sample size and our estimate of the mean (sample mean here)?
HW4 7-4. Suppose that samples of size n=25 are selected at ran- dom from a normal population with mean 100 and standard deviation 10. What is the probability that the sample mean falls in the interval from uly-1.70 touy +1.50 ? 7-5. A synthetic fiber used in manufacturing carpet has tensile strength that is normally distributed with mean 520 KN/m and standard deviation 25 KN/mp. Find the probability that a ran- dom sample of n= 6 fiber specimens will have...
QUESTION 1 1 points Saved Copy of A research engineer for a tire manufacturer is investigating tire life for a new rubber compound and has built 36 tires and tested them to end-of life in a road test. The sample mean and standard deviation are 66 and 2.1 thousand kilometers. Find a 99% upper bound for the mean life in road test. (round the answer to three digits) 67.853 QUESTION 2 1 points Saved A synthetic fiber used in manufacturing...
The fiber-spinning process currently produces a fiber whose strength is normally distributed with a mean of 75 N/m2 and a standard deviation of 8 N/m2. a. Find the probability that the strength of a randomly chosen fiber has a strength greater than 80 N/m2 b. Find the probability that the strength of a randomly chosen fiber has a strength between 71 N/m2 and 86 N/m2 c. Find the top 15% strongest fibers
Pr。Ыет 12. An engineer who is studying the tensile strength of a steel alloy intended for use in golf club shafts knows that tensile strength is approximately normally distributed. A random sample of 12 specimens has a mean tensile strength of 3250 psi and a sample standard deviation of 8-60 psi. a) Test the hypothesis that mean strength is 3500 psi. Use α-001. b) What is the smallest level of significance at which you coulji be willing to reject the...
The tensile strength, X, of a tungsten component is normally distributed with a mean of 546 grams per square centimeter (gscm) and a standard deviation of 50 gscm. a)Calculate the variance of X/50 1 b) Calculate the variance of 5X 3. 6250 c) Calculate the probability that the tensile strength of a tungsten component is at least 500 gscm? .8212 d) What is the probability that X is within 1 standard deviation of its mean? 6827 e) What is the...
Reserve Problems Chapter 9 Section 2 Problem 7 An engineer who is studying the tensile strength of a steel alloy intended for use in golf dub shafts knows that tensle strength is approximately normally d tributed th σ-60 si A random sample of 12 specimens has a mean tensile strength of X 3450 psi. (a) If the mean strength is 3500 psi, what is the smallest level of significance at which you would be willing to reject the null hypothesis?...