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Discuss in detail the international relations, foreign policy (objectives, behaviors, and
dimensions) national interests, political economic models with successes & challenges,
participation in regional/ global institutions, impacts/ advantages of globalization and role in
contemporary global issues of syria?
what adaptation must be nedeed for radially and bilaterally symetrical invertebrate to survive in a given environment?
Consider a population consisting the scores of 6 students in a Statistic Test.
18, 22, 25, 28, 32, 36
Suppose samples of size 3 are drawn from this population, describe the sampling
distribution of the sample means following the steps below.
Step 4: List all possible
samples and their
corresponding means.
Write a class named Car that uses the following data attributes:
A 140 kN force with a slope of 4 vertical and 7 horizontal is located on the second quadrant. Determine its y- component.
Calculate the magnitude of the force of repulsion between two equal charges of 2.0V separated by a distance of 1m.
Take (1/4"\\lambda\\epsilon\\Omicron"=9x109)
A company has developed a new battery. The engineering department of the company claims that each battery lasts for 200 minutes. In order to test this claim, the company selects a random sample of 100 new batteries so that this sample has a mean of 190 minutes. Given that the population standard deviation is 30 minutes, test the engineering department’s claim that the new batteries run with an average of 200 minutes. Use 1% level of significance.
4)Given that the level of significance is 0.01 or 1%, what is/are the critical values?
5)Using the appropriate formula, what is the computed test statistic? (Input your answer using 3 decimal places, example: 1.234 if positive or -1.234 if the answer is negative) *
6)What is the decision based from the critical value and the computed test statistic
7)What is the conclusion?
A company has developed a new battery. The engineering department of the company claims that each battery lasts for 200 minutes. In order to test this claim, the company selects a random sample of 100 new batteries so that this sample has a mean of 190 minutes. Given that the population standard deviation is 30 minutes, test the engineering department’s claim that the new batteries run with an average of 200 minutes. Use 1% level of significance.
1)Which is the correct null hypothesis that can be derived in the situation?
2)Which is the correct alternative hypothesis that can be derived in the situation?
3)What test will be used based from the given values in the situation?
A force of 0.88N stretch an elastic spring by 200cm. Find the elastic constant of the spring.
A spring is stretched 40mm by a force of 15N. What is the work done by the force
