An electronic device factory is studying the length of life of the electronic components they produce. The manager takes a random sample of 50 electronic components from the assembly line and records the length of life in the life test. From the sample he found the average length of life was 100,000 hours and that the standard deviation was 3,000 hours. He wants to find the confidence interval for the average length of life of the electronic components they produced. Based on the information, what advice would you give to him?Select one or more:a. The distribution of the length of life of the electronic components is usually right skewed. Thus, he should not compute the confidence interval.b. He did not take a simple random sample of the electronic components; thus he should not compute the confidence intervalc. The mean and standard deviation are large enough to compute the confidence interval.d. The population is right skewed, but the sample size is large enough to use a normal approximation. Thus he can compute the confidence interval.e. He can calculate the confidence interval but should use a t-distribution since it deals with an average.