What exactly do you need help with?
Answer:
a) 0.5047
b) 0.5978
c) Yes
Step-by-step explanation:
Given:
Mean, u = 0.8548
Standard deviation = 0.0512
Sample mean, X' = 0.8542
a) If 1 candy is randomly selected, the probability that it weighs more than 0.8542 would be:
From standard normal table, NORMSTD(-0.0117) = 0.4953
P(z > -0.0117) = 1 - 0.4953 = 0.5047
Probability = 0.5047
b) If 447 candies are randomly selected the probability that their mean weight is at least 0.8542:
Here, we are to find the probability that the men weight is greater or equal to 0.8542
From standard normal table, NORMSTD(-0.24776) = 0.40216
P(z > -0.0117) = 1 - 0.40216 = 0.5978
Probability = 0.5978
c) Yes, it seems the candy company is providing consumers with the amount claimed on the label, because the probability of getting a sample mean of 0.8542 or greater when 447 candies are selected is not exceptionally small
Discuss the relevance of fairy tales in society today and the aspects that it teaches us about our world. Why do we enjoy fairy tales and repeat these stories over time? How do fairy tales open our eyes to other cultures? What does it mean to live happily ever after? Discuss why tricksters often highlight flaws in the gods. If tricksters threaten order, authority, and hierarchy, then why do you think they appear in various stories? What are the similarities and differences in intelligence between the gods and tricksters? Discuss the ways in which tricksters mediate between the gods and men. Why do you think tricksters take the side of humans? What do the trickster stories say about cunning? Can intelligence be both evil and good?
Answer:
the thing i cant see it
Step-by-step explanation:
Answer:
a
Step-by-step explanation: