At December 31, 2016, the organization's year-end, the protections have a reasonable worth of $495,000. On February 1, 2017, the organization sells the protections for $520,000.

Which proclamation is genuine in regards to how this data is accounted for in the organization's fiscal reports?

a. The organizations 2016 monetary record reports the protections at $495,000, and gain of $20,000 is accounted for on the 2017 pay proclamation.

b.The companys 2016 monetary record reports the protections at $500,000 and no increase or misfortune shows up in the 2016 fiscal summaries.

c. The organization 2016 monetary record reports the protections at $500,000, and a deficiency of $5,000 is accounted for on the 2016 pay explanation.

d. The companys 2016 monetary record reports the protections at $495,000, and an increase of $25,000 is accounted for on the 2017 pay explanation.

w many do you expect to have the flu? 7. The percent of fat calories that a person in America consumes each day is normally distributed with a mean of about 36 and a standard deviation of 10. Suppose that one individual is randomly chosen. Let X= percent of fat calories. a. X- b. Find the probability that the percent of fat calories a person consumes is more than 40. Graph the situation. Shade in the area to be determined. C. Find the probability that the percent of fat calories a person consumes is in between 34 and 40. Graph the situation. Shade in the area to be determined. 8. Previously, De Anza statistics students estimated that the amount of change daytime statistics students carry is exponentially distributed with a mean of $0.88. Suppose that we randomly pick 25 daytime statistics students. a. In words, X =_ b. X - _L c. In words, X = e. Find the probability that an individual had between $0.80 and $1.00. Graph the situation, and shade in the area to be determined. f. Find the probability that the average of the 25 students was between $0.80 and $1.00. Graph the situation, and shade in the area to be determined.Some statistics students estimated that the amount of change daytime statistics students carry is exponentially distributed with a mean of so.72. Suppose that we randomly pick 25 daytime statistics students. Part () part (b) Give the distribution of X. X-Of part (c) part (d) Give the distribution of & (Round your standard deviation to three decimal places.) part (t) Find the probability that an individual had between $0.80 and $1.00. (Found your answer to four decimal places.) Graph the situation, and shade in the area to be determined. 14 Lot 05 20 part (0) Find the probability that the average of the 25 students was between $0.80 and $1.00. [Round your answer to four decimal places.) Graph the situation, and shade in the area to be determined.according to the "Koch" poll roughly 93% of students like to take Statistics!! If 8 students are polled find the following (round answers to 6 decimal places if needed): (p.s. the graph in the back will not help you ) a) Find the probability exactly 6 students like statistics. b) Find the probability more than 6 students like statistics. c) Find the probability no more than 2 students like statistics. d) Find the probability at least one student likes statistics.Samples of a cast aluminum part are classified on the basis of surface finish (in microinches) and length measurements. The results of 100 parts are summarized as follows: Length excellent good Surface excellent 80 2 Finish good 10 8 Let A denote the event that a randomly selected part has excellent surface finish, and let B denote the event that a randomly selected part has excellent length. Determine: a. P(A) and P(B). b. If the selected part has excellent surface finish, what is the probability that the length is excellent? c. If the selected part has good length, what is the probability that the surface finish is excellent