6'93 In statistics, the function 7'($) = 2 is known as a probability density function for the logistic (1 + 6'\") distribution. Simply put, integrating 'r($) between two (finite or infinite) values a and b will determine the probability of randomly selecting a value of a: (from the logistic distribution) which is between a. and b. What is the probability of randomly selecting a value of a: from the logistic distribution that is between 3 and 3? Give your answer as a percentage. Round your answer to at least three decimal places. Answer: C] % What is the probability of randomly selecting a value of a: from the logistic distribution that is between 3 and 00? Give your answer as a percentage. Round your answer to at least three decimal places. Answer: C] % 00 63: You can check that / da: 2 1. What does this mean? [Select all that apply.] co (1 + e '96? Answer: C] There is a 1% chance of randomly selecting a number between 00 and 00. C] There is exactly 1 number between co and 00 [3 There is a 100% chance of randomly selecting a number between co and 00. C] It is impossible for a randomly selected number to not be between co and co