Problem #4: Consider the following statements. (i) The double-log graph of the function y - 8.6 is linear. (ii) The semi-log graph of the function y = ge * is linear. (iii) The semi-log graph of the function y - 4x is linear. Determine which of the above statements are True (1) or False (2). So, for example, if you think that the answers, in the above order, are True, False, False, then you would enter '1,2,2' into the answer box below (without the quotes). Problem #4: Just Save Submit Problem #4 for Grading Problem #4 Attempt # 1 Attempt #2 Attempt # 3 Your Answer: Your Mark: Problem #5: Your value of R is 7. Obviously the inverse graph fails the vertical line test, and thus is not a function. Go back to your code and experiment with the values for a and b to find the largest (closed) interval [a, b] of real numbers such that (1) the graph contains the origin, and (2) the inverse is a function. Be sure to check your experimental values algebraically to ensure you have found the largest closed interval (this should be unique with a and b given as exact values). Enter the endpoints a and b into the answer box below (in that order), separated with a comma. Note: use pi for n. Enter your answer symbolically, Problem #5: as in these examples Just Save Submit Problem #5 for Grading Problem #5 Attempt # 1 Attempt #2 Attempt #3 Your Answer: Your Mark:* Help for Jupyter Labs can be found at the 1LS3 TA's Office Hours in the Math Help Center (In person in HH 104 or online at 1LS3 Help Centre Channel). Problem #1: By experimenting, find the INTEGER value of a so that BMI = a hz , when used with pounds and inches, gives the correct BMI (when the BMI is rounded to two decimal places). Enter the value of a into the answer box below. Submit Problem #1 for Grading Problem #1 Attempt #1 Attempt #2 Attempt #3 Your Answer: Your Mark: Problem #2: John has a body mass of 75 kg; he started drinking at 8pm, and consumed five beers by IOpm,' when he stopped drinking. Complete the given code to calculate John's BAC at midnight, assuming that he started drinking on an empty stomach. (Note that one beer counts as one drink.) Problem #2: : answer correct to 3 decimals Submit Problem #2 for Grading Problem #2 | Attempt #1 Attempt #2 Attempt #3 Your Answer: Your Mark: Problem #3: Examine the table of values for BAC to find the time when John's BAC i N .05 for the first time. John's BAC falls below 0.05 for the first time 5 hours and (how many?) minutes atic: 8pm. Round your answer to the nearest minute after 8pm. Submit Problem #3 for Grading Problem #3 | Attempt #1 Attempt #2 Attempt #3 Your Answer: Your Mark