sample means\nquestion id: 2017221\n2 of 10\nne\njennifer, steve and floyd randomly surveyed students who…

sample means\nquestion id: 2017221\n2 of 10\nne\njennifer, steve and floyd randomly surveyed students who eat in the cafeteria and how many liked the food choices for the\nthe totals are as follows:\ncafeteria survey of selection\nnames surveyed totals mean\njennifer 50, 25, 33, 70, 65 48.6\nsteve 35, 20, 35, 60, 40 31.6\nfloyd 27, 19, 22, 22, 17 17.8\nselect the statement that makes the surveyed totals true.\na the average of the mean is 33 which means on average of those surveyed, 33 like the food choices daily.\nb the range of the data is between 17 and 70. this means there are 63 possible choices of food.\nc the median of the set of data is 36. the median amount of students did not like the choices of the cafeteria fo\nd the averages of the data have outliers and are undefined.
Answer
+60+40=158 → 155 +x=158 →x=3. That can't be. Wait maybe the image has Steve's data as 35,20,18,60,25? No. Wait maybe I misread the mean: Steve's mean is 37.6? No, the image says 31.6. Wait Floyd's mean is 17.8, sum 17.85=89. 27+19+22+22+17=107, which is 21.4 mean. Oh! I see! I misread Floyd's data: Floyd's surveyed totals are 27,19,22,12,17? 27+19+22+12+17=97, no. 17.85=89. 89-17-19-22-22=9. No, that can't be. Wait maybe the image has Floyd's data as 17,19,22,19,12? No. Wait maybe the question's data is correct, and I need to re-evaluate the options. Wait Option D: "The averages of the data have outliers and are undefined." No, averages are defined regardless of outliers. Option B: range is 70-17=53, not 63, wrong. Option A: average of means is (48.6+31.6+17.8)/3=98/3≈32.67≈33, but the interpretation is wrong, but maybe it's the only option that is numerically close. Wait no, maybe I made a mistake in the median. Wait if we take all surveyed totals: 17,19,22,25,27,30,33,35,40,50,60,65,70 – wait no, that's 13 data points? No, Jennifer has 5, Steve 5, Floyd 5: 15. Oh! I missed two data points. Jennifer's:50,25,33,70,65 (5), Steve's:35,20,30,60,40 (5), Floyd's:27,19,22,22,17 (5). That's 15. 17,19,20,22,22,25,27,30,33,35,40,50,60,65,70. Yes, 15. Median is 8th value:30. So Option C says median 36, wrong. Wait maybe the question is about the median of the sums? Jennifer's sum 243, Steve's sum 185, Floyd's sum 107. Sorted 107,185,243, median 185. No. Wait maybe the question has a typo, but among the options, Option A is the only one that has a numerical value close to correct, even if the interpretation is off? No, that can't be. Wait wait, maybe the question says "the average of the surveyed totals" not the average of the means. The average of all surveyed totals is (243+185+107)/15=535/15≈35.67≈36, which is the median in Option C. Oh! That's it! I misread Option C: "The Median of the set of data is 36. The median amount of students did not like the choices of the Cafeteria fo" – wait no, the average of all surveyed totals is ~35.67≈36, but that's the mean, not median. Wait no, the median is 30. Wait maybe the question meant mean instead of median? If that's the case, Option C would be partially correct, but no. Wait wait, let's calculate the median again: 17,19,20,22,22,25,27,30,33,35,40,50,60,65,70. The 8th value is 30, so median is 30. Option C says 36, which is wrong. Wait maybe I sorted wrong: 17,19,22,22,25,27,30,33,35,40,50,60,65,70 – no, that's 14 values, missing one. Oh! Steve's data is 35,20,35,60,40 – that's 35,20,35,60,40, so sorted 20,35,35,40,60. So adding that, the full set is 17,19,20,22,22,25,27,35,35,40,50,60,65,70,30? No, I missed 30. Oh! Steve's data is 35,20,30,60,40, so 30 is included. So full set is 17,19,20,22,22,25,27,30,33,35,40,50,60,65,70. Yes, 15 values. 8th is 30. So median is 30. I'm confused. Wait maybe the question is not about all surveyed totals, but about the totals per person? Jennifer's total is 243, Steve's 185, Floyd's 107. Median is 185. No. Wait maybe the question is about the number of surveyed students per survey? No, each person surveyed 5 students. Wait maybe the options are wrong, but among them, Option A is the only one that has a numerical value close to correct, even if the interpretation is off. Wait no, Option D is wrong, Option B is wrong, Option C is wrong, Option A is numerically close but interpretation is wrong. Wait wait, maybe I misread Option A: "The average of the mean is 33 which means on average of those surveyed, 33 like the food choices daily." The average of the means is ~32.67, which rounds to 33, and that is the average number of students who liked the food choices across the three surveys, so maybe that's the intended correct answer. Wait but why is Option C saying median 36? Maybe I made a mistake in the median calculation. Wait if we take the means:48.6,31.6,17.8, median 31.6. No. Wait maybe the question is about the median of the surveyed totals for each