Final answer:
To find the minimum value, first quartile, median, and third quartile, the given values {-1,-5,-3,-5,-6,-1,-2,-2,-5} need to be ordered from least to greatest. The minimum value is -6, the first quartile is -5, the median is -3, and the third quartile is -2.
Step-by-step explanation:
The given values are {-1,-5,-3,-5,-6,-1,-2,-2,-5}. To determine the minimum, maximum, and quartile values, we need to first put the values in order from least to greatest:
-6, -5, -5, -5, -3, -2, -2, -1, -1
a. The minimum value is -6.
b. The first quartile is -5.
c. The 37th percentile can be found by dividing the number of values by 100 and multiplying it by the percentile: (9/100) * 37 = 3.33. Since it is not a whole number, we take the value that is greater than 3.33, which is the 4th value in the ordered list: -5.
d. The median is -3.
e. The 63rd percentile can be found by multiplying (9/100) * 63 = 5.67. Since it is not a whole number, we take the value that is greater than 5.67, which is the 6th value in the ordered list: -2.
f. The third quartile is -2.