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ReneTo find the median of a set of numbers, you first need to arrange them in ascending order. In this case, the numbers are 6.0, 6.2, 6.2, 6.7, 7.6, and 8.1. Since there are six numbers, the median will be the average of the two middle numbers, which are 6.7 and 6.2. Adding these two numbers and dividing by 2 gives you a median of 6.45.
The median is the middle number in a list of numbers.
To find the median, you must first put the numbers in numerical order.
6.0, 6.2, 6.2, 6.7, 7.6, 8.1
Then, since there is an even amount of numbers in this sequence, you need to find the two middle numbers (If there were an odd amount of numbers, you would just choose the number directly in the middle to be your median).
6.2 and 6.7
You need to now find the number between these two to get the median. So...
6.7-6.2= 0.5 -----> There is a difference of 0.5 between the two numbers.
0.5/2= 0.25 ----> Divide the difference to get the halfway point between the numbers
6.2+0.25=6.24 ----> Add the halfway point to the smaller number to get your median.
Median = 6.24
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What is the median of numbers 76 84 93 67 82 87 and 76?
The median is 82, the middle value.
What is the mean mode and median of this data 64 80 64 70 76 79 67 72 65 73 68 65 67 65 70 62 67 68 65 64?
step 1. arrange the numbers in ascending order (from low to high) as follows. was: 64 80 64 70 76 79 67 72 65 73 68 65 67 65 70 62 67 68 65 64 now: 62 64 64 64 65 65 65 65 67 67 67 68 68 70 70 72 73 76 79 80 step 2. count the number of the numbers above, or assign an index as follows. string: 62 64 64 64 65 65 65 65 67 67 67 68 68 70 70 72 73 76 79 80 index: 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 so the count is 20. The mode is the number most frequently observed. The mode is 65, which occurs four times. The median is the number in the middle. In this case, the 10th and 11th numbers both qualify for consideration. We take the average of the two numbers. The median is therefore 67. Alternate methods: 1) Use Microsoft Excel statistical functions of =mode() and =median() 2) Draw a bar graph with the horizontal axis of integers from 62 to 80. The y-axis is the frequency observed for that specific x value. For example, the frequency for 62 is one. The frequency for 63 is zero, and so on. The mode is the bar with the highest count. The median is not so obvious from a bar graph, unless the distribution is symmetric. Need some manual counting.
Find the range of 86 19 25 76 and 35?
The range would be the difference between the lowest and the highest number, in this case 19 and 86. The range is therefore 67.
What is the median of 60 70 76 78 81 82 85 90 92 95?
It is 81.5, the number halfway between the two middle numbers.
What is the range for 86 19 25 76 and 35?
67
