The answer to your first three questions is the same -- if you add a constant to every value in a list, the standard deviation will not change. It doesn't matter what the list is. So the standard deviation of these two lists, for example:
2, 7, 10, 50
and
22, 27, 30, 70
is the same, because we can make the second list by adding 20 to every value in the first list. The reason the standard deviation does not change is because standard deviation is based on the distance between your elements, and when we add 20 to everything, the distances between our values don't change at all.
When you multiply every value in a list by a constant, the standard deviation will also be multiplied by that constant. So if you multiply every value in a list by 3, the standard deviation will be multiplied by 3. The standard deviation of the second list below is 3 times the s.d. of the first:
2, 7, 10, 50
6, 21, 30, 150
Notice that when we multiply by 3, we 'stretch out' the distances between values -- the distances between consecutive values in the second list are 3 times larger than in the first list. That's why the standard deviation changes when you multiply.
If instead you divide everything in a list by 3, then you're really just multiplying everything by 1/3, and so the standard deviation will be multiplied by 1/3.
These principles apply no matter what kind of list or set you're working with.
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