The mean increases by 1.5 because every value is increased by 1.5, take this example.
{1, 3, 7, 9} has a mean of 5.
Add 1 to each value.
{2, 4, 8, 10} has a mean of 6.
Standard Deviation generally stays the same despite the change in values, because of it's equation is based on the mean and data values and the distance between them in the end do not change if ALL values in a data set increase/decrease by the same number.
Answer:
Mean will increase by 1.5 sec. i.e. 5.7 sec
And, Standard deviation will remain same.
Step-by-step explanation:
Since, every drop takes 1.5 more seconds to drop. So, the Mean will increase by 1.5 sec. Example: Mean of {4, 5, 6, 7, 8} = 6
and if every observation will increase by 2 then Mean of {6, 7, 8, 9, 10} = 8.
Thus, the Mean will also increase by 2.
Also, Standard deviation measures the dispersion(scatter) of data and it is the distance from the mean. Since there is no change in distance. Thus there will be no change in standard deviation.
Further, Mean is used to measure the central tendency of data which represents the whole data in the best way. It can be found as the ratio of the sum of all the observations to the total number of observations.
Standard Deviation is the square root of the sum of square of the distance of an observation from the mean.
