Calculate the difference between the means distribution parameters? where n1=25,n2=36, s2 1 = 50, s 2 2 = 72, M1= 100, & M2 = 105
To calculate the difference between the means distribution parameters, we can use the formula:
Difference = M1 - M2
Where:
M1 = Mean of the first distribution
M2 = Mean of the second distribution
Given that M1 = 100 and M2 = 105, we can substitute these values into the formula:
Difference = 100 - 105
Therefore, the difference between the means distribution parameters is equal to -5.
To calculate the difference between the means of two distributions, you need to use the following formula:
Difference = M2 - M1
Where:
- M1 is the mean of the first distribution
- M2 is the mean of the second distribution
In this case, M1 = 100 and M2 = 105, so the difference between the means is:
Difference = 105 - 100
Difference = 5
Therefore, the difference between the means of the distributions is 5.