# What is Mean (1655, 1654, 1654, 1650, 1655, . . . . , 1655, 1656)?

getcalc.com's Mean (μ) calculator to find what is the mean, mode & median for dataset 1655, 1654, 1654, 1650, 1655, 1656, 1657, 1653, 1655 & 1656 to measure & summarize the center point or common behavior, repeated occurrence & central tendency of collection of sample or population data in *probability *& statistical experiments. 1654.5 is the mean, 1655 is the median and 1655 is the mode for the above dataset.

## How to Find Mean for 1655, 1654, 1654, 1650, 1655, . . . . , 1655 & 1656?

The below workout with step by step work help grade school students or learners to understand how to find what is the mean or *average* for data set 1655, 1654, 1654, 1650, 1655, 1656, 1657, 1653, 1655 and 1656 to measure or locate the center point of sample or population data which involved in the statistical survey or experiment, to draw conclusions of sample or population data characteristics.

__Mean :__

step 1 Address the formula, input parameters & values.

Formula:*µ* =
n
∑
i = 0
X_{i}n

Input parameters & values

x_{1} = 1650; x_{2} = 1653, . . . . , x_{10} = 1657

number of elements n = 10

Find sample or population mean for 1655, 1654, 1654, 1650, 1655, 1656, 1657, 1653, 1655 & 1656

step 2 Find the sum for dataset 1655, 1654, 1654, 1650, 1655, . . . . , 1655 & 1656

*µ* =
n
∑
i = 0
X_{i}n

= (1650 + 1653 + 1654 + . . . . + 1657)/10

step 3 Divide the sum by number of elements of sample or population

= 16545/10

= 1654.5

Mean (1655, 1654, 1654, 1650, 1655, . . . . , 1655, 1656) = 1654.5

1654.5 is the mean for dataset 1655, 1654, 1654, 1650, 1655, . . . . , 1655 & 1656 from which the *standard deviation* about to be measured to estimate the common variation of the sample or population dataset from its central location.__Median :__

step 1 To find Median, arrange the data set values in ascending order

Data set in ascending order : 1650, 1653, 1654, 1654, 1655, 1655, 1655, 1656, 1656, 1657

step 2Since the total number of elements in the dataset is 10 (EVEN number), the median is the average of 5^{th} and 6^{th} elements (two middle numbers) for the above dataset.

Therefore,

1655 + 1655/2= 1655

Median = 1655

__Mode :__

step 1 To find Mode, check for maximum repeated elements in the asending ordered dataset 1650, 1653, 1654, 1654, 1655, 1655, 1655, 1656, 1656, 1657

Most repeated element : 1655

Mode = 1655