Mean is not rigidly define. (State True or False)
princess1918:
true
Answers
Answered by
2
hello
I think it helps
the answer Is true
thank for asking
after reading please thank me
and mark me as brainliest...
I think it helps
the answer Is true
thank for asking
after reading please thank me
and mark me as brainliest...
Answered by
2
Answer:
False
Explanation:
As per the question
It is rigidly define
It is easy to understand the arithmetic, average even if some of the details of the data lacking
It is not based on the position in
Mean is easy to understand and simply calculate
It is based on all the series
can be determined graphically.
It can be calculated for distribution with open- end - classes
Similar questions