There is insufficient information for us to even begin to understand this question. The answer could depend on the Korean data for WHAT! Population by age, scores in maths exams, populations of towns and cities, heights of people? Each one will have a different distribution. Please edit the question to include more context or relevant information.
stem-and-leaf plots
This is just a rough outline of a few of the ways to describe a 2-d shape. I can't go into depth because there are both an infinite number of 2-d shapes and and infinite number of ways to describe them. Without a better understanding of what is being asked the correct answer simply cannot be known. Anyway, a rough attempt: It depends on what you mean by describe. There are many words used to describe a 2-d shape: square, circle, pentagon, etc. It depends largely on what shape it is. If it's an irregular pentagon then it will be described differently than if it were a regular square. If it's a regular shape (each side is of equal length e.g. square) then it would simply be described with "A regular [shape] with side length [some number and measurement label]". And example: "A regular octagon with side length 8 inches" would be roughly a stop sign (I have no idea how long the sides of a stop sign really are). If it's irregular then it's more complicated. A number of methods could be used spanning the spectra of ease of use and amount of use. You could potentially describe the basic shape and then give each side length in turn. You could potentially find some equation to fit the shape. You could split it up into something simpler like triangles and describe them instead.
There is not a shape that has 2 sides as these lines would never touch and thus would never become a closed fiqure or 'shape'.
The binomial distribution is defined by two parameters so there is not THE SINGLE parameter.
The general shape of a cell would be a cirle, or an oval
i would describe it as the shape of a rock been broken down into pieces
That would provide some evidence that the distribution is symmetric about the mean (or median).
That would provide some evidence that the distribution is symmetric about the mean (or median).
Well the perimeter is the straight line across the middle of the shape I would describe is a single parallel line to be my opinion
a rad anthem environment
a sphere or 3D circle
The Central Limit THeorem say that the sampling distribution of .. is ... It would help if you read your question before posting it.
The moment of inertia of the balance wheel about its shaft depends on the shape and distribution of mass in the wheel. To calculate it, you would need to know the mass distribution and shape of the balance wheel.
stem-and-leaf plots
A geometrical shape with four equal sides.
the variance is infinitely large and in the extreme case the probability distribution curve will simply be a horizontal line
Bell-shaped, unimodal, symmetric