Is there a relationship between degrees of angles in a polygon to it's diagonals?
What is the relationship between the degrees of angles in a polygon to diagonals of that polygon?!
Are you "policer" at this site:Is there a relationship between degrees of angles in a polygon to it's diagonals?
What is the relationship between the degrees of angles in a polygon to diagonals of that polygon?!
I ask if there is connection between angle to diagonals in polygon...Are you asking about a relationship between the measure of each interior angle of a regular polygon, and the number of diagonals of that polygon? Or something else, like the sum of the measures of the angles, and something about the lengths of diagonals or angles between them?
If it's the former, then each quantity is related to the number of vertices, so there is an indirect relationship between them. Do you know these two relationships?
I ask if there is connection between angle to diagonals in polygon...
If I draw the all diagonals, is the are relationship between the angles they create to the number of diagonals?
What the differences between regular polygon to non-regular polygon?I'm sorry, but you are still not quite being
Now, if you mean "is there a relationship between the measures of the angles between sides of a regular polygon, and the number of diagonals, then I already said yes, because both are related to the number of sides. That was part of what you quoted.
What the differences between regular polygon to non-regular polygon?
Why is it important to emphasize the differences to answer my question?
Again:
My question is there a relationships between angles to diagonals in polygon when the diagonals that come out from the angle [diagonal of this angle]...?
The problems with your question are (1) your English is poor, and (2) your question is grossly under-specified.What the differences between regular polygon to non-regular polygon?
Why is it important to emphasize the differences to answer my question?
Again:
My question is there a relationships between angles to diagonals in polygon when the diagonals that come out from the angle [diagonal of this angle]...?
I substitute the expression "regular polygon" by the two words that I think I realize from it: "concave" and "convex".I'm sorry, but you are still not quite being clear! You refer to the "the angles [the diagonals] create"; does that mean the number of intersections of diagonals, or to the measures of [some of] the angles diagonals make [with one another, or with the sides], or what? I understand that by "diagonals" you mean "number of diagonals"; but does that mean "angles" means "number of angles"? I'm sure you are aware that the diagonals "create" many different angles.
Now, if you mean "is there a relationship between the measures of the angles between sides of a regular polygon, and the number of diagonals, then I already said yes, because both are related to the number of sides. That was part of what you quoted.
Question 2:Please, either say that my rewording is correct, or give your own precise wording. As it is, I'm not at all sure you yourself know what you want. Now you seem to be asking about the angles between diagonals at a particular vertex of the polygon. (There is no such thing as "the diagonal of an angle". And, in general, each angle might be different.
But if you are asking only about regular polygons (all sides equal, all angles equal), then it turns out that all angles between diagonals at a vertex are equal. If you know the theorem relating angles inscribed in a circle and the arcs they cut off, you can calculate what this angle is.
If that doesn't answer your question, how about giving an example? Show me a polygon and point out exactly what you want to know about it -- what angles, whether it is their values or the number of them, and so on. Examples are a great help in communication when you don't have the words to say what you want, and the other person doesn't know your context.
I substitute the expression "regular polygon" by the two words that I think I realize from it: "concave" and "convex".
So, now when it clear to me. [The term regular polygon].
How the diagonals of one angle that in concave polygon different from angle convex polygon?
(A) When they the same?...
(B) When they different?...
It there a way to know more information about the diagonals by those two types of polygon?
Nothing has been said here about "cutting off" an angle. What has been said is an angle "cutting off" an arc. And I have already explained that: "That angle "cuts off" the arc of the circle that lies between the rays."What the meaning of expression "cut off"... an angle...
I don't understand the underline text...The problems with your question are (1) your English is poor, and (2) your question is grossly under-specified.
Yes, there are relationships among the angles of a pentagon and its diagonals. For example, the ratio of distinct interior angles to distinct diagonals is exactly 1 : 2.
If you have a specific question, please formulate it with sufficient specificity in the best English you can muster.
I don't understand what ratio the second forum member describe in his post.Is this what you wanted? If so, a picture would have helped you ask the question clearly.
I don't understand what ratio the second forum member describe in his post.
What is the ratio?
Where is it found?
Is it exist in other polygon? Why Yes? Why Not?
What is the proof that show it? (a link will be helpful!)
I quote the context of my question:
For example, the ratio of distinct interior angles to distinct diagonals is exactly 1 : 2.