A regular polygon has n vertices. How many lines can be drawn between two non-adjacent vertices on its interior? A. n(n-1)/2 B. n(n-3)/2 C. n!/2 D. n(n+1)/2 E. n(n-3)/4
A regular polygon has n vertices. How many lines can be drawn between two non-adjacent vertices on its interior? A. n(n-1)/2 B. n(n-3)/2 C. n!/2 D. n(n+1)/2 E. n(n-3)/4
A regular polygon has n vertices. How many lines can be drawn between two non-adjacent vertices on its interior? A. n(n-1)/2 B. n(n-3)/2 C. n!/2 D. n(n+1)/2 E. n(n-3)/4
A regular polygon has n vertices. How many lines can be drawn between two non-adjacent vertices on its interior?
A. n(n-1)/2
B. n(n-3)/2
C. n!/2
D. n(n+1)/2
E. n(n-3)/4
could you make a explanation for me? Thank you a lot!
Definition Definition Two-dimentional plane figure composed of a finite number of straight line segments connected to form a closed chain or circuit. A polygonal circuit's segments are known as its edges or sides, and the points where two edges meet are known as its vertices or corners.
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