If you're talking about convex polygons with equal sides (eg. equilateral triangles, squares, pentagons, hexagons, etc.), then the relationship is a very direct one. In those cases, there are as many lines of symmetry as there are points in the polygons. A triangle has three lines of symmetry, a square has four, a pentagon five, etc.
it is when the domain is a whole number
what is the relationhip between the values m and n plotted on the number line
If it has infinite number of solutions that means that any ordered pair put into the system will make it true. I believe the relationship of the graphs question your asking is that tooth equations will probably be the same line
yes
I'm looking below, but I don't see a number line there.
No.
i am a gummi bear ..............................................................................................................................................................................................................
The relationship is one of identity. The number of lines of symmetry for any object, are always identically equal to the number of lines of symmetry for that same object.The relationship is one of identity. The number of lines of symmetry for any object, are always identically equal to the number of lines of symmetry for that same object.The relationship is one of identity. The number of lines of symmetry for any object, are always identically equal to the number of lines of symmetry for that same object.The relationship is one of identity. The number of lines of symmetry for any object, are always identically equal to the number of lines of symmetry for that same object.
They are the same.
i dont know man
Yes, as a rule. Of course, the number of steps has to round to an integer. so the relation is not quite linear.
Not really. For example, there are infinitely many shapes with lateral (left-right) symmetry - including very many animals.
When a pattern in a number sequence in added or subtracted by the same number every time. :)
It would increase by the same number.
Correlation between two variables implies a linear relationship between them. The existence of correlation implies no causal relationship: the two could be causally related to a third variable. For example, my age is correlated with the number of TV sets in the UK but obviously there is no causal link between them - they are both linked to time.
relationship between the number of sides of afigure and the number of vertices
8.