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=So as you see ,l=
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∙ 15y ago
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Can i have an example of the parallel lines?
I don't understand what you mean by "the". However, ignoring that word, I will help you. Paralell lines are lines that will never intersect. Ever. Example: <----------------> (Obviously not dotted. This is merely the best way to show it.) <---------------> or ^ ^ | | (ditto.) | | | | | | | | v v I hope I was helpful!
How do you prove that two lines will never meet can someone help with the method to say that they are parallel?
By stating they are parallel.
What strategy does the author of the essay reading Shakespeare suggest will help you understand difficult lines in Shakespeare play's?
The more you read the lines, the easier they will be to understand.
Which lines from Brighton Beach Memoirs help the audience understand the historical setting?
A
What are 3 facts about meridians?
They are also called lines of longitude. They are not parallel. They help define a position and a time.
How can history help us understand the world?
If you can understand all the trends and mistakes humans have made, history can help us by preventing making the same ones. We could understand how we do things and the purpose for doing them... read a lot of books and stay in school.
Which line is parallel to gh?
without a diagram we can't help you, sorry
How does using a map help us to understand history?
It helps you find the location so you can retrace history.
Parallel lines are equidistant and will never meet?
I understand your question to be, "Is it true that parallel lines are everywhere equidistant and never intersect?" In what follows, I assume we're talking about a two-dimensional plane. By definition, two lines that are parallel (in the same plane) never intersect. In Euclidean (AKA Parabolic or simply E) Geometry, and also in Hyperbolic (AKA simply L) Geometry, parallel lines exist. In Elliptical (AKA R) Geometry, all lines eventually intersect so parallel lines do not exist. Now, are two parallel lines (in the same plane) everywhere equidistant? If so, that means that it is possible, at any point on one of the lines, to construct a perpendicular that will meet the other line in a perpendicular, and that the length of the segments constructed will be always the same. In Euclidean Geometry, two parallel lines (in a plane) are indeed everywhere equidistant. To prove it requires the converse of the Alternate Interior Angles theorem (AIA), which says that if two parallel lines are cut by a transversal, the alternate interior angles will be congruent. Note that this is the CONVERSE of AIA, not AIA. Some people get this mixed up. In Hyperbolic Geometry, two lines can be parallel, but be further apart some places than others. I know that sounds rather odd, if you're not used to it. Here's an image that might help: imagine that your plane is a thin sheet of rubber, and for some reason is being stretched. The further you go from your starting point, the more it stretches, and it's always stretching away from you. This means that your parallel lines will keep getting further and further apart.
How did the trojan war help the people of ancient Greece understand their history?
The Trojan war helped Greece build the historical buildings which helped then understand their history.
How do coins help us to understand history?
Because without coins the empires would not get bombs and all
How can works of art help us understand the history of the native people?
sf
