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Published byMerilyn Williamson Modified over 9 years ago
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Spherical Geometry
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The geometry we’ve been studying is called Euclidean Geometry. That’s because there was this guy - Euclid.
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Euclid assumed 5 basic postulates. Remember that a postulate is something we accept as true - it doesn’t have to be proven.
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One of those postulates states: Through any point not on a line, there is exactly one line through it that is parallel to the line. Try to draw this!
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Your drawing should look like this: this is the only line that you can make go through that point and be parallel to that line
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Here’s the big question: Is that true in a spherical world like earth?
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So basically we need to know: What is a line? Does it look like this?
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Or does it take on the form of a projectile circling the globe? (like the equator?)
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Well, some of the other ancient mathematicians decided to define a spherical line so that it is similar to the equator. This is called a great circle. Great Circle: For a given sphere, the intersection of the sphere and a plane that contains the center of the sphere.
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Draw a line on your sphere then Make a conjecture about lines in spherical geometry. EuclideanSpherical Two points make a line. A B A B In spherical geometry, the equivalent of a line is called a great circle.
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Draw another line on your sphere. Spherical A B What happened here that wouldn’t happen in Euclidean geometry? Look at the number of intersection points. Look at the number of angles formed. 2 8
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In spherical geometry, then, a line is not straight - it is a great circle. Examples of great circles are the lines of longitude and the equator.
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Lines of latitude do not work because they do not necessarily have the same diameter as the earth. The equator is the only line of latitude that is a great circle.
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So what these guys figured out is that this geometry isn’t like Euclid’s at all. For instance - what about Parallel lines and his postulate? (we mentioned this earlier!)
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Are lines of longitude or the equator parallel? NO! There are no parallel lines on a sphere! Are there any other great circles that are parallel? So, what can you conclude from this?
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What about perpendicular lines? Do we still have these? YES! The equator & lines of longitude form right angles! 8! Four on the front side & four on the back. How many right angles are formed when perpendicular lines intersect?
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What about triangles are there still triangles on a sphere? Let’s look!
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Draw a 3rd line on your sphere. In Euclidean Geometry, 3 lines usually make a triangle Is this true in spherical geometry? A B C B C A
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What about the angles of a triangle? Now move A and C to the equator. Move B to the top, what happens? Euclidean Spherical B C A A B C Estimate the 3 angles of your triangle. Find the sum of these angles. Make a conjecture about the sum of the angles of a triangle in spherical geometry. The sum of the angles in a triangle on a sphere doesn’t have to be 180°! Let’s look at an example of this.
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What would happen if you moved A & C to opposite points on the great circle? A B C AC What is the measure of angle B? What is the sum of the angles in this triangle? Could you get a larger sum? Triangle sum : 180º 360º Can be greater than 180º less than 540º
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Line segment arc unique Great circle straight finite one Point = point; Line = Great Circle; Plane = sphere
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Spherical Geometry http://goo.gl/xgPXr
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Spherical Geometry Lesson http://gc.kls2.com/ DFW-BKK (Bangkok) OPF-MNL (Miami-Philippines) LAX-MXP (LA – Milan) DFW-SIN (Singapore) LAX-JFK (LA-NY) LHR-SYD (London-Sydney)
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