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L ESSON 35 – I NTERSECTION OF 3 P LANES September 17, 2013 Fernando Morales.

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Presentation on theme: "L ESSON 35 – I NTERSECTION OF 3 P LANES September 17, 2013 Fernando Morales."— Presentation transcript:

1 L ESSON 35 – I NTERSECTION OF 3 P LANES September 17, 2013 Fernando Morales

2 L EARNING G OALS Recognize geometrically intersection three planes Solve for the point and/or line of intersection of three planes Able to use the iPad app to verify solutions

3 C ASES WITH O NE OR M ORE P OINTS OF I NTERSECTION OF 3 P LANES There is just one solution to the corresponding system of equations. This is a single point. The coordinates of the point of intersection will satisfy each of the three equations.

4 C ASES WITH O NE OR M ORE P OINTS OF I NTERSECTION OF 3 P LANES There are an infinite number of solutions to the related system of equations. Geometrically, this corresponds to a lie, and the solution is given in terms of one parameter. The tree planes intersect along a lie and are mutually non-coincident.

5 C ASES WITH O NE OR M ORE P OINTS OF I NTERSECTION OF 3 P LANES There are an infinite number of solutions to the related system of equations. Geometrically, this corresponds to a lie, and the solution is given in terms of one parameter. The two planes are coincident, and the third plane cuts through these two planes intersecting along a line.

6 C ASES WITH O NE OR M ORE P OINTS OF I NTERSECTION OF 3 P LANES Three planes are coincident, and there are an infinite number of solutions to the related system of equations. The number of solutions corresponds to the infinite number of points on a plane and the solution is given in terms of two parameters. In this case, there are three coincident planes that have identical equations or can be reduced to three equivalent equations.

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13 C ASES WITH N O P OINTS OF I NTERSECTIONS OF 3 P LANES Three planes form a triangular prism as shown. This means that, if you consider any two of the three planes, they intersect in a line and each of these three lines is parallel to the others.

14 C ASES WITH N O P OINTS OF I NTERSECTIONS OF 3 P LANES Each of the parallel planes has a line of intersection with the third plane, But there is no intersection between all three planes.

15 C ASES WITH N O P OINTS OF I NTERSECTIONS OF 3 P LANES All three planes do not have any points of intersection.

16 C ASES WITH N O P OINTS OF I NTERSECTIONS OF 3 P LANES All three planes do not have any points of intersection.

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23 R EQUIRED B EFORE N EXT C LASS Chapter 8 Review # 1, 2, 3, 4, 10, 11, 12, 13, 14, 17, 18, 19, 20, 21, 22, 23 Chapter 8 Practice Test # 1-14, 16, 17, 21, 22, 23

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