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Download Caroline Smith MAE 301 - Class Notes for Wednesday 12/8/10 The
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Caroline Smith MAE 301 - Class Notes for Wednesday 12/8/10 The final exam will potentially include the following topics: Probability /combinatory (1 or 2 questions) Isometry / translations / reflections / rotations (as they relate to high school math) Equivalence relations Extending a definition to another field Complex numbers (relating math to teaching) Rational functions / rational numbers Distinguish between number sets as related to groups / fields / rings Trig functions / inverse trig functions Injective / surjective functions (in relation to high school math) From the homework: For Y=1/X, rotate the graph through -/4 and write the equation of the resulting graph. Y=1/X X² - Y² = 2 Note that the new graph is not a function of x. Its equation is f(x) = y = (x²-2) This can also be written as the general form of this hyperbola x² - y² = 2 Conics: Conic sections include Hyperbola Parabola Circle Ellipse Why are these called conic sections? Because they are slicing a cone in two sections. We defined a degenerate conic as the intersection of two lines or a point. Algebraically, to be a conic, an equation must be a two degree polynomial. There are two variables in this polynomial, (x,y) of degree two. With two variables in degree two there are potentially six terms. ax²+by²+cxy+dx+ey+f Define: Ellispe - the set of points such that the sum of the distances from any point to each of the two fixed points (foci) is a constant. Circle - set of points equidistant from the center fixed point. Hyperbola - the difference of the distances from any point to each of the fixed points (foci) is constant. High School Standard equations: Circle: (x-a)² + (y-b)² = r² or x² + y² = r² Hyperbola: x² - y² = 2 or (x/2)² - (y/2)² = 1 Ellipse: (x/a)² + (y/b)² = 1 Questions: 1. Given the equation (x/a)² + (y/b)² = 1, can you find the foci? H=(b² + x²) (x + a) + (a - x) 2(b² + x²) = 2a b² + x² = a² x² = a² - b² 2. Given a diagram of a conic section, can you derive the equation? Use arbitrary point (x,y) to see if you can get to (x/a)² + (y/b)² = 1 using the pythagorean theorem.
