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Published byChristopher Todd Modified over 9 years ago
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10.3 Polar Coordinates
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One way to give someone directions is to tell them to go three blocks East and five blocks South. Another way to give directions is to point and say “Go a half mile in that direction.” Polar graphing is like the second method of giving directions. Each point is determined by a distance and an angle. Initial ray A polar coordinate pair determines the location of a point. r – the directed distance from the origin to a point Ө – the directed angle from the initial ray (x-axis) to ray OP.
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(Circle centered at the origin) (Line through the origin) Some curves are easier to describe with polar coordinates: (Ex.: r = 2 is a circle of radius 2 centered around the origin) (Ex. Ө = π /3 is a line 60 degrees above the x-axis extending in both directions)
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More than one coordinate pair can refer to the same point. All of the polar coordinates of this point are: Each point can be coordinatized by an infinite number of polar ordered pairs.
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Tests for Symmetry: x-axis: If (r, ) is on the graph,so is (r, - ).
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Tests for Symmetry: y-axis: If (r, ) is on the graph,so is (r, - )or (-r, - ).
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Tests for Symmetry: origin: If (r, ) is on the graph,so is (-r, )or (r, + ).
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Tests for Symmetry: If a graph has two symmetries, then it has all three:
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Try graphing this. (Pol mode)
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Remember from trig, in polar coordinates, x = r cos Θ y = r sinΘ
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To find the slope of a polar curve: We use the product rule here. A lot like parametric slope.
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Example:
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The length of an arc (in a circle) is given by r. when is given in radians. Area Inside a Polar Graph: For a very small , the curve could be approximated by a straight line and the area could be found using the triangle formula:
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We can use this to find the area inside a polar graph.
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Example: Find the area enclosed by: This graph is called a lima ƈon.
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Notes: To find the area between curves, subtract: Just like finding the areas between Cartesian curves, establish limits of integration where the curves cross.
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When finding area, negative values of r cancel out: Area of one leaf times 4:Area of four leaves:
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To find the length of a curve: Remember: Again, for polar graphs: If we find derivatives and plug them into the formula, we (eventually) get: So:
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There is also a surface area equation similar to the others we are already familiar with: When rotated about the x-axis:
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