This is the equation of a straight line passing through the origin with slope 3. This gives y / x = 3, y / x = 3, which can be rewritten as y = x 3. Since tan θ = y / x tan θ = y / x we can replace the left-hand side of this equation by y / x. The function may be periodic, for example, which indicates that only a limited number of values for the independent variable are needed. Finally, connect the points, and take advantage of any patterns that may appear. This process generates a list of ordered pairs, which can be plotted in the polar coordinate system. Start with a list of values for the independent variable ( θ ( θ in this case) and calculate the corresponding values of the dependent variable r. The general idea behind graphing a function in polar coordinates is the same as graphing a function in rectangular coordinates. In a similar fashion, we can graph a curve that is generated by a function r = f ( θ ). In the rectangular coordinate system, we can graph a function y = f ( x ) y = f ( x ) and create a curve in the Cartesian plane. Now that we know how to plot points in the polar coordinate system, we can discuss how to plot curves.
![graphing polar coordinates worksheet pdf graphing polar coordinates worksheet pdf](https://i.pinimg.com/originals/9d/59/24/9d59246d8b1e073061587495152988f6.jpg)
In the polar coordinate system, each point also has two values associated with it: r r and θ. Note that every point in the Cartesian plane has two values (hence the term ordered pair) associated with it. This correspondence is the basis of the polar coordinate system. This observation suggests a natural correspondence between the coordinate pair ( x, y ) ( x, y ) and the values r r and θ.
![graphing polar coordinates worksheet pdf graphing polar coordinates worksheet pdf](https://i.pinimg.com/originals/31/df/42/31df42aaffb0baa94b5459b0500e5da2.jpg)
The angle between the positive x x-axis and the line segment has measure θ. The line segment connecting the origin to the point P P measures the distance from the origin to P P and has length r. The point P P has Cartesian coordinates ( x, y ). To find the coordinates of a point in the polar coordinate system, consider Figure 7.27.
![graphing polar coordinates worksheet pdf graphing polar coordinates worksheet pdf](https://i.pinimg.com/originals/e3/ad/45/e3ad45bd515b9e896bfa4853400cebea.jpg)
In this section we see that in some circumstances, polar coordinates can be more useful than rectangular coordinates. The polar coordinate system provides an alternative method of mapping points to ordered pairs. This is called a one-to-one mapping from points in the plane to ordered pairs. The rectangular coordinate system (or Cartesian plane) provides a means of mapping points to ordered pairs and ordered pairs to points. 7.3.5 Identify symmetry in polar curves and equations.7.3.4 Convert equations between rectangular and polar coordinates.7.3.3 Sketch polar curves from given equations.7.3.2 Convert points between rectangular and polar coordinates.7.3.1 Locate points in a plane by using polar coordinates.