Let us learn about polar graphs
Polar Graph, Rules of Symmetry
- If in the polar equation, (r, θ) can be substituted by (r, - θ) or (- r, π - θ) , then graph is symmetric with respect to polar axis.
- If polar equation, (r, θ) is substituted by (- r, θ) or (r, π + θ) , the graph is symmetric with respect to the pole or origin.
- If polar equation, (r, θ) can be substituted by (r, π - θ) or (- r, - θ) , the graph is symmetric with respect to the line θ = π/2.
In mathematics, the polar equations can be plotted over a graph. These polar graphs are formed by the intersection of points of the geometry conics. These consist of some smooth edge values. The polar equations consist of a inflection point. In polar graph calculator article, guides you to plot graphs for the polar equations.
In our next blog we shall learn about "deductive reasoning examples"
I hope the above explanation was useful.Keep reading and leave your comments.
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