How do you graph r=cos(2(theta))r=cos(2(θ))?

1 Answer
A. S. Adikesavan
Sep 10, 2016

See graph and details.

Explanation:

The period of cos 2thetacos2θ is piπ.

As r is a cosine function, the graph is symmetrical about the initial

line theta = 0θ=0.

As cos 2theta = 1 - 2sin^2 theta cos2θ=12sin2θ, It is also a sine function. So, it

is symmetrical about theta = pi/2θ=π2...

Understanding r as the modulus of the position vector from pole to

the point (r, theta)(r,θ) on r = cos 2theta >=0r=cos2θ0,

2theta in [-pi/2, pi/2].2θ[π2,π2]. and this is one period for cos 2thetacos2θ..

So, theta in [-pi/4, pi/4],θ[π4,π4],.

A short Table for making the graph in Q1:.

(r, theta): (1, 0) (sqrt3/2, pi/12) (1/sqrt2, pi/8) (1/2, pi/6) (0, pi/4)(r,θ):(1,0)(32,π12)(12,π8)(12,π6)(0,π4).

Using symmetry, the other three quarters are traced.

graph{(x^2 + y^2)^1.5 - x^2 + y^2=0[-2 2 -2 2]}

r^m = cos 2theta and r^m =sins 2theta, m = 1, 2, 3, 4, ... all

generate such bi-loops called lemniscate.

Combined graph for r^3 = sin 2theta and r^3 = cos 2theta:

graph{((x^2+y^2)^2.5-2xy)( (x^2+y^2)^2.5-x^2+y^2)=0[-2 2 -2 2]}

To 1.6 K Socratic viewers of this answer, here is another from

combinations in infinitude, using this and its rotation.

graph{((x^2+y^2)^2.5-2xy)( (x^2+y^2)^2.5-x^2+y^2)((x^2+y^2)^2.5-1.414xy-0.707(x^2-y^2))( (x^2+y^2)^2.5-0.702(x^2-y^2)+1.414xy)=0[-2 2 -2 2]}

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