Question

How do you graph `r=4cos4theta`?

Answer 1

See the 4-petal rose, in the Socratic graph. I have used the Cartesian equation, instead.

Explanation:

The period for the graph is `(2pi)/4=pi/2`.

The size of each petal, in this 4-petal rose, is 4.

As `r = sqrt(x^2+y^2)=4 cos 4theta>=0, 4theta in Q_1 or Q_4`,

and so,

the span of `theta`, for 1-period-petal, is

span of `(Q_1 +Q_4)`/4 = `pi/4`= 1/2(period).

In the other half of a period `pi/2, r < 0`, and it is vacant.

Overall, for one round `theta in [0, 2pi]`.

the number of loops is `(2pi)/(period)= (2pi)/(pi/2)=4`

graph{1/4(x^2+y^2)^2.5-x^4+6x^2y^2-y^4=0 [-10, 10, -5, 5]}