What is the Cartesian form of $- 2 + r^{2} = - θ + sin (θ) cos (θ)$ $-2+r^2 = -theta+sin(theta)cos(theta)$ ?

Question

What is the Cartesian form of $- 2 + r^{2} = - θ + sin (θ) cos (θ)$ $-2+r^2 = -theta+sin(theta)cos(theta)$ ?

1 Answer

Impact of this question

1625 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2018-08-03T16:00:28

Just a nuance in the answer:
$- 2 + x^{2} + y^{2} = - (π + arctan (\frac{y}{x})) + \frac{x y}{x^{2} + y^{2}}$ $-2 +x^2+ y^2 = - (pi + arctan ( y/x)) +(xy)/( x^2 + y^2 )$ ,
when $θ \in Q_{3}, Q_{2}$ $theta in Q_3, Q_2$ .

Explanation:

$arctan (\frac{y}{x}) \in (- \frac{π}{2}, \frac{π}{2})$ $arctan(y/x) in ( -pi/2, pi/2 )$ , and so, constrained not to give

$θ \in Q_{2} and Q_{3}$ $theta in Q_2 and Q_3$ .

Examples:

If $θ = \frac{3}{4} π, arctan (\frac{y}{x}) = arctan (- 1) = - \frac{π}{4}$ $theta = 3/4pi, arctan( y/x) = arctan(-1) = - pi/4$

$and π + (- \frac{π}{4}) = \frac{3}{4} π$ $and pi + ( - pi/4 ) = 3/4pi$ .

If $θ = \frac{5}{4} π, arctan (\frac{y}{x}) = arctan (1) = \frac{π}{4}$ $theta = 5/4pi, arctan ( y/x ) = arctan ( 1 ) = pi/4$ ,

$and π + \frac{π}{4} = \frac{5}{4} π$ $and pi + pi/4 = 5/4pi$ .

I removed the arctan operator, for tan, and got the overall inverse

y/x = tan(2 -(x^2+y^2)+(xy)/(x^2+y^2)).

The graph is bewildering.

graph{y/x-tan(2 -(x^2+y^2)+(xy)/(x^2+y^2))=0}

Science

Math

Humanities

... and beyond

What is the Cartesian form of $- 2 + r^{2} = - θ + sin (θ) cos (θ)$ $-2+r^2 = -theta+sin(theta)cos(theta)$ ?

1 Answer

Explanation:

Related questions

Impact of this question

Science

Math

Humanities

... and beyond

What is the Cartesian form of -2+r^2 = -theta+sin(theta)cos(theta) −2+r2=−θ+sin(θ)cos(θ)-2+r^2 = -theta+sin(theta)cos(theta) ?

1 Answer

Explanation:

Related questions

Impact of this question

What is the Cartesian form of $- 2 + r^{2} = - θ + sin (θ) cos (θ)$ $-2+r^2 = -theta+sin(theta)cos(theta)$ ?