How do you convert $X + Y = 0$ $X + Y = 0$ to polar form?

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How do you convert $X + Y = 0$ $X + Y = 0$ to polar form?

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Answer 1 · 2016-04-20T06:14:48

$r = 0, θ = 3 \frac{π}{4} and θ = 7 \frac{π}{4}$ $r=0, theta=3pi/4 and theta=7pi/4$

Explanation:

$X = r cos θ and Y = r sin θ$ $X=r cos theta and Y = r sin theta$ .
So, X + Y = 0 becomes $r (cos θ + sin θ) = 0$ $r(cos theta + sin theta) = 0$ .

The solutions are $r = 0 and cos θ + sin θ = 0$ $r = 0 and cos theta + sin theta = 0$ ..

$S o, tan θ = - 1$ $So, tan theta = -1$ . This gives two solutions in $[0, π]$ $[0, pi]$ , as given in the answer.

Some niceties:

Note that, in polar coordinates, r = 0 gives the pole but $θ$ $theta$ = constant gives the half line from the pole in that direction, sans pole Pole is a point of discontinuity..
I think that I have given justification for giving three polar equations for the whole line represented by X + Y = 0, in rectangular coordinates.

I consider pole r = 0 as only the limit of r, upon reaching the end called pole (origin), along any radial line $θ$ $theta$ = constant. ..

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How do you convert $X + Y = 0$ $X + Y = 0$ to polar form?

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How do you convert X + Y = 0X+Y=0 X + Y = 0 to polar form?

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Explanation:

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How do you convert $X + Y = 0$ $X + Y = 0$ to polar form?