@AndrasDeak the government required all businesses to make a "protection plan" on how they intend to protect their workers and clients to be allowed to reopenn. there is an union of consulting centers for sex workers who proposed this:)
(they also proposed to air out the rooms for 15 minutes after every client as well as chaning the sheets)
but appently it is quite safe as the clients rarely stay for more than 10-15 minutes
It is at least less visible than in the Netherlands, where De Wallen in Amsterdam are of course the most famous example, but most bigger cities have one or more streets with "windows". Haven't seen, or heard, from those here yet
I'm breaking my head over a geometry problem. I got the following text: "Expressed in polar coordinates, assuming a cylindrical symmetry along the X' axis, the equation is r=L/(1+epsilon cos(theta)) where the polar coordinates (r,theta) are measured about the focus which is located at (X0,0,0), L,epsilon are constants"
The provide a plot along with it, and indeed for L=2,epsilon=1 and X0 = 0.6 the graph starts at 1.6 for theta=0.
However, plotting literally that equation in MATLAB doesn't start there. I presume that is because this is somehow in polar coordinates, whereas I want it in cartesian. Doing pol2cart doesn't help anything either, that distorts shape even more:
X0 = 0.64; % Locus in Martian radii
epsilon = 1.03;
L = 2.04; % Martan radii
theta_r = (0:0.01:90).';
r = L./(1+epsilon.*cosd(theta_r));
plot(r,theta_r)
[xx,yy] = pol2cart(theta_r,r);
xx = xx+X0;
figure;
plot(xx,yy)
Vignes, D., Mazelle, C., Rme, H., Acu ̃na, M., Connerney, J., Lin, R., Mitchell, D., Cloutier, P.,Crider, D., and Ness, N. (2000). The solar wind interaction with Mars: Locations and shapes of thebow shock and the magnetic pile-up boundary from the observations of the MAG/ER Experimentonboard Mars Global Surveyor.Geophysical Research Letters, 27(1):49–52.
It should be equal to the solid line (the dashed line is defined slightly different).
Note on the coordinate system: they're using Mars-Sun-Orbital (MSO) coordinates; X always points from Mars to the Sun, Y to the negative of the velocity in the orbital plane.
Or the first, but then I somehow need to get from the (r,theta) to (X,sqrt(y^2+z^2))
If you increase theta to run unto 150, the radius already looks a lot better, i.e. goes up to 6. However, it still goes in the wrong direction; it starts at 1 and goes until +7, whereas it should start at 1.64 and go to negative 6
So I guess I'm looking for a way to understand what that article means with this equation being around a "focus" on X0, and how to incorporate that X- into my equation
r = 2+X0 - L./(1+epsilon.*cosd(theta_r));
That does it, as in: produces a similar plot (be it steeper in the beginning), but especially the +2 makes me itch
I think they somehow define the angle theta as being counter clockwise from X=X0, and then don't plot r-vs-theta in their paper, but X vs Y (or sqrt(y^2+z^2, but that's just the symmetry in the third axis). The thing I will now go hunt for is how to obtain Y from an angle theta around X0 I guess