Fitting a straight line to a set of 3-D points

12 views (last 30 days)
P_L
P_L on 18 Apr 2019
Edited: Torsten on 18 Apr 2019
Hi there,
please can someone help me fit a straight line to my data? It's in 3-D I have done it in 2-D before but have no idea about 3-D
This is my code:
Many many thanks
lat_3d= [30.3894980000000;30.3824250000000;30.3886690000000;30.3878380000000;30.3953250000000;30.3874200000000;30.3807640000000;30.3924160000000;30.3874200000000;30.3811820000000;30.3919950000000;30.3928260000000;30.3903320000000;30.3836720000000;30.3774440000000];%new_3d_model_results(:,2);
lon_3d= [40.7508620000000;40.7486390000000;40.7489620000000;40.7476950000000;40.7515010000000;40.7486440000000;40.7461050000000;40.7486490000000;40.7486440000000;40.7451550000000;40.7514980000000;40.7521320000000;40.7502300000000;40.7495900000000;40.7410360000000];%new_3d_model_results(:,1);
depth_3d=[10.0097660000000;8.04296900000000;8.97460900000000;7.98085900000000;9.51289100000000;8.04296900000000;10.1132810000000;10.0304690000000;7.96015600000000;7.98085900000000;9.47148400000000;7.77382800000000;8.76757800000000;9.34726600000000;7.79453100000000]; %new_3d_model_results(:,3);
%% plot 3d
scale = 111; % km/deg
figure
%plot
% h=[30.3 30.45 40.7 40.8];
% lat_lon_proportions(h) % refernced at top of script
% plot events
hold on
p10=plot3(lat_3d,lon_3d,depth_3d/scale,'o','MarkerFaceColor',light_p,'MarkerEdgeColor', 'k','MarkerSize',12); %QPS changed/ Initial Velocity Model
hold on
grid on
%axis equal
ax = gca;
ax.ZDir = 'reverse';
zVal = str2double(ax.ZTickLabel)*scale;
ax.ZTickLabel = num2str(zVal);
xlabel('Longitude (deg, E)');
ylabel('Latitude (deg, N)')
zlabel('Depth (km)')
zval = [2:2:20]';
ax.ZTick = zval/scale;
ax.ZTickLabel = num2str(zval);
hold on
set(gca,'FontName','Helvetica','FontSize',20);
hold on
xlim([30.3 30.45])
ylim([40.7 40.8])
hold on
axis([30.3 30.45 40.7 40.8]);
view(-37.5, 4)

Sign in to answer this question.

Answers (1)

Torsten
Torsten on 18 Apr 2019
What I would do is find the average P¯of your points and an eigenvector V of the covariance matrix for its largest eigenvalue. The line can then be represented as P ¯ +t*V .

Categories

Find more on Get Started with Curve Fitting Toolbox in Help Center and File Exchange

Tags

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!