Sketching a tangent plane to the given equation
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Keni Fernando
am 14 Apr. 2021
Kommentiert: Keni Fernando
am 17 Apr. 2021
How to plot a tangent plane to a given equation with a range.
Example question is as follows,
z=sqrt(5-x^2-y^2) in the regions [-sqrt(5/2)<=x<=sqrt(5/2)], [-sqrt(5/2)<=y<=sqrt(5/2)]
and sketch the tangent plane to Z at point [sqrt(5)/2,sqrt(5)/2,sqrt(5/2)].
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Khalid Mahmood
am 14 Apr. 2021
Lim=sqrt(5/2); inc=2*Lim/99; %100 incremets
[X,Y] = meshgrid(-Lim:inc:Lim);
ZFunc= @(x,y) real(sqrt(5-x.*x-y.*y));
Z=ZFunc(X,Y);
[fx,fy] = gradient(Z,inc); %gradient approximates derivative of Z=f(x,y) with same finite length as inc
x0 = Lim;
y0 = Lim;
comp = (X == x0) & (Y == y0);
indt = find(comp);
fx0 = fx(indt);
fy0 = fy(indt);
z0=x0;
Z_tanSurf = @(x,y) ZFunc(x0,y0) + fx0*(x-x0) + fy0*(y-y0); %tangent plane function
Zt=Z_tanSurf(X,Y);
subplot(2,2,1);surf(X,Y,Z,'EdgeAlpha',0.7,'FaceAlpha',0.9)
title('given 3D surface')
%hold on
subplot(2,2,2);surf(X,Y,Zt); title('Tagent Plane');
subplot(2,2,3);plot3(x0,y0,z0,'r*'); title('Required point');
subplot(2,2,4);surf(X,Y,Z,'EdgeAlpha',0.7,'FaceAlpha',0.9); title(['3d plot, tagent Plane to plot at given point' mat2str([x0,y0,z0])]);
hold on;surf(X,Y,Zt);plot3(x0,y0,ZFunc(x0,y0),'r*')
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