Finding the intersection points between two curves

Question

raha ahmadi 2021 年 7 月 30 日

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https://jp.mathworks.com/matlabcentral/answers/889367-finding-the-intersection-points-between-two-curves

コメント済み: Star Strider 2021 年 8 月 7 日

採用された回答: Star Strider

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I need to find the intersection points of this equation:

this is my code. I dont know what is the best way . Also when I plot in terms of

I have some periods but when I plot in terms of β I have only one period. How I can plot it in terms of beta but with nulti perids?

many thanks in advance

h=20;

K=13.6;

l=1148e-6;

g1=fplot(@(beta)tan(beta*l));

hold on

g2=fplot(@(beta)2*h*beta*K/(K^2*beta^2-h^2));

Warning: Function behaves unexpectedly on array inputs. To improve performance, properly vectorize your function to return an output with the same size and shape as the input arguments.

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Answer 1

Star Strider 2021 年 7 月 30 日

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この回答への直接リンク

https://jp.mathworks.com/matlabcentral/answers/889367-finding-the-intersection-points-between-two-curves#answer_757592

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Several options —

h=20;

K=13.6;

l=1148e-6;

f1 = @(beta)tan(beta*l);

f2 = @(beta)2*h*beta*K./(K^2*beta.^2-h^2);

figure

g1 = fplot(f1);

hold on

g2 = fplot(f2);

g3 = fplot(@(beta) f2(beta)-f1(beta), '--'); % Use 'fsolve' On 'g3' To Find The Intersections

Another option:

format long
Xint = interp1(g3.YData, g3.XData, 0)
Xint = 
     0

.

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Star Strider 2021 年 7 月 30 日

MATLAB Online で開く

There do not appear to be any other intersections —

h=20;

K=13.6;

l=1148e-6;

f1 = @(beta)tan(beta*l);

f2 = @(beta)2*h*beta*K./(K^2*beta.^2-h^2);

figure

g1 = fplot(f1);

hold on

g2 = fplot(f2);

g3 = fplot(@(beta) f2(beta)-f1(beta), [-50 50], '--'); % Use 'fsolve' On 'g3' To Find The Intersections

grid

format long

Xint = interp1(g3.YData, g3.XData, 0)

Xint =

0

If there sere other intersections, the easiest way to find them would be:

zxi = find(diff(sign(g3.YData)))
zxi = 1×4
    99   170   171   242

And to my surprise, it seems that there are more roots!

So to get more precise results:

for k = 1:numel(zxi)
    idxrng = (-1:1)+zxi(k);                                         % Index Range For Interpolation
    rootval(k) = interp1(g3.YData(idxrng), g3.XData(idxrng), 0);
end
rootval 
rootval = 1×4
  -1.472819271901502                   0                   0   1.464295806398758

The slope of ‘g1’ prevents the roots from being symmetrical about the origin.

.

Star Strider 2021 年 7 月 31 日

MATLAB Online で開く

My pleasure!

If you want to calculate those roots —

h=20;

K=13.6;

l=1148e-6;

g1=fplot(@(betaL)tan(betaL));

hold on

g2=fplot(@(betaL)2*h.*betaL/l*K./(h^2-K^2.*betaL/l.^2));

hold on

f3 = @(betaL) (tan(betaL)) - (2*h.*betaL/l*K./(h^2-K^2.*betaL/l.^2));

g3 = fplot(f3, [-1 1]*20, ':');

zxi = find(diff(sign(g3.YData)));

for k = 1:numel(zxi)

idxrng = (-1:1)+zxi(k); % Index Range For Interpolation

xv(k,:) = interp1(g3.YData(idxrng), g3.XData(idxrng), 0);

yv(k,:) = interp1(g3.XData, g3.YData, xv(k));

end

plot(xv(abs(yv)<1), zeros(size(xv(abs(yv)<1))), 'xr')

hold off

Intersections = table(xv(abs(yv)<1),yv(abs(yv)<1), 'VariableNames',{'x','y'})

Intersections = 14×2 table

x y _______ ___________ -18.853 3.747e-16 -15.711 -1.4554e-15 -12.569 9.7145e-17 -9.428 2.498e-16 -6.2861 6.5919e-17 -3.1452 7.4593e-17 0 0 0 0 3.1386 -1.8735e-16 6.2802 3.1225e-16 9.4214 -9.1593e-16 12.563 -9.5063e-16 15.704 -5.1348e-16 18.846 -8.3267e-16

.

Star Strider 2021 年 8 月 7 日

MATLAB Online で開く

There is nothing to fix.

Look at the results:

x=[-1000,1000]
x = 1×2
       -1000        1000
y=sin (x)
y = 1×2
   -0.8269    0.8269
roots(y)
ans = 1

so, plotting ‘y’ using polyval:

xv = linspace(-10,10);

pv = polyval(y, xv);

figure

plot(xv, pv)

grid

The reason is readily apparent! The ‘y’ vector corresponds to:

This is a linear relationship with one zero-crossing (root) at

.

However,

x = -1000:1000;
y = sin (x);
roots(y)
ans = 
   1.1126 + 0.0000i
  -0.7096 + 0.7046i
  -0.7096 - 0.7046i
  -0.7074 + 0.7068i
  -0.7074 - 0.7068i
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  -0.1602 - 0.9871i
   0.1587 + 0.9873i
   0.1587 - 0.9873i
  -0.9867 + 0.1626i
  -0.9867 - 0.1626i
  -0.9872 + 0.1595i
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  -0.9877 + 0.1564i
  -0.9877 - 0.1564i
   0.1556 + 0.9878i
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  -0.1571 + 0.9876i
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   0.1525 + 0.9883i
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  -0.9882 + 0.1533i
  -0.9882 - 0.1533i
  -0.1540 + 0.9881i
  -0.1540 - 0.9881i
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  -0.1509 + 0.9886i
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  -0.1478 + 0.9890i
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   0.1463 + 0.9892i
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  -0.1447 - 0.9895i
  -0.9887 + 0.1502i
  -0.9887 - 0.1502i
   0.9995 + 0.0317i
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   0.9993 + 0.0380i
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  -0.1416 + 0.9899i
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  -0.9891 + 0.1470i
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   0.9976 + 0.0696i
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   0.1339 + 0.9910i
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  -0.9896 + 0.1439i
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  -0.9900 + 0.1408i
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  -0.1322 + 0.9912i
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   0.1277 + 0.9918i
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  -0.9905 + 0.1377i
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  -0.1291 + 0.9916i
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   0.1152 - 0.9933i
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  -0.1167 - 0.9932i
  -0.1135 + 0.9935i
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   0.9994 + 0.0348i
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   0.1090 + 0.9940i
   0.1090 - 0.9940i
   0.1058 + 0.9944i
   0.1058 - 0.9944i
  -0.1104 + 0.9939i
  -0.1104 - 0.9939i
   0.1027 + 0.9947i
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  -0.9921 + 0.1253i
  -0.9921 - 0.1253i
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  -0.9929 + 0.1190i
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  -0.9933 + 0.1159i
  -0.9933 - 0.1159i
  -0.0979 + 0.9952i
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  -0.9936 + 0.1128i
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  -0.9998 + 0.0188i
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  -0.9998 + 0.0220i
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   0.0683 + 0.9977i
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  -0.0698 + 0.9976i
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  -0.0666 + 0.9978i
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   0.0464 + 0.9989i
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   0.0432 + 0.9991i
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   0.0558 + 0.9984i
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  -0.0604 + 0.9982i
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  -0.0541 + 0.9985i
  -0.0541 - 0.9985i
  -0.0572 + 0.9984i
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  -0.0510 + 0.9987i
  -0.0510 - 0.9987i
  -0.0478 + 0.9989i
  -0.0478 - 0.9989i
  -0.0415 + 0.9991i
  -0.0415 - 0.9991i
  -0.0447 + 0.9990i
  -0.0447 - 0.9990i
   0.0369 + 0.9993i
   0.0369 - 0.9993i
  -0.0384 + 0.9993i
  -0.0384 - 0.9993i
   0.0338 + 0.9994i
   0.0338 - 0.9994i
  -0.0353 + 0.9994i
  -0.0353 - 0.9994i
  -0.0259 + 0.9997i
  -0.0259 - 0.9997i
  -0.0290 + 0.9996i
  -0.0290 - 0.9996i
  -0.0227 + 0.9997i
  -0.0227 - 0.9997i
  -0.0321 + 0.9995i
  -0.0321 - 0.9995i
   0.0307 + 0.9995i
   0.0307 - 0.9995i
   0.0212 + 0.9998i
   0.0212 - 0.9998i
   0.0181 + 0.9998i
   0.0181 - 0.9998i
   0.0244 + 0.9997i
   0.0244 - 0.9997i
   0.0150 + 0.9999i
   0.0150 - 0.9999i
   0.0024 + 1.0000i
   0.0024 - 1.0000i
  -0.0007 + 1.0000i
  -0.0007 - 1.0000i
  -0.0196 + 0.9998i
  -0.0196 - 0.9998i
   0.0275 + 0.9996i
   0.0275 - 0.9996i
   0.0087 + 1.0000i
   0.0087 - 1.0000i
   0.0055 + 1.0000i
   0.0055 - 1.0000i
  -0.0102 + 0.9999i
  -0.0102 - 0.9999i
  -0.0039 + 1.0000i
  -0.0039 - 1.0000i
  -0.0070 + 1.0000i
  -0.0070 - 1.0000i
  -0.0133 + 0.9999i
  -0.0133 - 0.9999i
  -0.0164 + 0.9999i
  -0.0164 - 0.9999i
   0.0118 + 0.9999i
   0.0118 - 0.9999i
   0.8988 + 0.0000i

Except for the first element (1.1126), the absolute values of all the others are uniformly 1.

This time, ‘y’ corresponds to:

syms x

yp = vpa(poly2sym(y,x),5)

yp =

figure

fplot(yp, [-1000, 1000])

grid

axis([-pi pi -5 5])

The vertical dashed lines indicate singularities

.

The sin function has an infiinty of roots, those being

radians, where n is an integer. It is necessary to use a zero-finding algorithm (such as fzero or fsolve) or interpolation (interp1) to locate them, not the roots function.

.

raha ahmadi 2021 年 8 月 7 日

your answer is perfect. I m really appresiate.

hope you all the best

Star Strider 2021 年 8 月 7 日

Thank you!

As always, my pleasure!

.

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Answer 2

darova 2021 年 7 月 30 日

1
リンク

この回答への直接リンク

https://jp.mathworks.com/matlabcentral/answers/889367-finding-the-intersection-points-between-two-curves#answer_757557

MATLAB Online で開く

I'd try fsolve for solving

Read help carefully:

fplot(f,[0 10])

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raha ahmadi 2021 年 7 月 30 日

編集済み: raha ahmadi 2021 年 7 月 30 日

Dear darova

Thank you for your help, I read fsolve but I think it solves a system of nonlinear equations. I used fzero instead but I only got one answer I need solve it in some periods and get more roots

Best regards

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Finding the intersection points between two curves

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Finding the intersection points between two curves

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