How do I multiply two functions handles?
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Tlotlo Oepeng
am 14 Jun. 2022
Kommentiert: Star Strider
am 14 Jun. 2022
%%---------constants:
Gma_32 = 100
Gma = 210e-15
gamma_u = 500
gamma_c = 50
a = Gma_32/sqrt(2*gamma_u*Gma)
n = 4e10
c1 = -4
c2 = 2.05
c3 = 1
K = 10
%--------Function
%
% X = @(k) -4*n - a^2*n*sqrt(n) + 4*c1*k.^4 + (2*a*sqrt(n)-16*K^2 + 4*a*c1*c3*sqrt(n) + 8*n*c1*c2)*k.^2
% Sq = @(k) sqrt((-X(k) + sqrt(X(k).^2 + Y^2 ))/2)
% f = @(k) -2*k.^2 - 2*n - a*sqrt(n) + Sq(k)
% f2 = @(k) -2*k.^2 - 2*n - a*sqrt(n) - Sq(k)
%------------------------------Fns:
b_i = @(k) -4*c1*k*K
b_r = @(k) 2*k.^2 +2*n + a*sqrt(n)
c_i = @(k) ( 4*n*c2* - 2*(2*n + a*sqrt(n))*c1 + 2*a*sqrt(n)*c3 )*K*k
c_r = @(k) -(1 + c1^2)*k.^4 - (2*n -4*(1 + c1^2)*K^2 + sqrt(n)*c3*c1 + 2*n*c1*c2 )*k.^2
D_r = @(k) b_r(k).^2 - b_i(k).^2 -4*c_r(k)
D_i = @(k) 2*b_i(k).*b_r(k) - 4*c_i
f = @(k) -b_i(k) + sqrt( -D_r(k) + sqrt(D_i(k)^2 + D_r(k)^2))/4
%-------Grid:
k = -200:0.1:200
% %-------Plot
%
plot(k,f(k))
%plot(k,f2(k))
theres an error on line with function f, how do i multiply two functoin handles. or suggest a bwtter way of plotting this function.
1 Kommentar
Steven Lord
am 14 Jun. 2022
FYI for the future, when you're asking for help with code that throws an error message or issues a warning message please include the full and exact text of the error or warning message in your original question. This information may help readers determine the cause of the error and how to correct it more quickly. Thanks.
Akzeptierte Antwort
Star Strider
am 14 Jun. 2022
In the ‘D_i’ function, ‘c_i’ was originally missing its argument, and that threw the error.
Correcting that, and vectorising the exponentiations produces —
%%---------constants:
Gma_32 = 100;
Gma = 210e-15;
gamma_u = 500;
gamma_c = 50;
a = Gma_32/sqrt(2*gamma_u*Gma);
n = 4e10;
c1 = -4;
c2 = 2.05;
c3 = 1;
K = 10;
%--------Function
%
% X = @(k) -4*n - a^2*n*sqrt(n) + 4*c1*k.^4 + (2*a*sqrt(n)-16*K^2 + 4*a*c1*c3*sqrt(n) + 8*n*c1*c2)*k.^2
% Sq = @(k) sqrt((-X(k) + sqrt(X(k).^2 + Y^2 ))/2)
% f = @(k) -2*k.^2 - 2*n - a*sqrt(n) + Sq(k)
% f2 = @(k) -2*k.^2 - 2*n - a*sqrt(n) - Sq(k)
%------------------------------Fns:
b_i = @(k) -4*c1*k*K;
b_r = @(k) 2*k.^2 +2*n + a*sqrt(n);
c_i = @(k) ( 4*n*c2* - 2*(2*n + a*sqrt(n))*c1 + 2*a*sqrt(n)*c3 )*K*k;
c_r = @(k) -(1 + c1^2)*k.^4 - (2*n -4*(1 + c1^2)*K^2 + sqrt(n)*c3*c1 + 2*n*c1*c2 )*k.^2;
D_r = @(k) b_r(k).^2 - b_i(k).^2 -4*c_r(k);
D_i = @(k) 2*b_i(k).*b_r(k) - 4*c_i(k);
f = @(k) -b_i(k) + sqrt( -D_r(k) + sqrt(D_i(k).^2 + D_r(k).^2))/4;
%-------Grid:
k = -200:0.1:200;
% %-------Plot
%
plot(k,f(k))
%plot(k,f2(k))
.
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