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how to do definite integration when the integrand has a constant term
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How to find the value of this integral in matlab ? q should remain as it is in the final answer as I is a function of q
sigma= 1/(1.5e-12)
L=6.4747e3
k=2*pi*1.8331/(390e-12)
D=2.3167e-4
omega sholud me from 379.62 to 389.62
11 Comments
Akriti Raj
on 22 Jul 2021
Yes, can you please write the matlab code. I am new to matlab and I have been struggling with this problem since long.
Walter Roberson
on 22 Jul 2021
I think I need a higher resolution image of the equation.
Also please confirm that I is a function of the derivative of q as it appears to say I(q') =
Walter Roberson
on 22 Jul 2021
Edited: Walter Roberson
on 22 Jul 2021
format long g
Q = @(v) sym(v); %convert to rational
Pi = Q(pi);
sigma = 1/(Q(1.5)*10^-12)
sigma =
L = Q(64747)/10
L =
k = 2 * Pi* Q(18331)/10^4/(Q(390)*10^-12)
k =
D = Q(23167)*10^-8
D =
omega_min = Q(37962)/100
omega_min =
omega_max = Q(38962)/100
omega_max =
syms q
syms omega
inner = exp((omega/sigma)^2/2) * sinc(L*q^2/k + D*omega*L/2).^2
inner =
I = 1/(sigma * sqrt(2*Pi)) * int(inner, omega, omega_min, omega_max)
I =
simplify(I)
ans =
inner_approx = taylor(inner, omega, (omega_min+omega_max)/2, 'order', 4)
inner_approx =
I_approx = 1/(sigma * sqrt(2*Pi)) * int(inner_approx, omega, omega_min, omega_max)
I_approx =
simplify(I_approx)
ans =
fplot(I, [-5 5]); title('exact')
double(subs(I,q,[-5 -1 0 1 5]))
ans = 1×5
3.49318454188821e-18 3.49318582811878e-18 3.4931858817153e-18 3.49318582811878e-18 3.49318454188821e-18
vpa(subs(I,q,[-5 -1 0 1 5]*10^9))
ans =
fplot(I_approx, [-5 5]); title('approximated')
double(subs(I_approx,q,[-5 -1 0 1 5]))
ans = 1×5
-3.2139136293569e-16 -3.21388912778066e-16 -3.21388810680452e-16 -3.21388912778066e-16 -3.2139136293569e-16
vpa(subs(I_approx,q,[-5 -1 0 1 5]*10^9))
ans =
Walter Roberson
on 22 Jul 2021
Notice that up in the 10^9 area, that the integral could not be calculated with the default integration options.
Note that the taylor approximation is probably pretty wrong by the time of 10^9
What is the expected range of q ?
David Goodmanson
on 22 Jul 2021
Hi Akriti,
since you refer to this as a definite integral, what are the limits of integration?
Answers (0)
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