my equation has 3 variables but i want to integrate with respect to only one variable ,so that i can optimize the ramaining two from the resulting equation

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bhanu kiran vandrangi il 27 Lug 2021

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Commentato: bhanu kiran vandrangi il 27 Lug 2021

my equation(looks big) is as follows , which has three variables (d,e,t) I want to integrate with t from 0 to 2000 (by keeping d,e constant ) so that i can optimize those two using any optimization method . i used int(err,0,2000) command but gettting no result .so how to get past this error?

the eqaution at its basic term is in form 1483/(k-1) , where K=function(d,e,t)

err =

1483/(200*(0.99966444607127868948737159371376*d - 99966.44460712373256683349609375*d*(0.0000000061953699799058132798891540549135*exp(-0.031830333683444479980079178105257*t) + 0.000010273947474151098879779908656928*exp(-9.1132612523704400742108333588476*t) - 0.00000028014284413259036773946597520535*exp(-0.21190841394611541767881157660725*t)) + 15567.003559999167919158935546875*e*(0.0000000061953699799058132798891540549135*exp(-0.031830333683444479980079178105257*t) + 0.000010273947474151098879779908656928*exp(-9.1132612523704400742108333588476*t) - 0.00000028014284413259036773946597520535*exp(-0.21190841394611541767881157660725*t)) + 919819.0186288356781005859375*d*(0.00000019463729288918805472585749072323*exp(-0.031830333683444479980079178105257*t) + 0.0000011273623338164517199144754044937*exp(-9.1132612523704400742108333588476*t) - 0.0000013219996267057210898032693080495*exp(-0.21190841394611541767881157660725*t)) - 143208.7303999960422515869140625*e*(0.00000019463729288918805472585749072323*exp(-0.031830333683444479980079178105257*t) + 0.0000011273623338164517199144754044937*exp(-9.1132612523704400742108333588476*t) - 0.0000013219996267057210898032693080495*exp(-0.21190841394611541767881157660725*t)) - 79516.5081846714019775390625*d*(0.0000061148367096900205219789370403305*exp(-0.031830333683444479980079178105257*t) + 0.00000012370569685174297169805157636802*exp(-9.1132612523704400742108333588476*t) - 0.0000062385424065411129723734973140381*exp(-0.21190841394611541767881157660725*t)) + 6144.9373500002548098564147949219*e*(0.0000061148367096900205219789370403305*exp(-0.031830333683444479980079178105257*t) + 0.00000012370569685174297169805157636802*exp(-9.1132612523704400742108333588476*t) - 0.0000062385424065411129723734973140381*exp(-0.21190841394611541767881157660725*t)) - 1))

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Answer 1

Alan Weiss il 27 Lug 2021

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Apri in MATLAB Online

This seems like a solution. Of course, I don't know what your real bounds are on d and e, so I just guessed.

Notice that I used ./ in the first line of the function myfun. That is because the integral function requires vectorized inputs.

lb = [1/2 1/2];
ub = [3/4 3/4];
[sol,fval,eflag,output] = fmincon(@minfn,[1/2 1/2],[],[],[],[],lb,ub)
Local minimum found that satisfies the constraints.

Optimization completed because the objective function is non-decreasing in 
feasible directions, to within the value of the optimality tolerance,
and constraints are satisfied to within the value of the constraint tolerance.
sol = 1×2
    0.7500    0.7500
fval = -5.8613e+04
eflag = 1
output = struct with fields:
         iterations: 4
          funcCount: 15
    constrviolation: 0
           stepsize: 2.2605e-04
          algorithm: 'interior-point'
      firstorderopt: 0.0757
       cgiterations: 0
            message: '↵Local minimum found that satisfies the constraints.↵↵Optimization completed because the objective function is non-decreasing in ↵feasible directions, to within the value of the optimality tolerance,↵and constraints are satisfied to within the value of the constraint tolerance.↵↵<stopping criteria details>↵↵Optimization completed: The relative first-order optimality measure, 3.264963e-07,↵is less than options.OptimalityTolerance = 1.000000e-06, and the relative maximum constraint↵violation, 0.000000e+00, is less than options.ConstraintTolerance = 1.000000e-06.↵↵'
       bestfeasible: [1×1 struct]
function minit = minfn(x)
d = x(1);
e = x(2);
minit = intval(d,e);
end
function r = intval(d,e)
r = integral(@(t)myfun(d,e,t),0,2000);
end
function val = myfun(d,e,t)
val = 1483./(200*(0.99966444607127868948737159371376*d - ...
    99966.44460712373256683349609375*d*(0.0000000061953699799058132798891540549135*exp(-0.031830333683444479980079178105257*t) +...
    0.000010273947474151098879779908656928*exp(-9.1132612523704400742108333588476*t) -...
    0.00000028014284413259036773946597520535*exp(-0.21190841394611541767881157660725*t)) + ...
    15567.003559999167919158935546875*e*(0.0000000061953699799058132798891540549135*exp(-0.031830333683444479980079178105257*t) +...
    0.000010273947474151098879779908656928*exp(-9.1132612523704400742108333588476*t) -...
    0.00000028014284413259036773946597520535*exp(-0.21190841394611541767881157660725*t)) +...
    919819.0186288356781005859375*d*(0.00000019463729288918805472585749072323*exp(-0.031830333683444479980079178105257*t) +...
    0.0000011273623338164517199144754044937*exp(-9.1132612523704400742108333588476*t) -...
    0.0000013219996267057210898032693080495*exp(-0.21190841394611541767881157660725*t)) -...
    143208.7303999960422515869140625*e*(0.00000019463729288918805472585749072323*exp(-0.031830333683444479980079178105257*t) +...
    0.0000011273623338164517199144754044937*exp(-9.1132612523704400742108333588476*t) -...
    0.0000013219996267057210898032693080495*exp(-0.21190841394611541767881157660725*t)) -...
    79516.5081846714019775390625*d*(0.0000061148367096900205219789370403305*exp(-0.031830333683444479980079178105257*t) +...
    0.00000012370569685174297169805157636802*exp(-9.1132612523704400742108333588476*t) -...
    0.0000062385424065411129723734973140381*exp(-0.21190841394611541767881157660725*t)) +...
    6144.9373500002548098564147949219*e*(0.0000061148367096900205219789370403305*exp(-0.031830333683444479980079178105257*t) +...
    0.00000012370569685174297169805157636802*exp(-9.1132612523704400742108333588476*t) -...
    0.0000062385424065411129723734973140381*exp(-0.21190841394611541767881157660725*t)) - 1));
end