I have tried another one. Again I 'm getting the notification that, 'Not enough input arguments'. Can you help me to solve.

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shunmugam hemalatha
shunmugam hemalatha on 31 May 2021
Commented: shunmugam hemalatha on 2 Jun 2021
clc
clear all
a=120;
b=100;
k1=4;
k2=80;
h=0.33;
theta=0.07;
delta=0.5;
c2=2.5;
c3=10;
c4=5;
syms T t
C = (1/T)*(((t^3)*(((a*h)/(6*theta))+((c2*a*theta)/2)))+((b/2)*(c3+(delta*c4))*((T-t)^2))+(k1*t)+k2);
%[T,t]=solve(C)
Vars = [T, t];
[C]= solve(var)
%S= solve (C, T, t)
To get the answer t= 15228, T = 1.5871 and C =80.2626.
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shunmugam hemalatha
shunmugam hemalatha on 31 May 2021
I'm very sorry to answer . Still, I'm getting
S =
-8.4285 + 0.0000i
1.2320 - 0.5961i
1.2320 + 0.5961i
Actually, I need the procedure to calculate the two variables in one equation. Will you please to get the answer as
t= 15228, T = 1.5871 and C =80.2626.

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Answers (1)

Walter Roberson
Walter Roberson on 31 May 2021
Edited: Walter Roberson on 31 May 2021
Vars = [T, t];
[C]= solve(var)
You ask to solve(var) but var is not defined by your code, so var is being taken as a reference to the variance function var()
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Walter Roberson
Walter Roberson on 31 May 2021
If you define
syms T t C
eqn = C == (1/T)*(((t^3)*(((a*h)/(6*theta))+((c2*a*theta)/2)))+((b/2)*(c3+(delta*c4))*((T-t)^2))+(k1*t)+k2)
then you would have a single equation in three variables. You would be unlikely to find a single solution -- any change in T or t would result in a different right hand side, and you could call C whatever the new result was, since C does not appear on the right hand side.
If you want to solve for T t C then you need three simultaneous equations, except cases where you can prove that the equations have no solutions except at some special points (for example, if there were a contradiction that only vanished if T were infinity so that 1/T was 0 causing the rest of the expression to vanish.)

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