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Let

A(t)=(f1(t), f2(t); f3(t), f4(t)) be a 2*2 matrix

first of all how can I define the matrix A(t) as a function of t

then

I would like to define the determinant of A as a function, i.e.

d(t)=Det(A(t))

and then plot d(t).

Actually I want to write this function for n*n matrix where n>=2

thanks

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6  
May I suggest you to review the answers you received to your previous questions? I see some very nice answers there, and you did not accept them (and sometimes not even upvote or comment on them!) –  belisarius Nov 21 '11 at 13:07

1 Answer 1

up vote 4 down vote accepted

For example:

a[t_] := Table[Sin[(n + m) t], {n, 2}, {m, 2}]
d[t_] := Det[a[t]]
Plot[d[t], {t, 0, 2 Pi}]

enter image description here

If you don't have an explicit expression:

a[t_]:= {{f1[t],f2[t]},{f3[t],f4[t]}}

also works

Edit

Using the dimension as a parameter:

a[t_, n_] := Table[1/(j + k) t, {j, n}, {k, n}]
d[t_, n_] := Det[a[t, n]]
Plot[d[t, 5], {t, 0, 2 Pi}]

enter image description here

Edit

Plotting several dimensions in the same plot:

a[t_, n_] := Table[k^4/(j + k) t, {j, n}, {k, n}]
d[t_, n_] := Det[a[t, n]]
Plot[Evaluate@Table[d[t, n], {n, 2, 5}], {t, 0, 20}]

enter image description here

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2  
Beat me to it, dang! ;-) –  Timo Nov 21 '11 at 12:52
    
@Timo We need more questions! :) –  belisarius Nov 21 '11 at 13:03
    
@belisarius If that's so, could you try my question on the wave: stackoverflow.com/questions/7351519/… –  P. Fonseca Nov 21 '11 at 13:14
    
@P. Fonseca Sorry, there are lot of people here more versed on numerical DE solving than me here (and generally in numerical methods) ... if they couldn't help you enough I don't think I'll be able to –  belisarius Nov 21 '11 at 13:28
    
@belisarius Thanks anyway –  P. Fonseca Nov 21 '11 at 13:33

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