An actual non-answer from solve

조회 수: 5 (최근 30일)
Susan
Susan 2011년 6월 2일
The following code results in a an empty sym. Would anyone care to comment on (a) why no solution? and (b) how to actually get a solution from the symbolic math toolbox?
reset(symengine);clear all;
syms x lambda A k positive;
syms eta;
lambda = sym(1);
k = sym(2*pi);
eq1 = A*sin(eta)-10;
eq2 = A*sin(k*lambda/6 + eta)-20;
eq3 = A*sin(k*5*lambda/12 + eta);
% try to solve
b=solve(eq1,eq2,eq3,A,eta,k)
% --> answer is [ empty sym ]
subs(eq1,{A,eta,k},{20,pi/6,2*pi/lambda})
subs(eq2,{A,eta,k},{20,pi/6,2*pi/lambda})
subs(eq3,{A,eta,k},{20,pi/6,2*pi/lambda})

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채택된 답변

Sean de Wolski
Sean de Wolski 2011년 6월 2일
You force k to equal 2*pi; how do you expect it to solve for any other value?

추가 답변 (2개)

Walter Roberson
Walter Roberson 2011년 6월 2일
solve() is failing because you are attempting to solve for k, but k has a value already so eq1 eq2 and eq3 do not contain k anymore. Even if they did somehow still contain k, because k has a value, it would be the value that would be passed in to solve() where you list k at the end; you would need to quote k to get just the name passed in
solve(eq1,eq2,eq3,A,eta,'k')
but like I said this would fail because there is no k in eq* because eq* were constructed after k was defined.
Susan
Susan 2011년 6월 2일
Ok,I actually didn't mean to ask it to solve for k any more.
Now the following produces the right answer:
b=solve(eq1,eq2,eq3,A,eta)
>> b.A
ans =
20
>> b.eta
ans =
pi/6
Still, I'm wondering what it would take to solve for all three, which was my original quest:
reset(symengine);clear all;
syms x lambda A k positive;
syms eta;
eq1 = A*sin(eta)-10;
eq2 = A*sin(k*lambda/6 + eta)-20;
eq3 = A*sin(k*5*lambda/12 + eta);
% try to solve
b=solve(eq1,eq2,eq3,A,eta,k)b =
[ empty sym ]
  댓글 수: 1
Walter Roberson
Walter Roberson 2011년 6월 2일
Works for me in Maple:
solve([eq1, eq2, eq3], [A, eta, k],UseAssumptions);
[[A = 20, eta = (1/6)*Pi, k = 2*Pi/lambda],
[A = 20, eta = (5/6)*Pi, k = 10*Pi/lambda],
[A = 20, eta = (5/6)*Pi, k = -2*Pi/lambda],
[A = 20, eta = (1/6)*Pi, k = -10*Pi/lambda],
[A = (80/7)*14^(1/2), eta = arctan((1/22)*14^(1/2)*2^(1/2)), k = 12*arctan((1/2)*14^(1/2)*2^(1/2))/lambda],
[A = (80/7)*14^(1/2), eta = -arctan((1/22)*14^(1/2)*2^(1/2))+Pi, k = 12*(-arctan((1/2)*14^(1/2)*2^(1/2))+Pi)/lambda],
[A = (80/7)*14^(1/2), eta = -arctan((1/22)*14^(1/2)*2^(1/2))+Pi, k = -12*arctan((1/2)*14^(1/2)*2^(1/2))/lambda],
[A = (80/7)*14^(1/2), eta = arctan((1/22)*14^(1/2)*2^(1/2)), k = 12*(arctan((1/2)*14^(1/2)*2^(1/2))-Pi)/lambda]]
You have to eliminate the ones with negative k from this, as Maple does not seem to fully process the assumptions on k with the assumptions on lambda,

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