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<p>我试图解这个微分方程组,但它不起作用。我做错了什么</p>
<pre><code>from sympy import Function, dsolve, Eq, Derivative, sin, cos, symbols
from sympy.abc import x
t = symbols('t')
x, y = symbols('x, y', cls=Function)
eq = (Eq(Derivative(x(t), t), -2 * Derivative(y(t), t) - 2 * x(t) - 5 * y(t) + 77),
Eq(Derivative(y(t), t), -x(t) - 4 * y(t) + 61))
dsolve(eq)
</code></pre>
<p>以下是我得到的错误:</p>
<pre class="lang-none prettyprint-override"><code>AttributeError Traceback (most recent call last)
<ipython-input-32-76dbeaa32a73> in <module>
----> 1 soln = dsolve((eq1, eq2))
2 soln
~\anaconda3\lib\site-packages\sympy\solvers\ode\ode.py in dsolve(eq, func, hint, simplify, ics, xi, eta, x0, n, **kwargs)
573 """
574 if iterable(eq):
--> 575 match = classify_sysode(eq, func)
576 eq = match['eq']
577 order = match['order']
~\anaconda3\lib\site-packages\sympy\solvers\ode\ode.py in classify_sysode(eq, funcs, **kwargs)
1954 if matching_hints['no_of_equation'] == 2:
1955 if order_eq == 1:
-> 1956 type_of_equation = check_linear_2eq_order1(eq, funcs, func_coef)
1957 elif order_eq == 2:
1958 type_of_equation = check_linear_2eq_order2(eq, funcs, func_coef)
~\anaconda3\lib\site-packages\sympy\solvers\ode\ode.py in check_linear_2eq_order1(eq, func, func_coef)
1994
1995 def check_linear_2eq_order1(eq, func, func_coef):
-> 1996 x = func[0].func
1997 y = func[1].func
1998 fc = func_coef
AttributeError: 'list' object has no attribute 'func'
</code></pre>