Write down the inverse Laplace transform
\n\\(x(t)=\\) [[0]]
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\n\\(X(s)=\\frac{\\var{A}}{s+\\var{a1}}+\\frac{\\var{B}s+\\var{C}}{(s+\\var{b1})^2+\\simplify{{c1}-{b1}^2}}\\)
\n\\(X(s)=\\frac{\\var{A}}{s+\\var{a1}}+\\frac{\\var{B}(s+\\var{b1})-\\simplify{{B}*{b1}-{C}}}{(s+\\var{b1})^2+\\simplify{{c1}-{b1}^2}}\\)
\n\\(x(t)=\\var{A}e^{\\var{a1}t}+\\var{B}e^{-\\var{b1}t}cos\\left(\\sqrt{\\simplify{{c1}-{b1}^2}}t\\right)+\\frac{-\\simplify{{B}*{b1}-{C}}}{\\sqrt{\\simplify{{c1}-{b1}^2}}}e^{-\\var{b1}t}sin\\left(\\sqrt{\\simplify{{c1}-{b1}^2}}t\\right)\\)
", "ungrouped_variables": ["A", "a1", "B", "b1", "C", "c1", "f"], "metadata": {"description": "", "licence": "Creative Commons Attribution-NonCommercial 4.0 International"}, "variablesTest": {"condition": "", "maxRuns": 100}, "statement": "Having found the partial fraction breakdown:
\n\\(X(s)=\\frac{\\var{A}}{s+\\var{a1}}+\\frac{\\var{B}s+\\var{C}}{s^2+\\simplify{{b1}*2}s+\\var{c1}}\\)
\n.
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