A Linear Differential Equation not satisfied by
Second Order Linear
Use the Method of Undetermined Coefficients
Method of Undetermined Coefficients
where
are constants, , and is a given function called the nonhomogenous term The general solution structure is as follows: where
are solutions of the homogeneous equation: where
is a particular solution of the nonhomogenous (original) equation: Reminder:
is the Characteristic Equation for the family of solutions Approach
Step 1: Find complementary solutions
Step 2: Find particular solution Constructing a trial term: where
is the number of terms in that have , where is a n-degree polynomial If any term in the guess for is a solution to , multiply by . In other words, multiply by If there are multiple terms, superposition applies. What that means is you substitute one trial solution terms back into the original equation, at a time, in order to find the undetermined coefficients. Note that trig functions are actually exponentials: Also recall
Plug that term into the original equation to solve for undetermined coefficients. Step 3:Euler's Identity
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Step 1: Find complementary solutions Step 2: Find particular solution Plug in: Step 3: Now do the IVP. We have already concluded the method of undetermined coefficients. After doing the IVP you get
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