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Yes, you're right! The next step is to diagonalize the matrix, which involves calculating the eigenvalues and eigenvectors of the transformation matrix ( T ). Once you do that, you can express the recurrence as a closed-form formula for ( a_n ).
Let's break down the steps involved:
Step 1: Find the eigenvalues of the matrix
You want to find the eigenvalues ( \lambda ) of the matrix ( T ):
[ T = \begin{bmatrix} 2 & 3 \ 1 & 0 \end{bmatrix} ]
Eigenvalues are found by solving the characteristic equation:
[ \text{det}(T - \lambda I) = 0 ]
where ( I ) is the identity matrix. First, compute the determinant of ( T - \lambda I ):
[ T - \lambda I = \begin{bmatrix} 2 - \lambda & 3 \ 1 & -\lambda \end{bmatrix} ]
Now, compute the determinant:
[ \text{det}(T - \lambda I) = (2 - \lambda)(-\lambda) - (3)(1) = -2\lambda + \lambda^2 - 3 ]
Simplify the equation:
[ \lambda^2 - 2\lambda - 3 = 0 ]
Now, solve this quadratic equation for ( \lambda ):
[ \lambda = \frac{-(-2) \pm \sqrt{(-2)^2 - 4(1)(-3)}}{2(1)} = \frac{2 \pm \sqrt{4 + 12}}{2} = \frac{2 \pm \sqrt{16}}{2} = \frac{2 \pm 4}{2} ]
Thus, the two eigenvalues are:
[ \lambda_1 = \frac{2 + 4}{2} = 3 \quad \text{and} \quad \lambda_2 = \frac{2 - 4}{2} = -1 ]
Step 2: Find the eigenvectors
Now that you have the eigenvalues ( \lambda_1 = 3 ) and ( \lambda_2 = -1 ), you need to find the corresponding eigenvectors.
Eigenvector for ( \lambda_1 = 3 ):
Solve ( (T - 3I) \mathbf{v} = 0 ), where ( \mathbf{v} ) is the eigenvector corresponding to ( \lambda_1 ).
[ T - 3I = \begin{bmatrix} 2 - 3 & 3 \ 1 & -3 \end{bmatrix} = \begin{bmatrix} -1 & 3 \ 1 & -3 \end{bmatrix} ]
Now solve the system:
[ \begin{bmatrix} -1 & 3 \ 1 & -3 \end{bmatrix} \begin{bmatrix} v_1 \ v_2 \end{bmatrix} = \begin{bmatrix} 0 \ 0 \end{bmatrix} ]
This gives the system:
[
- v_1 + 3 v_2 = 0 ] [ v_1 - 3 v_2 = 0 ]
Both equations are equivalent, so we have:
[ v_1 = 3 v_2 ]
Thus, the eigenvector corresponding to ( \lambda_1 = 3 ) is:
[ \mathbf{v}_1 = \begin{bmatrix} 3 \ 1 \end{bmatrix} ]
Eigenvector for ( \lambda_2 = -1 ):
Solve ( (T + I) \mathbf{v} = 0 ), where ( \mathbf{v} ) is the eigenvector corresponding to ( \lambda_2 ).
[ T + I = \begin{bmatrix} 2 + 1 & 3 \ 1 & 0 + 1 \end{bmatrix} = \begin{bmatrix} 3 & 3 \ 1 & 1 \end{bmatrix} ]
Now solve the system:
[ \begin{bmatrix} 3 & 3 \ 1 & 1 \end{bmatrix} \begin{bmatrix} v_1 \ v_2 \end{bmatrix} = \begin{bmatrix} 0 \ 0 \end{bmatrix} ]
This gives the system:
[ 3 v_1 + 3 v_2 = 0 ] [ v_1 + v_2 = 0 ]
From the second equation, we have ( v_1 = -v_2 ). So, the eigenvector corresponding to ( \lambda_2 = -1 ) is:
[ \mathbf{v}_2 = \begin{bmatrix} -1 \ 1 \end{bmatrix} ]
Step 3: Diagonalize the matrix
Now that we have the eigenvalues and eigenvectors, we can diagonalize the matrix ( T ).
Let ( P ) be the matrix formed by the eigenvectors as columns:
[ P = \begin{bmatrix} 3 & -1 \ 1 & 1 \end{bmatrix} ]
The inverse of ( P ) is computed as follows (using the formula for the inverse of a 2x2 matrix):
[ P^{-1} = \frac{1}{\text{det}(P)} \begin{bmatrix} 1 & 1 \ -1 & 3 \end{bmatrix} ]
where ( \text{det}(P) = (3)(1) - (-1)(1) = 3 + 1 = 4 ), so:
[ P^{-1} = \frac{1}{4} \begin{bmatrix} 1 & 1 \ -1 & 3 \end{bmatrix} ]
The diagonal matrix ( D ) will have the eigenvalues on the diagonal:
[ D = \begin{bmatrix} 3 & 0 \ 0 & -1 \end{bmatrix} ]
Thus, ( T ) can be written as:
[ T = P D P^{-1} ]
Step 4: Express the closed-form solution
Now, to compute ( a_n ), we can use the diagonalization of ( T ):
[ \mathbf{v}_n = T^{n-1} \mathbf{v}_1 = P D^{n-1} P^{-1} \mathbf{v}_1 ]
The term ( D^{n-1} ) is easy to compute because ( D ) is diagonal:
[ D^{n-1} = \begin{bmatrix} 3^{n-1} & 0 \ 0 & (-1)^{n-1} \end{bmatrix} ]
Thus, the closed-form formula for ( a_n ) is obtained by applying the matrix multiplication:
[ \mathbf{v}_n = P \begin{bmatrix} 3^{n-1} & 0 \ 0 & (-1)^{n-1} \end{bmatrix} P^{-1} \mathbf{v}_1 ]
By carrying out these matrix multiplications (which can be done step by step), you'll arrive at a direct formula for ( a_n ), which is a linear combination of the terms involving powers of ( 3 ) and ( (-1)^{n-1} ).
To rewrite the closed-form solution for ( a_n ) without using vectors or matrices, we need to compute the expression directly in terms of ( n ) and use the properties of the eigenvalues and eigenvectors.
Let's break down the steps to arrive at a direct formula for ( a_n ).
Step 1: General Formula Structure
From the diagonalization of the matrix ( T ), we have:
[ \mathbf{v}_n = P D^{n-1} P^{-1} \mathbf{v}_1 ]
where ( P = \begin{bmatrix} 3 & -1 \ 1 & 1 \end{bmatrix} ), ( D = \begin{bmatrix} 3 & 0 \ 0 & -1 \end{bmatrix} ), and ( \mathbf{v}_1 = \begin{bmatrix} a_1 \ a_0 \end{bmatrix} ).
After performing the matrix multiplication and solving for the values of ( a_n ), we can arrive at a direct expression for ( a_n ).
Step 2: Compute ( a_n ) in Terms of Eigenvalues
Since ( T^{n-1} ) is diagonalizable, we know that ( D^{n-1} ) is simply:
[ D^{n-1} = \begin{bmatrix} 3^{n-1} & 0 \ 0 & (-1)^{n-1} \end{bmatrix} ]
Now, we need to express the evolution of the state vector without matrices. The formula for ( a_n ) will be a combination of the eigenvalues ( \lambda_1 = 3 ) and ( \lambda_2 = -1 ), weighted by the initial values ( a_1 ) and ( a_0 ).
To get the value of ( a_n ), we need to express the result of ( P^{-1} \mathbf{v}_1 ) in a way that we can compute directly.
Step 3: Use the Initial Conditions
The initial conditions give us the starting values of ( a_1 ) and ( a_0 ), and we use the fact that the matrix multiplication ( P D^{n-1} P^{-1} \mathbf{v}_1 ) essentially results in the following:
[ a_n = \alpha_1 3^{n-1} + \alpha_2 (-1)^{n-1} ]
where ( \alpha_1 ) and ( \alpha_2 ) are constants determined by the initial conditions. Let's compute these coefficients using ( \mathbf{v}_1 = \begin{bmatrix} a_1 \ a_0 \end{bmatrix} ).
Step 4: Solve for the Coefficients ( \alpha_1 ) and ( \alpha_2 )
We know that ( \mathbf{v}n = P D^{n-1} P^{-1} \mathbf{v}1 ), and we can solve this system by applying the initial conditions. For the recurrence ( a_n = 2a{n-1} + 3a{n-2} ), this gives the following two linear equations:
- ( \alpha_1 3^0 + \alpha_2 (-1)^0 = a_0 ) (this gives the equation for ( a_0 ))
- ( \alpha_1 3^1 + \alpha_2 (-1)^1 = a_1 ) (this gives the equation for ( a_1 ))
These equations are:
[ \alpha_1 + \alpha_2 = a_0 ] [ 3 \alpha_1 - \alpha_2 = a_1 ]
Step 5: Solve the System of Equations
We can now solve this system of two linear equations for ( \alpha_1 ) and ( \alpha_2 ). Add the two equations:
[ (\alpha_1 + \alpha_2) + (3 \alpha_1 - \alpha_2) = a_0 + a_1 ] [ 4 \alpha_1 = a_0 + a_1 ] [ \alpha_1 = \frac{a_0 + a_1}{4} ]
Substitute ( \alpha_1 = \frac{a_0 + a_1}{4} ) into ( \alpha_1 + \alpha_2 = a_0 ):
[ \frac{a_0 + a_1}{4} + \alpha_2 = a_0 ] [ \alpha_2 = a_0 - \frac{a_0 + a_1}{4} = \frac{3a_0 - a_1}{4} ]
Step 6: Write the General Formula for ( a_n )
Now we substitute ( \alpha_1 ) and ( \alpha_2 ) back into the formula for ( a_n ):
[ a_n = \alpha_1 3^{n-1} + \alpha_2 (-1)^{n-1} ] [ a_n = \frac{a_0 + a_1}{4} 3^{n-1} + \frac{3a_0 - a_1}{4} (-1)^{n-1} ]
This is the closed-form formula for ( a_n ), which you can now use to compute ( a_n ) directly for any ( n ), given the initial conditions ( a_0 ) and ( a_1 ).
Final Formula:
[ a_n = \frac{a_0 + a_1}{4} 3^{n-1} + \frac{3a_0 - a_1}{4} (-1)^{n-1} ]
This formula allows you to compute ( a_n ) directly without needing to iterate through the recurrence!