Linear Algebra Examples

[3246]
Step 1
Set up the formula to find the characteristic equation p(λ).
p(λ)=determinant(A-λI2)
Step 2
The identity matrix or unit matrix of size 2 is the 2×2 square matrix with ones on the main diagonal and zeros elsewhere.
[1001]
Step 3
Substitute the known values into p(λ)=determinant(A-λI2).
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Step 3.1
Substitute [3246] for A.
p(λ)=determinant([3246]-λI2)
Step 3.2
Substitute [1001] for I2.
p(λ)=determinant([3246]-λ[1001])
p(λ)=determinant([3246]-λ[1001])
Step 4
Simplify.
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Step 4.1
Simplify each term.
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Step 4.1.1
Multiply -λ by each element of the matrix.
p(λ)=determinant([3246]+[-λ1-λ0-λ0-λ1])
Step 4.1.2
Simplify each element in the matrix.
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Step 4.1.2.1
Multiply -1 by 1.
p(λ)=determinant([3246]+[-λ-λ0-λ0-λ1])
Step 4.1.2.2
Multiply -λ0.
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Step 4.1.2.2.1
Multiply 0 by -1.
p(λ)=determinant([3246]+[-λ0λ-λ0-λ1])
Step 4.1.2.2.2
Multiply 0 by λ.
p(λ)=determinant([3246]+[-λ0-λ0-λ1])
p(λ)=determinant([3246]+[-λ0-λ0-λ1])
Step 4.1.2.3
Multiply -λ0.
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Step 4.1.2.3.1
Multiply 0 by -1.
p(λ)=determinant([3246]+[-λ00λ-λ1])
Step 4.1.2.3.2
Multiply 0 by λ.
p(λ)=determinant([3246]+[-λ00-λ1])
p(λ)=determinant([3246]+[-λ00-λ1])
Step 4.1.2.4
Multiply -1 by 1.
p(λ)=determinant([3246]+[-λ00-λ])
p(λ)=determinant([3246]+[-λ00-λ])
p(λ)=determinant([3246]+[-λ00-λ])
Step 4.2
Add the corresponding elements.
p(λ)=determinant[3-λ2+04+06-λ]
Step 4.3
Simplify each element.
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Step 4.3.1
Add 2 and 0.
p(λ)=determinant[3-λ24+06-λ]
Step 4.3.2
Add 4 and 0.
p(λ)=determinant[3-λ246-λ]
p(λ)=determinant[3-λ246-λ]
p(λ)=determinant[3-λ246-λ]
Step 5
Find the determinant.
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Step 5.1
The determinant of a 2×2 matrix can be found using the formula |abcd|=ad-cb.
p(λ)=(3-λ)(6-λ)-42
Step 5.2
Simplify the determinant.
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Step 5.2.1
Simplify each term.
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Step 5.2.1.1
Expand (3-λ)(6-λ) using the FOIL Method.
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Step 5.2.1.1.1
Apply the distributive property.
p(λ)=3(6-λ)-λ(6-λ)-42
Step 5.2.1.1.2
Apply the distributive property.
p(λ)=36+3(-λ)-λ(6-λ)-42
Step 5.2.1.1.3
Apply the distributive property.
p(λ)=36+3(-λ)-λ6-λ(-λ)-42
p(λ)=36+3(-λ)-λ6-λ(-λ)-42
Step 5.2.1.2
Simplify and combine like terms.
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Step 5.2.1.2.1
Simplify each term.
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Step 5.2.1.2.1.1
Multiply 3 by 6.
p(λ)=18+3(-λ)-λ6-λ(-λ)-42
Step 5.2.1.2.1.2
Multiply -1 by 3.
p(λ)=18-3λ-λ6-λ(-λ)-42
Step 5.2.1.2.1.3
Multiply 6 by -1.
p(λ)=18-3λ-6λ-λ(-λ)-42
Step 5.2.1.2.1.4
Rewrite using the commutative property of multiplication.
p(λ)=18-3λ-6λ-1-1λλ-42
Step 5.2.1.2.1.5
Multiply λ by λ by adding the exponents.
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Step 5.2.1.2.1.5.1
Move λ.
p(λ)=18-3λ-6λ-1-1(λλ)-42
Step 5.2.1.2.1.5.2
Multiply λ by λ.
p(λ)=18-3λ-6λ-1-1λ2-42
p(λ)=18-3λ-6λ-1-1λ2-42
Step 5.2.1.2.1.6
Multiply -1 by -1.
p(λ)=18-3λ-6λ+1λ2-42
Step 5.2.1.2.1.7
Multiply λ2 by 1.
p(λ)=18-3λ-6λ+λ2-42
p(λ)=18-3λ-6λ+λ2-42
Step 5.2.1.2.2
Subtract 6λ from -3λ.
p(λ)=18-9λ+λ2-42
p(λ)=18-9λ+λ2-42
Step 5.2.1.3
Multiply -4 by 2.
p(λ)=18-9λ+λ2-8
p(λ)=18-9λ+λ2-8
Step 5.2.2
Subtract 8 from 18.
p(λ)=-9λ+λ2+10
Step 5.2.3
Reorder -9λ and λ2.
p(λ)=λ2-9λ+10
p(λ)=λ2-9λ+10
p(λ)=λ2-9λ+10
Step 6
Set the characteristic polynomial equal to 0 to find the eigenvalues λ.
λ2-9λ+10=0
Step 7
Solve for λ.
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Step 7.1
Use the quadratic formula to find the solutions.
-b±b2-4(ac)2a
Step 7.2
Substitute the values a=1, b=-9, and c=10 into the quadratic formula and solve for λ.
9±(-9)2-4(110)21
Step 7.3
Simplify.
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Step 7.3.1
Simplify the numerator.
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Step 7.3.1.1
Raise -9 to the power of 2.
λ=9±81-411021
Step 7.3.1.2
Multiply -4110.
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Step 7.3.1.2.1
Multiply -4 by 1.
λ=9±81-41021
Step 7.3.1.2.2
Multiply -4 by 10.
λ=9±81-4021
λ=9±81-4021
Step 7.3.1.3
Subtract 40 from 81.
λ=9±4121
λ=9±4121
Step 7.3.2
Multiply 2 by 1.
λ=9±412
λ=9±412
Step 7.4
The final answer is the combination of both solutions.
λ=9+412,9-412
λ=9+412,9-412
Step 8
The result can be shown in multiple forms.
Exact Form:
λ=9+412,9-412
Decimal Form:
λ=7.70156211,1.29843788
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