The characteristic equation of a system is 4s4 + 8s3 + 2s2 + 6. 10s + 3 = 0. Determine the stability of the system. The eigen values of a 2X2 matrix A are –5 and 2. The eigen vectors corresponding to...

The characteristic equation of a system is 4s4 + 8s3 + 2s2 +<br>6.<br>10s + 3 = 0. Determine the stability of the system.<br>The eigen values of a 2X2 matrix A are –5 and 2. The<br>eigen vectors corresponding to eigen value -5 is<br>7.<br>eigen vector corresponding to eigen value 2 is (). Find<br>and<br>the matrix A.<br>If a, B,y be the roots of the equation x3 – 2x2 + 3x – 5 =<br>0, form the equation whose roots are By +=,<br>-<br>1<br>8.<br>ya +, aß +<br>a<br>B'<br>1<br>Constriuct the fourth degree eguation whose roots are 21i<br>

Extracted text: The characteristic equation of a system is 4s4 + 8s3 + 2s2 + 6. 10s + 3 = 0. Determine the stability of the system. The eigen values of a 2X2 matrix A are –5 and 2. The eigen vectors corresponding to eigen value -5 is 7. eigen vector corresponding to eigen value 2 is (). Find and the matrix A. If a, B,y be the roots of the equation x3 – 2x2 + 3x – 5 = 0, form the equation whose roots are By +=, - 1 8. ya +, aß + a B' 1 Constriuct the fourth degree eguation whose roots are 21i

Jun 04, 2022

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The characteristic equation of a system is 4s4 + 8s3 + 2s2 + 6. 10s + 3 = 0. Determine the stability of the system. The eigen values of a 2X2 matrix A are –5 and 2. The eigen vectors corresponding to...

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