Solution Found!
Consider the following Routh table. Notice that the s 5
Chapter 6, Problem 17(choose chapter or problem)
Consider the following Routh table. Notice that the \(s^5\) row was originally all zeros. Tell how many roots of the original polynomial were in the right half-plane, in the left half-plane, and on the \(j \omega\)-axis. [Section: 6.3]
Questions & Answers
QUESTION:
Consider the following Routh table. Notice that the \(s^5\) row was originally all zeros. Tell how many roots of the original polynomial were in the right half-plane, in the left half-plane, and on the \(j \omega\)-axis. [Section: 6.3]
ANSWER:
Step 1 of 4
In the given table,
Second row of the table is the auxiliary row. While the third row is zero row.
Highest degree of is 7, so the total number of roots will be 7.