To determine the number of roots in the left half of the s-plane for the equation s^3 - 4s^2 + s + 6 = 0, we can use the Routh-Hurwitz stability criterion.

Step 1: Write the coefficients of the equation in a table:
| s^3 | s^2 | s^1 | s^0 |
-----------------------------
R1 | 1 | -4 | 1 | 6 |
R2 | | | | |
R3 | | | | |

Step 2: Fill in the first row of the table:
| s^3 | s^2 | s^1 | s^0 |
-----------------------------
R1 | 1 | -4 | 1 | 6 |
R2 | -4 | 6 | | |
R3 | | | | |

Step 3: Fill in the second row of the table:
| s^3 | s^2 | s^1 | s^0 |
-----------------------------
R1 | 1 | -4 | 1 | 6 |
R2 | -4 | 6 | | |
R3 | 6 | | | |

Step 4: Calculate the remaining elements of the table:
| s^3 | s^2 | s^1 | s^0 |
-----------------------------
R1 | 1 | -4 | 1 | 6 |
R2 | -4 | 6 | 6 | |
R3 | 6 | 6 | | |

Step 5: Count the number of sign changes in the first column of the table. In this case, there are 2 sign changes.

Step 6: The number of roots in the left half of the s-plane is equal to the number of sign changes in the first column of the table. Therefore, the answer is two (c. Two).

Question

To determine the number of roots in the left half of the s-plane for the equation s^3 - 4s^2 + s + 6 = 0, we can use the Routh-Hurwitz stability criterion.

Step 1: Write the coefficients of the equation in a table:
   | s^3 | s^2 | s^1 | s^0 |
-----------------------------
R1 |  1  | -4  |  1  |  6  |
R2 |     |     |     |     |
R3 |     |     |     |     |

Step 2: Fill in the first row of the table:
   | s^3 | s^2 | s^1 | s^0 |
-----------------------------
R1 |  1  | -4  |  1  |  6  |
R2 | -4  |  6  |     |     |
R3 |     |     |     |     |

Step 3: Fill in the second row of the table:
   | s^3 | s^2 | s^1 | s^0 |
-----------------------------
R1 |  1  | -4  |  1  |  6  |
R2 | -4  |  6  |     |     |
R3 |  6  |     |     |     |

Step 4: Calculate the remaining elements of the table:
   | s^3 | s^2 | s^1 | s^0 |
-----------------------------
R1 |  1  | -4  |  1  |  6  |
R2 | -4  |  6  |  6  |     |
R3 |  6  |  6  |     |     |

Step 5: Count the number of sign changes in the first column of the table. In this case, there are 2 sign changes.

Step 6: The number of roots in the left half of the s-plane is equal to the number of sign changes in the first column of the table. Therefore, the answer is two (c. Two).

Knowee AI · Accepted Answer

To determine the number of roots in the left half of the s-plane for the equation s^3 - 4s^2 + s + 6 = 0, we can use the Routh-Hurwitz stability criterion.

Step 1: Write the coefficients of the equation in a table:
   | s^3 | s^2 | s^1 | s^0 |
-----------------------------
R1 |  1  | -4  |  1  |  6  |
R2 |     |     |     |     |
R3 |     |     |     |     |

Step 2: Fill in the first row of the table:
   | s^3 | s^2 | s^1 | s^0 |
-----------------------------
R1 |  1  | -4  |  1  |  6  |
R2 | -4  |  6  |     |     |
R3 |     |     |     |     |

Step 3: Fill in the second row of the table:
   | s^3 | s^2 | s^1 | s^0 |
-----------------------------
R1 |  1  | -4  |  1  |  6  |
R2 | -4  |  6  |     |     |
R3 |  6  |     |     |     |

Step 4: Calculate the remaining elements of the table:
   | s^3 | s^2 | s^1 | s^0 |
-----------------------------
R1 |  1  | -4  |  1  |  6  |
R2 | -4  |  6  |  6  |     |
R3 |  6  |  6  |     |     |

Step 5: Count the number of sign changes in the first column of the table. In this case, there are 2 sign changes.

Step 6: The number of roots in the left half of the s-plane is equal to the number of sign changes in the first column of the table. Therefore, the answer is two (c. Two).

For the equation, s3 – 4s2 + s + 6 = 0 the number of roots in the left half ofs-plane will beSelect one:a. Zerob. Onec. Twod. Three

Question

For the equation, `s^3 – 4s^2 + s + 6 = 0` the number of roots in the left half of s-plane will be

Solution

Step 1: Write the coefficients of the equation in a table: | s^3 | s^2 | s^1 | s^0 |

Step 2: Fill in the first row of the table: | s^3 | s^2 | s^1 | s^0 |

Step 3: Fill in the second row of the table: | s^3 | s^2 | s^1 | s^0 |

Step 4: Calculate the remaining elements of the table: | s^3 | s^2 | s^1 | s^0 |

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