Routh FREE
Performs stability analysis with Routh-Hurwitz criterion
What's Routh FREE APK?
Routh FREE is a app for Android, It's developed by FILIPE ALVES COELHO author.
First released on google play in 4 years ago and latest version released in 3 years ago.
This app has 847 download times on Google play and rated as 4.83 stars with 6 rated times.
This product is an app in Education category. More infomartion of Routh FREE on google play
Performs stability analysis with Routh-Hurwitz criterion
Routh FREE is an app for performing stability analysis of input-output systems using Routh-Hurwitz criterion. The user will be able to generate the full Routh-Hurwitz table, find all poles from the characteristic equation and visualize them in the complex plane.
Are you a professor and need to generate random exercises for your class?
Are you a student and need more exercises to practice for your exams?
The Routh app now has an exercise generator that randomizes exercises for 5 categories of exercises:
+ General problems (just randomize a normal exercise)
+ Row of zeros (special case of row of zeros)
+ Problems with an unknown gain K as a coefficient of the characteristic equation
+ Zero in the first column (special case)
+ Stability of closed-loop systems
Need more features? Download the full version!
Routh FREE is an app for performing stability analysis of input-output systems using Routh-Hurwitz criterion. The user will be able to generate the full Routh-Hurwitz table, find all poles from the characteristic equation and visualize them in the complex plane.
Are you a professor and need to generate random exercises for your class?
Are you a student and need more exercises to practice for your exams?
The Routh app now has an exercise generator that randomizes exercises for 5 categories of exercises:
+ General problems (just randomize a normal exercise)
+ Row of zeros (special case of row of zeros)
+ Problems with an unknown gain K as a coefficient of the characteristic equation
+ Zero in the first column (special case)
+ Stability of closed-loop systems
Need more features? Download the full version!
