Find the precise angular frequency of forcing that will result in maximum amplitude of oscillation for a force?
-
Find the precise angular frequency of forcing that will result in maximum amplitude of oscillation for a forced harmonic oscillator with given natural frequency and damping constant. Compare the result to both the free frequency and the unforced damped frequency of the oscillator. can someone please answer this for me, it will be highly appreciated thanks!
-
Answer:
Looks like you need a laplace transform of the transfer function, expressed with a quadratic in the denominator. the s^1 term will yield the damping coefficient. The s^0 term will be the natural frequency, if I remember correctly.
Phys1cs at Yahoo! Answers Visit the source
Related Q & A:
- Will the post offices in the UK give a very good exchange rate on cashing travel cheques as opposed to banks?Best solution by Yahoo! Answers
- Will an 3.8 liter engine out of a grand prix fit into a grand am gt?Best solution by Yahoo! Answers
- Will the US Immigration know that I received a police caution nearly 10 years ago?Best solution by Yahoo! Answers
- Will I be able to check when did a contact add me?Best solution by Yahoo! Answers
- Will it be hard for me to get a job as a nurse in San Francisco?
Just Added Q & A:
- How many active mobile subscribers are there in China?Best solution by Quora
- How to find the right vacation?Best solution by bookit.com
- How To Make Your Own Primer?Best solution by thekrazycouponlady.com
- How do you get the domain & range?Best solution by ChaCha
- How do you open pop up blockers?Best solution by Yahoo! Answers
For every problem there is a solution! Proved by Solucija.
-
Got an issue and looking for advice?
-
Ask Solucija to search every corner of the Web for help.
-
Get workable solutions and helpful tips in a moment.
Just ask Solucija about an issue you face and immediately get a list of ready solutions, answers and tips from other Internet users. We always provide the most suitable and complete answer to your question at the top, along with a few good alternatives below.