Question Details

[solution] » Here is my question: The input to Low pass filter is : S(k)=(E)^1/2+double frequency term+n(k), k=0,


Description

Answer Download


The Question

Here is my question: The input to Low pass filter is : S(k)=(E)^1/2+double frequency term+n(k), k=0,1,... Where we have assumed scaling so that scaling so that n(k) is a standard normal random variable for each k and $n_{i}$ is independent of $n_{j}$ for i not equal to j, i,j=0,1,... . We may ignore the double frequency terms and assume they are suppressed, either completely or at least sufficiently, by LPF. Now, please explain me how to compute s(n) ignoring double frequency term and square root of E. some says by definition s(0)=1??? How??? Also isnt standard normal distribution a unique random variable?

 


Solution details

Solution #000121826

[solution] » Here is my question: The input to Low pass filter is : S(k)=(E)^1/2+double frequency term+n(k), k=0,.zip

Uploaded by: Tutor

Answer rating:

This paper was answered on 14-Oct-2020

Pay using PayPal (No PayPal account Required) or your credit card . All your purchases are securely protected by .

About this Question

STATUS

Answered

QUALITY

Approved

DATE ANSWERED

Oct 14, 2020

EXPERT

Tutor

ANSWER RATING

BEST TUTORS

We have top-notch tutors who can do your essay/homework for you at a reasonable cost and then you can simply use that essay as a template to build your own arguments.

You can also use these solutions:

  • As a reference for in-depth understanding of the subject.
  • As a source of ideas / reasoning for your own research (if properly referenced)
  • For editing and paraphrasing (check your institution's definition of plagiarism and recommended paraphrase).
This we believe is a better way of understanding a problem and makes use of the efficiency of time of the student.

STUCK WITH YOUR PAPER?

Order New Solution. Quick Turnaround

Click on the button below in order to Order for a New, Original and High-Quality Essay Solutions. New orders are original solutions and precise to your writing instruction requirements. Place a New Order using the button below.

WE GUARANTEE, THAT YOUR PAPER WILL BE WRITTEN FROM SCRATCH AND WITHIN A DEADLINE.

Order Now