backward,forward, and central Difference
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Can any body help me understand how to do numerical differentiation? example:
t = 0:5:100; Z = cos(10*pi*t)+sin(35*pi*5);
how can I find the backward,forward and central difference at t = 99?
Risposte (4)
Jan
il 9 Nov 2011
For :
t = 0:5:100;
Z(t) = cos(10*pi*t)+sin(35*pi*5);
you cannot find the forward and central difference for t=100, because this is the last point. Central differences needs one neighboring in each direction, therefore they can be computed for interior points only. For the first point, you can get a forwrad difference, for the last point a backward difference only:
dZ1 = (Z(2) - Z(1)) / (t(2) - t(1));
dzi = (Z(i+2) - Z(i-1)) / (t(i+1) - t(i-1)); % 1 < i < 100
dZ100 = (Z(100) - Z(99)) / (t(100) - t(99));
4 Commenti
Abra dog
il 9 Nov 2011
Titus Edelhofer
il 9 Nov 2011
No: forward difference means "use this point plus point to the right". Regardless how many points you have, the last (the most right point) never has a point to the right. Therefore you have to use backward difference at the right boundary...
Abra dog
il 9 Nov 2011
Jan
il 9 Nov 2011
The point t=99 is not a member of t=0:5:100.
Friedrich
il 9 Nov 2011
Hi,
lets say you like to get Z'(t_0) with the forward difference. You do the following
Z'(t_0) = ( Z(t_0 + h) - Z(t_0) ) / h
where h is a small offset. You actually calculate the slope of a straight line which goes through Z(t_0 + h) and Z(t_0) for forward differences.
4 Commenti
Abra dog
il 9 Nov 2011
Jan
il 9 Nov 2011
It is not possible to define "small" uniquely for this problem. If h is too large, the error of higher orders will increase: The change in the function value does depend on the 2nd, 3rd, etc derivative also. If h is too small, both function values will be nearly identical and due to the limited number of digits the result will have a small accuracy only: 1.2345678 - 1.2345679 = 0.0000001. If you divide this small number by a tiny h you get more or less random values. Therefore a rule of thumb is to calculate h such that (Z(t)-Z(t+h)) has about the half number of significant digits, for DOUBLEs this is about 7. In other words: (Z(t)-Z(t+h)) should be about SQRT(EPS).
If you have discrete data, the situation is easier: Then you use the neighboring elements. This is not very accurate, but the best possible solution.
Abra dog
il 9 Nov 2011
Friedrich
il 10 Nov 2011
No, i would put it in the formula above (t_0 = x in that case).
So (cos(10*pi*(x+h)) + sin(35*pi*5) - .....) / h
Fahad Maqsood
il 9 Dic 2018
0 voti
Hi
I am new to matlab and struggling with it. any one who can help me getting started
Given: x 1 2 3 4 5 6
f(x) 2 3 1 5 4 1
Estimate f′(4) using the forward, backward, and centered difference method with h = 1.
and second order polynomial.
3 Commenti
John D'Errico
il 9 Dic 2018
Please don't add an answer, resurrecting an old question, just to add a new question, even if it is vaguely related. Anyway, this was your homework assignment. So you need to make some effort. What have you tried? If nothing, then why not?
So start by writing down the formula that you need to use.
Fahad Maqsood
il 13 Dic 2018
As i mentioned i never worked on matlab before, i searched hard for it but could not find any related problems. It has been posted for those could help others getting started. Well you have your own opinion keep it in your pocket.
Steven Lord
il 13 Dic 2018
If you show us what you've tried so far and explain the specific difficulty you're experiencing, we may be able to provide some guidance.
If you're not even sure where to start because you're new to MATLAB, I recommend working through the MATLAB Onramp tutorial available from the Tutorials section of the Support page on this website (click the Support button at the top of this page.)
If you're not sure where to start because of the subject matter of the question, I recommend contacting your professor and/or your teaching assistant and asking them for help with the material.
LE TRAN
il 14 Mar 2024
0 voti
hello everyone, I have a math problem with an error in the code.Please refer to the code
- Build a code to Estimate the first derivative of the following function at x=0.5 using h=0.5, 0.25, and 0.1 for the forward, backward, and centre difference approximation schemes.
- Make an analysis and draw some conclusions based on the results obtained.
- f(x)= -0,1*x^4-0,15*x^3-0,5*x^2-0,25*x+1,2
7 Commenti
LE TRAN
il 14 Mar 2024
help me:((
Walter Roberson
il 14 Mar 2024
f = @(x) -0.1*x.^4 - 0.15*x.^3 - 0.5*x.^2 - 0. 25*x + 1.2
LE TRAN
il 14 Mar 2024
yes pro
Walter Roberson
il 14 Mar 2024
You said "Please refer to code" but the only code you attached was
f(x)= -0,1*x^4-0,15*x^3-0,5*x^2-0,25*x+1,2
so I corrected that code.
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