Finding neutral axis for arbitrary 2d shape - aerofoil

5 views (last 30 days)

Selina on 30 Nov 2023

0
Link

Direct link to this question

https://uk.mathworks.com/matlabcentral/answers/2054584-finding-neutral-axis-for-arbitrary-2d-shape-aerofoil

Commented: Mathieu NOE on 8 Dec 2023

I am interested in determining the neutral axis of an aerofoil. I have the shape separated into lower and upper side (attached as txt files). When compiled it should look similar to this. I would like to determine the neutral axis of the profile. I have found this finding the axis for least moment of inertia of an object in 2D binary image - MATLAB Answers - MATLAB Central (mathworks.com) which uses a picture but sadly I do not have the necessary toolbox and my data is in x,y coordinates.

Is there a way to calculate it from this? I would appreciate any help!

2 Comments
Show NoneHide None

Dyuman Joshi on 1 Dec 2023

What is the definition of 'nuetral axis' in this context?

Selina on 1 Dec 2023

It is the principle axis of the product of inertia I believe. So basically when load is applied to the object, where stress is zero.

Accepted Answer

Mathieu NOE on 1 Dec 2023

1
Link

Direct link to this answer

https://uk.mathworks.com/matlabcentral/answers/2054584-finding-neutral-axis-for-arbitrary-2d-shape-aerofoil#answer_1363774

Open in MATLAB Online

hello @Selina

the equations are still valid , see below how we can use them :

result

code :

u = readmatrix('upper.txt');
l = readmatrix('lower.txt');
x = [u(:,2);l(:,2)];
y = [u(:,3);l(:,3)];
n = numel(x, 1);% number of points
% centroids 
xc = mean(x);
yc = mean(y);
% compute moment of inertia
Ixx = sum(x.^2) / n;
Iyy = sum(y.^2) / n;
Ixy = sum(x.*y) / n;
% compute (ellipse) semi-axis lengths
common = sqrt( (Ixx - Iyy)^2 + 4 * Ixy^2);
ra = sqrt(2) * sqrt(Ixx + Iyy + common);
rb = sqrt(2) * sqrt(Ixx + Iyy - common);
% axes angle
theta = atan2(2 * Ixy, Ixx - Iyy) / 2;
% draw the neutral line 
slope = tan(theta);
xl = [min(x) max(x)];
yl = yc + slope*(xl-xc);
plot(x,y,'r',xc,yc,'dk',xl,yl,'b--');

8 Comments
Show 6 older commentsHide 6 older comments

Selina on 5 Dec 2023

One follow up comment: when comparing the section properties to ones you obtain through a CAD software, the neutral axis actually does not align (the matlab code predicts a slope of 3.034° while the CAD provides 3.61°). When running it via python (based on Python module for section properties - All this (leancrew.com)), it actually provides the correct slope. All three methods show the correct centroid. I assume the inertia calculations might be varying between the methods. I have not yet found a way to modify the code but wanted to add this in case anyone does not have the CAD or python code to verify.

Mathieu NOE on 8 Dec 2023

Open in MATLAB Online

I wonder if there is a sign mistake in the Python code or in our matlab code

numerically speaking I have the same value as the matlab code I provided - and that's normal as both codes rely on the same equations

theta_deg = 0.9299

theta_deg2 = -0.9299

and this is different from what you announce above (and from the picture it seems to me you are running the code on another set of data)

u = readmatrix('upper.txt');
l = readmatrix('lower.txt');
x = [u(:,2);l(:,2)];
y = [u(:,3);l(:,3)];
n = numel(x);% number of points
% centroids 
polyin = polyshape(x,y);
[xc,yc] = centroid(polyin);
% compute moment of inertia
Ixx = sum(x.^2) / n;
Iyy = sum(y.^2) / n;
Ixy = sum(x.*y) / n;
% % compute (ellipse) semi-axis lengths
common = sqrt( (Ixx - Iyy)^2 + 4 * Ixy^2);
ra = sqrt(2) * sqrt(Ixx + Iyy + common);
rb = sqrt(2) * sqrt(Ixx + Iyy - common);
% axes angle
theta = atan2(2 * Ixy, Ixx - Iyy) / 2;
theta_deg = 180/pi*theta
% section below from link : 
% https://leancrew.com/all-this/2018/01/python-module-for-section-properties/
%'Principal moments of inertia (I1 I2) and orientation.'
I_avg = (Ixx + Iyy)/2;
I_diff = (Ixx - Iyy)/2;
I1 = I_avg + sqrt(I_diff^2 + Ixy^2);
I2 = I_avg - sqrt(I_diff^2 + Ixy^2);
theta2 = atan2(-Ixy, I_diff)/2;
theta_deg2 = 180/pi*theta2
% draw the neutral line 
slope = tan(theta);
xl = [min(x) max(x)];
yl = yc + slope*(xl-xc);
plot(x,y,'r*-',xc,yc,'dk',xl,yl,'b--');
ylim([-0.1 0.15])

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!