Solving an Elasticity Problem - Any Help Appreciated!

  • Thread starter Thread starter physicist10
  • Start date Start date
  • Tags Tags
    Elasticity
Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
6 replies · 3K views
physicist10
Messages
17
Reaction score
0
Hello, I am struggling with this problem. It is probably the easiest problem ever...

6o28so.jpg


What I did: The plane has 2 stress components. σn and σs.

σn is a multiple of (l, m, k) vector. For σs, I made up a vector (a, b, c) which is orthogonal to (l, m, k). And I equated all vectors.

I'm probably doing something wrong. Any help is appreciated!
 
Physics news on Phys.org

Homework Statement



6o28so.jpg


Homework Equations



General plane formulas.

The Attempt at a Solution



I thought that the plane has 2 stress components. σn and σs.

σn is a multiple of (l, m, k) vector. For σs, I made up a vector (a, b, c) which is orthogonal to (l, m, k). And I equated all vectors.

I'm probably doing something wrong. Any help is appreciated!
 
Hello, I am not an expert on elasticity but this really looks quite straightforward. Let's first find the stress vector T (I'm using T instead of σ to avoid confusion with the stress tensor). You will get it by multiplying the (diagonal) stress tensor by your normal vector as T=(σ1l, σ2m, σ3n). It has two components as you wrote, Tn and Ts. The magnitude of Tn is simply the dot product of T and n and its direction is along n as you wrote. Vector Ts has to be the complement to the total stress vector.
And for the second part - the shear stress will be maximum if vector T lies in your plane, e.g. the dot product of T and n is zero.
 
Last edited:
zirkus
Let's first find the stress vector T

Whilst this thread properly belongs in the homework section, this needs comment.

What is a stress vector?
 
Studiot said:
Whilst this thread properly belongs in the homework section, this needs comment.

What is a stress vector?

Aha, he's probably talking about the traction vector.

However, this was very helpful. Thanks
 
What is a stress vector?
We defined it similarly like the article on wiki does, so I won't rewrite it...Stress on Wikipedia
Most likely there are other methods or other terminology, I'm not a native speaker so i can't tell the subtle differences that well, sorry about that.
 
Zirkus said:
We defined it similarly like the article on wiki does, so I won't rewrite it...Stress on Wikipedia
Most likely there are other methods or other terminology, I'm not a native speaker so i can't tell the subtle differences that well, sorry about that.

Thanks Zirkus!