Dear all,
Please find attached the system I'm intresting.
Let's consider an infinite beam (b=infinite) supported on springs from x to the end, with uniform load.
From timoshenko beam theory I'm looking for the tensor stress acting at the base on a quasi-static test.
I have to questions:
1. How to compute the length (Lambda) where the beam deflection is acting, I think Lambda should be function of elastic modulus of the beam (E_1) spring elastic modulus (E_2) and beam height (D_1). Assumption: the beam tip never touch the base.
2. How to compute the stress tensor acting at the base (sigma(x)).
for sigma(x<a)=0
for sigma(x>a+Lambda)=rho g D_1
Could you please help me and provide me some lecture/tips to reach the solution?
Best regards,
Greg B
Please find attached the system I'm intresting.
Let's consider an infinite beam (b=infinite) supported on springs from x to the end, with uniform load.
From timoshenko beam theory I'm looking for the tensor stress acting at the base on a quasi-static test.
I have to questions:
1. How to compute the length (Lambda) where the beam deflection is acting, I think Lambda should be function of elastic modulus of the beam (E_1) spring elastic modulus (E_2) and beam height (D_1). Assumption: the beam tip never touch the base.
2. How to compute the stress tensor acting at the base (sigma(x)).
for sigma(x<a)=0
for sigma(x>a+Lambda)=rho g D_1
Could you please help me and provide me some lecture/tips to reach the solution?
Best regards,
Greg B
