The discussion revolves around the correct equation for shear stress in the context of a physics test. The original poster expresses concern that the equation provided by their teacher may be incorrect, specifically questioning the validity of the equation F=Δx/l *A.
The discussion is active, with participants providing insights into the differences between shear stress and tensile stress. There are multiple interpretations of the equations being discussed, and some guidance has been offered regarding the correct formulation of shear stress as F/A.
There is an indication that the original poster is preparing for a test, which may impose constraints on the depth of understanding required. The conversation also highlights a potential misunderstanding of the equations related to shear and tensile stress.
The equation you gave is for tensile stress, not shear stress, and, you left out Young's modulus on the right hand side of the equation.tristanmagnum said:so then what would the equation be?
Even then, it is not, strictly speaking, the equation for the stress, right? Rather, it is the equation relating stress to strain.Chestermiller said:The equation you gave is for tensile stress, not shear stress, and, you left out Young's modulus on the right hand side of the equation.
That is the equation for shear deformation measured perpendicular to the length of a square element of the cross section.tristanmagnum said:what is this equatiomn Δl=(1/G)(F/A)l
That is the equation for shear deformation, not shear stress.tristanmagnum said:so is that what I am looking for ?
I've never seen an equation like this with the shear modulus G in it, and I have lots of experience with deformational mechanics. This is the equation for a tensile deformation, provided the G is replaced by the Young's modulus E (or some people use Y). For a shear deformation between two parallel plates separated by a distance Δy, the equation to use is (F/A)=GΔx/Δy, where F is the tangential force on the upper plate (a plane of constant y), Δx is the displacement in the x direction of the upper plate relative to the lower plate, A is the area of the plates, and G is the shear modulus = \frac{E}{2(1+\nu)}, where \nu is the Poisson ratio.tristanmagnum said:what is this equatiomn Δl=(1/G)(F/A)l