Can somebody express this in terms of q,E,I,L,P.
d^2v / dx^2 = -P(l-x)-((q*(l-x)^2)/2) / (E*I)
To express the equation in terms of q, E, I, L, and P, we need to rearrange the equation and substitute the given variables.
The equation is:
d^2v/dx^2 = -P(l-x) - ((q*(l-x)^2)/2) / (E*I)
Let's break it down step-by-step:
Step 1: Rearrange the equation to make it more understandable:
d^2v/dx^2 = -P(l-x) - (q*(l-x)^2)/(2*E*I)
Step 2: Substitute the given variables into the equation:
In the given equation:
- 'q' represents a constant related to the load distribution
- 'E' represents the Young's modulus of the material
- 'I' represents the moment of inertia of the cross-section
- 'L' represents the length of the beam
- 'P' represents the applied load
So, the expression in terms of q, E, I, L, and P is:
d^2v/dx^2 = -P(L-x) - (q*(L-x)^2)/(2*E*I)