Final answer:
To find where the force on the mass is zero, differentiate the potential energy function and solve the resulting quadratic equation to get the x-values.
Step-by-step explanation:
To find the location(s) where the force on the mass is zero, we need to take the derivative of the potential energy function U(x) with respect to x which gives us the force as a negative gradient of the potential energy (-dU/dx). The given potential energy is U(x) = (2.0 J/m3)x3 - (15 J/m2)x2 + (36 J/m)x - 23 J. The force function is then F(x) = -dU/dx = -6.0x2 + 30x - 36. To find the values of x where F(x) = 0, we set this expression equal to zero and solve the quadratic equation.
The solutions to the quadratic equation of the form ax2 + bx + c = 0 are given by x = (-b ± sqrt(b2 - 4ac)) / (2a), which in this case translates to x = (30 ± sqrt(302 - 4*6*36)) / (2*6).
After calculating, we get the two x-values where the force on the mass is zero, which you can check against the given options.