As stated in the comments, the fourth derivative of x\log x on [1,3] is bounded by 2 in absolute value, hence in order to approximate \int_{1}^{3}x\log(x)\,dx = -2+\frac{9}{2}\log 3 ...

Your made the sign error in step 2 (as indicated by KaviRamaMurthy). As an alternative, you can simplify in step 2 before integrating: \int_0^{0.5}\left(\frac{x}{2} -x^2+\frac{(0.5-x)^2}{2}\right) dx= \int_0^{0.5}\left(\require{cancel}\cancel{\frac{x}{2}} -x^2+\frac{1}{8}-\cancel{\frac x2}+\frac{x^2}{2}\right) dx=\\ \int_0^{0.5}\left(-\frac{x^2}{2}+\frac18\right) dx= \left(-\frac{x^3}{6}+\frac x8\right)|_0^{0.5}= -\frac{1}{48}+\frac{1}{16}= \frac 1{24}. ...

As stated, part (c) is false (as Alex Ravsky shows). Suppose we change the definitions to: \begin{align} &M = \sup_{t\in [0,2]} f'''(t)\\ &m = \inf_{t\in[0,2]} f'''(t) \end{align} Then part (c) can ...

I am not sure what you mean by sizes of a, b, c. I assume you mean the values that they take. In this case note that you can assume a \le c \le b (all other cases are treated similarly) and you ...

Draw the graph of y=f(x)=x^3-x, or have software do it for you. This is very important, for if you don't what is written below will be "just words." Note that f(-x)=-f(x) for all x. That ...

I think your parametrisation must be y=t and x=t^{3}! The curve will hence be r(t) = (t^{3},t) and you want to find the work of the vector field (t^{2},t^{3}). Hence the integral \int\limits{-1}^{1} (t^{2},t^{3}) \cdot (3t^{2},1) dt = \int\limits_{-1}^{1} 3t^{4}dt=\frac{6}{5}