The function is,

$f\left(x\right)=2x^2-7x+3$.

The interval is $[0,4]$.

The signed area is,

$$\begin{gathered} {\int }_0^4(2x^2-7x+3)dx \\ =2{\int }_0^4{x}^{2}dx-7{\int }_0^{4}xdx+3{\int }_0^{4}dx \\ =2{\left[\frac{x^3}{3}\right]}_0^4-7{\left[\frac{x^2}{2}\right]}_0^4+3{\left[x\right]}_0^4=2[\frac{64}{3}-0]-7[\frac{16}{2}-0]+3\left[4\right] \\ =2\left(\frac{64}{3}\right)-7\left(8\right)+12 \\ =\frac{128}{3}-56+12 \\ =\frac{128-168+36}{3} \\ =\frac{-4}{3} \end{gathered}$$

Therefore, the signed area is $\frac{-4}{3}$.

The graph for the function is,

The absolute area is,

$$\begin{gathered} {\int }_0^4(2x^2-7x+3)dx \\ ={\int }_0^{0.5}(2x^2-7x+3)dx-{\int }_{0.5}^3(2x^2-7x+3)dx+{\int }_3^4(2x^2-7x+3)dx \\ ={\left[2\right(\frac{x^3}{3})-7(\frac{x^2}{2})+3x]}_0^{0.5}-\left[2\right[\frac{x^3}{3}]-7{\left[\frac{x^2}{2}\right]+3x]}_{0.5}^3+[2\left[\frac{x^3}{3}\right]-7{\left[\frac{x^2}{2}\right]+3x]}_3^4 =[\frac{0.25}{3}-\frac{1.75}{2}+1.5]-[\frac{53.75}{3}-\frac{61.25}{2}+7.5]+[\frac{74}{3}-\frac{49}{2}+3] \\ =\frac{17}{24}+\frac{125}{24}+\frac{19}{6} \\ =\frac{17+125+76}{24} \\ =\frac{218}{24} \\ =\frac{109}{12} \end{gathered}$$

Therefore, the absolute area is $\frac{1}{8}$.