Something like this?

```
ClearAll[u, v, f];
f[z_] := Sin[z]
u[x_, y_] := Re@f[x + I*y];
v[x_, y_] := Im@f[x + I*y];
```

EDIT: This just produces the whole thing. If you want to just see what happens for a single path parallel to the imaginary axis, try

```
ParametricPlot[{u[5, y], v[5, y]}, {y, -3, 3}]
```

or for the same parallel to the real axis try

```
ParametricPlot[{u[x, 1], v[x, 1]}, {x, -3, 3}]
```

EDIT2: Interactive:

```
ClearAll[u, v, f];
f[z_] := Sin[z]
u[x_, y_] := Re@f[x + I*y];
v[x_, y_] := Im@f[x + I*y];
Manipulate[
Show[
Graphics[{Line[{p1, p2}]}, PlotRange \[Rule] 3, Axes \[Rule] True],
ParametricPlot[
{u[p1[[1]] + t (p2[[1]] - p1[[1]]),
p1[[2]] + t (p2[[2]] - p1[[2]])],
v[p1[[1]] + t (p2[[1]] - p1[[1]]),
p1[[2]] + t (p2[[2]] - p1[[2]])]},
{t, 0, 1},
PlotRange \[Rule] 3]],
{{p1, {0, 1}}, Locator},
{{p2, {1, 2}}, Locator}]
```

(ugly, yes, but no time to fix it now). Typical output:

or

The idea is that you can vary the line on the left hand side of the figures you give (by clicking around the plot, which amounts to clicking on the Argand diagram...) and see the corresponding images.