How to measure the slit size from given image using mathematica?

Extract lines at the edge of the object:

img = Import["https://i.stack.imgur.com/pT8aP.jpg"]
lines = ImageLines[EdgeDetect[FillingTransform[Binarize[img]]]];
HighlightImage[img, {Thick, Yellow, Line /@ lines}]

Mathematica graphics

From here you can rotate the image if you get the angle:

θ = Mean[ArcTan @@@ Subtract @@@ lines]
(* 1.67222 *)

ImageTransformation[img, RotationTransform[\[Theta] - Pi/2], 
 Padding -> 0, PlotRange -> All]

Mathematica graphics

and from here proceed how you would have if it wasn't tilted.

On the other hand, you can try the following as well. Here I take random points from one of the lines and find the minimum distance to the other line. I then take the mean of all of these minimum distances.

pts = RandomPoint[Line[lines[[2]]], 500];
Mean[RegionDistance[Line[lines[[1]]]] /@ pts]
(* 83.175 *)

in microns:

Mean[RegionDistance[Line[lines[[1]]]] /@ pts]*Quantity[6.7, "Microns"]
(* Quantity[556.521, "Microns"] *)

Here is an approach that requires no manual interaction:

g = Import["http://i.stack.imgur.com/pT8aP.jpg"];

shape = Position[ImageData[Binarize[g]], 1, {2}];
pc = PrincipalComponents[N@shape];
lm1 = Internal`ListMin[pc][[All, 2]];
lm2 = -Internal`ListMin[-pc][[All, 2]];

slitWidth = Mean[lm2] - Mean[lm1]

(* ==> 83.6331 *)

Here, I'm using the undocumented function ListMin from Daniel's answer here after first doing the image rotation automatically using PrincipalComponents as I also did here.

To see how this works, look at the points collected in PrincipalComponents:

ListPlot[pc, AspectRatio -> Automatic, PlotRange -> All]

components

The points making up the slit have been aligned so that we now only have to determine a measure of the vertical extent. This is what I do with ListMin.

Of course, you can now convert to physical units by multiplying the pixel count with the micron ratio:

6.7 slitWidth

(* ==> 560.342 *)