{"id":32389,"date":"2024-01-12T10:33:12","date_gmt":"2024-01-12T09:33:12","guid":{"rendered":"https:\/\/trioptics.com\/?page_id=32389"},"modified":"2024-04-24T09:43:40","modified_gmt":"2024-04-24T07:43:40","slug":"measurements-with-autocollimator","status":"publish","type":"page","link":"https:\/\/trioptics.com\/markets-solutions\/measurements-with-autocollimator\/","title":{"rendered":"Measurements with autocollimator"},"content":{"rendered":"

<\/div><\/div><\/div><\/div>

Measurements with autocollimator<\/p><\/h1><\/div>

Autocollimators are a combination of collimator and telescope sharing the same optical path via a beam splitter. Via the collimator functionality, the structure engraved on the reticle is imaged to infinity. The device under test is placed in the optical path and reflects the light back into the autocollimator. This reflected light is imaged into the camera plane of the autocollimator via the telescope funcitonality.<\/p>\n

\u00a0A typical application is the measurement of the tilt angle of the surface that reflects the light back into the autocollimator.<\/p>\n<\/div><\/div><\/div><\/div><\/div>

<\/div><\/div>

Angle measurement of optical components<\/h2><\/div>

<\/i><\/i><\/span>Wedge and deflection angle<\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

The parallel beam emerging from the autocollimator is reflected from both surfaces of the wedge. The wedge angle \u03b4 is given by:<\/p>\n

\u03b4 = d\/(2nf)<\/p>\n

where:<\/p>\n

d = displacement of the reflected image n-refractive index of glass
\nf = focal length of the autocollimator<\/p>\n

For fast measurement in optical manufacturing, the displacement d for a given angle tolerance and focal length f can be calculated and transferred to the illuminated reticle in form of a pinhole, so that the ascertainment of the component can be made on a \u201ego\u201c and \u201eno go\u201c basis:<\/p>\n

A) Wedge out of tolerance
\nB) Wedge at the tolerance limit
\nC) Wedge in tolerance<\/p>\n

\"\"<\/p>\n

The deflection angle through the wedge is given for small angles by:<\/p>\n

\u03b3 = d(n-1)\/(2nf)<\/p>\n<\/div><\/div><\/div>

<\/i><\/i><\/span>Internal angle of 90\u00b0 prisms<\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

The reflected images from the 90\u00b0 sides (which are insensitive against rotation around the roof edge) are diplaced by an amount x, if a deviation from 90\u00b0 angle \u03b1 is present.<\/p>\n

A presence of a displacement in height by the amount y proves a pyramid error \u03d3:<\/p>\n

\u03b1 = X\/(4nf)\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u03b3 = Y\/(4nf)<\/p>\n

n = refractive index of glass<\/p>\n

f = focal length of the autocollimator<\/p>\n<\/div><\/div><\/div>

<\/i><\/i><\/span>90\u00b0 angle of prisms<\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

The 90\u00b0 prism is put on an accurate flat surface. The emerging beam of autocollimator is reflected on the prism side and flat and returns along the original path if the angle is exactly 90\u00b0. No displacement appears in the eyepiece. Deviations from 90\u00b0 can be measured in the\u00a0eyepiece. The error size:<\/p>\n

\"\"<\/p>\n

\u03b1 = d\/(4f)<\/p>\n

where f= focal length of autocollimator. The sign -\/+ of the error is determined by defocusing the eyepiece: Moving the focal plane of the eyepiece towards objective lens, a negative error results if the distance d becomes smaller.<\/p>\n<\/div><\/div><\/div>

<\/i><\/i><\/span>45\u00b0 angle of prisms<\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

Measuring the 45\u00b0 angle of a prism two methods are possible:<\/p>\n

a) Relative measurement of 45\u00b0-angle<\/p>\n

To measure the 45\u00b0 angle a master prism is used. Both prisms are put on an accurate flat. The 90\u00b0 angle of the prism under test must be checked first, since the error of this angle will influence the measurement.<\/p>\n

b) Absolute measurement of 45\u00b0-angle<\/p>\n

The autocollimator is directed on one side of the 90\u00b0 angle. Two images will be produced from both sides of the prism. The internal reflection within the prism will produce a displacement d depending on the error of the 45\u00b0 angle \u03b1:<\/p>\n

\u03b1 = d\/(4nf) \u00b1 \u03b4\/2<\/p>\n

where \u03b4 is the error of 90\u00b0 angle.<\/p>\n<\/div><\/div><\/div>

<\/i><\/i><\/span>Deviation angle through prisms<\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

The autocollimator is mounted on an adjustable stand and can be tilted at any angle. A master prism is used to align the autocollimator to the mirror. The master prism is replaced by the prism under test and the angle difference is read through the eyepiece.<\/p>\n<\/div><\/div><\/div><\/div><\/div><\/div><\/div>

Checking the straightness, squareness, parallelism and flatness<\/h2><\/div>

The measurement of geometrical parameters of mechanical parts is a typical application in machine construction, machine tools and aerospace industry.<\/p>\n<\/div>

<\/i><\/i><\/span>Straightness <\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

A mirror is either moved along the surface or mounted on a movable part of the machine to be measured. The mirror is supported by balls or pins placed at a distance b known as base length. Deviations from straightness will result in tilt of the mirror. Deviation from straightness are given by:<\/p>\n

h =\u00a0b tan \u03b1<\/p>\n

where:<\/p>\n

\u03b1 = mirror tilt<\/p>\n

b = base length<\/p>\n

When computerized or electronic autocollimators are used, readings can be automatically entered into computer. The software program permits straightness measurement on machine tool slideways, shafting, stages, rolls etc.<\/p>\n<\/div><\/div><\/div>

<\/i><\/i><\/span>Flatness <\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

The base mirror is moved along diagonals and rectangles of the surface to be measured. Along each line a straightness measurement is carried out. The data from surface generators lines are used to calculate the shape of the surface and the deviations from flatness.<\/p>\n

The data can be entered into a computer to produce a topography of the surface under test.<\/p>\n

\"\"<\/p>\n<\/div><\/div><\/div>

<\/i><\/i><\/span>Squareness <\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

The procedure is similar with straightness measurement. The measurement of the first surface is made in the same way. Further an accurate pentaprism is used to transfer the autocollimator beam to the second surface. The straightness of the second surface is measured. The data are then combined and corrected for the error of the pentaprism.<\/p>\n<\/div><\/div><\/div>

<\/i><\/i><\/span>Rotary tables<\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

A reflecting polygon is put on rotary table or dividing head under test. One side of the polygon is squared to the optical axis of the autocollimator. The rotary table is set on zero. The rotary table with the polygon is rotated until next polygon side is square to autocollimator. The graduation of the table is compared with the expected angle.<\/p>\n<\/div><\/div><\/div>

<\/i><\/i><\/span>Parallelism of bearings<\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

The reference surface is aligned to the autocollimator. The autocollimator is fixed in this position. The mirror is transferred to next surface which is aligned to the same autocollimator.<\/p>\n

After the first bearing is squared to autocollimator, the mirror is transferred to the next bearing. Deviation from parallelism is read and the bearing aligned.<\/p>\n<\/div><\/div><\/div>

<\/i><\/i><\/span>Parallelism of rolls<\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

A mirror mounted on a V-block is put on the first (reference) roll. After adjustment, the mirror is square to autocollimator. The reference roll is now aligned along X-axis of the autocollimator. The mirror is transferred to the next rolls and the procedure repeated. Two spirit levels mounted on the V-block can be used for levelling the rolls.<\/p>\n<\/div><\/div><\/div><\/div><\/div><\/div><\/div>

Measurement of optical and optomechanical parameters<\/h2><\/div>

<\/i><\/i><\/span>Radius of curvature<\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

Additional achromats are mounted on the one end of the autocollimator tube. The illuminated image of the autocollimator will be projected into the focal plane of the achromat. This image is reflected back from the vertex of the sample and the center of curvature of sample’s surface. The linear displacement between these two positions – where a sharp image is seen in the eyepiece – gives the radius of curvature.<\/p>\n

Both concave and convex surfaces can be measured. Spherical and cylindrical surfaces can be measured as well. For convex surfaces the back focal length of the achromat must be longer than the radius under test.<\/p>\n<\/div><\/div><\/div>

<\/i><\/i><\/span>Radius of curvature \u2013 flat surfaces<\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

For measurement of very long radii of curvature focusing autocollimators with draw out tubes can be used. Drawing out the tube with the autocollimation head, the autocollimator can be focused on the lens vertex and center of curvature. Since the nearest focus point for a focusing autocollimator is in a distance of some meters and the focusing on the vertex is practically difficult, following configuration is recommended:<\/p>\n

The lens under test is positioned with the vertex at a distance f from autocollimator lens (f = effective focal length EFL of the autocollimator). After focusing in the center of curvature of the lens, the radius is given by:<\/p>\n

R = f\u00b2\/d<\/p>\n

where d = displacement of the draw out tube read off on its scale.<\/p>\n<\/div><\/div><\/div>

<\/i><\/i><\/span>Flange focus<\/span><\/a><\/h4><\/div>
\n

\"\"<\/p>\n

The flange focus known also as Flange Focal Length (FFL) or Flange Focal Distance (FFD) is the distance between the locating surface of the lens mount and the image plane. Checking and setting of this distance is important especially for camera lenses. The film plane is replaced by a mirror mounted on an adjustable jig.<\/p>\n

For checking the FFL when the lens under test is set to infinity a standard autocollimator (1) is used. For testing the lens set at other distances as infinity is recommended:<\/p>\n