Abstract:
A device and method is disclosed that measures the angular orientation of one surface to another. The device consists of two frames with defined measuring points. The relative distances between the points are measured and then used to determine the angular orientation of the surfaces relative to each other. The measuring method is adapted for the accurate measurement of very small angular differences.  
     The frames can be adapted to measure angular orientation of many surfaces that are otherwise difficult to measure. The device is particularly suited to measuring small parallel angular differences between two rolls.

Description:
RELATED APPLICATIONS  
       [0001]    This application claims the benefit of U.S. Provisional Patent Application Ser. No. 60/474,799 filed on Jun. 2, 2003. 
     
    
     
       STATEMENT REGARDING FEDERALLY SPONSORED RESEARCH OR DEVELOPMENT  
         [0002]    Not Applicable.  
         REFERENCE TO SEQUENCE LISTING, A TABLE, OR COMPUTER PROGRAM LISTING  
         [0003]    Not Applicable.  
         BACKGROUND OF THE INVENTION  
         [0004]    1. Field of the Invention  
           [0005]    The present invention is generally directed to measuring small relative angular orientation differences between two surfaces; such as roll bodies or other equipment surfaces.  
           [0006]    2. Discussion of the Prior Art  
           [0007]    A. Roll Parallel Measurement  
           [0008]    The most common small angle parallel measuring method involves using surveyor instruments to measure the position of a roll against a nearby offset reference line. A survey transit, for example, is adjusted to be parallel to a reference line and the reference line is perpendicular to the roll to be measured. The transit is then rotated exactly 90 degrees giving a line of sight that is approximately parallel to the roll. A ruler is placed on each end of the roll and the transit line of sight is used to read the crosshair position at each ruler position. The difference in readings indicates if the roll is perpendicular to the offset reference line. The measurement of roll to roll parallel is performed by measuring each roll separately against the same offset reference line. The survey transit may need to be relocated for each roll to be measured. Optical tooling may be used instead of survey instruments for higher accuracy.  
           [0009]    The accuracy of this method has been improved by using lasers and electronic measurements of the laser position instead of a visual line of sight and rulers. However, the improved equipment is relatively expensive and requires specialized training. It can also be time consuming to obtain the desired measurement when the roll is in an awkward position or hidden behind obstructions requiring the need for specialized equipment setups and fixtures.  
           [0010]    In U.S. Pat. No. 3,947,970 Lesure describes a roll alignment gauge that is useful for roll alignment when one roll is directly above another roll. The device is essentially a vertical level that is adapted to measuring roll to roll twist with a micrometer. In U.S. Pat. No. 5,579,585 Schaeffer describes a device that projects a vertical and horizontal axis of a roll surface to determine alignment to an offset line, but surveyor methods and equipment are still required to actually measure the roll orientation.  
           [0011]    B. Other Surfaces—Parallel Measurement  
           [0012]    The use of survey methods, previously mentioned, is also applicable to a range of equipment surfaces and various kinds of machinery. The measuring methods for checking machinery surfaces for parallel orientation are essentially the same. The use of laser beams and electronic laser beam detectors are particularly suited to measuring the relative alignment of various surfaces and edges to a very high accuracy.  
           [0013]    The use of inside micrometers to measure the parallel alignment between two surfaces is also a common way to measure small differences parallel orientation. This is useful when the measuring surfaces are readily available, correctly oriented to each other, closely spaced, and there is no obstructing equipment. However, in actual practice, the measuring surfaces may not be conveniently disposed to each other to facilitate such measurement. The surfaces to be checked may not be two parallel planes correctly oriented to each other, which is troublesome to measure accurately with standard measuring equipment. The surfaces may be a significant distance apart, beyond the measuring range of commonly available instruments. The surfaces may be rounded, making it particularly difficult to measure parallel orientation.  
         BRIEF SUMMARY OF THE INVENTION  
         [0014]    Accordingly, it is the object of this invention to provide convenient, direct, and accurate measurement of small orientation angles between two surfaces free of the use of surveyor methods. The orientation is measured in a two dimensional plane. Other objects, advantages, and contributions are set forth in the disclosing embodiments of the invention. 
       
    
    
     BRIEF DESCRIPTION OF THE SEVERAL VIEWS OF THE DRAWINGS  
       [0015]    [0015]FIG. 1 shows a preferred embodiment where spherical measuring points are strategically placed on the two frames and a relative distance measurement is performed using a dial indicator on the end of a rigid rod.  
         [0016]    [0016]FIG. 2 is another preferred embodiment where the two frames are mounted on the surfaces of two rolls.  
         [0017]    [0017]FIGS. 3A and 3B are an enhancement of the device in FIG. 2. A locking rod can be used to stabilize the rotational positions of the two frames relative to each other without influencing the angular orientation measurement.  
         [0018]    [0018]FIGS. 4A and 4B show another embodiment where a relative distance measurement is done with a string attached to a measuring device that provides tension.  
         [0019]    [0019]FIG. 5 shows a simplified representation of the two frames demonstrating how the calculation of the angular orientation is performed by measuring the orientation of each frame relative to a reference line.  
         [0020]    [0020]FIG. 6 shows another simplified representation of the two frames demonstrating another method of calculating the angular orientation to a reference line.  
         [0021]    [0021]FIG. 7 shows another simplified representation of the two frames demonstrating another calculation of the non-parallel alignment angle and the frame offset distance. 
     
    
     DETAILED DESCRIPTION OF THE INVENTION  
       [0022]    In general, the device consists of two precision frames that are attached to the surfaces to be measured. The frames include measuring points that are in a defined and parallel relationship to the surfaces to be measured. The reference points provide accurate and convenient measurement of the relative orientation of the two frames. Common measuring devices are then adapted to measure the relative distance between the points on the two frames. The measuring devices and computational methods are tailored to the calculation and accurate measurement of very small non-parallel orientation angles.  
         [0023]    In one preferred embodiment, the device is capable of measuring the non-parallel angle between two flat surfaces. In this case, the device consists of two substantially identical frames that are mounted on the surfaces to be measured. The frames include at least two measuring points parallel to the surfaces. The measuring points are defined by small round spherical sections that are carefully positioned. The spherical sections facilitate accurate measurement of the relative distance between the frames using highly sensitive measuring instruments. The use small spherical sections also removes the need for a particular rotational orientation between the two surfaces.  
         [0024]    The measuring points can be also be defined by a variety of shapes such as clips, grooves, rings, cups, concave curves, convex curves, holes, hooks, magnets, flat surfaces, triangles, cones, rounded ends on various shapes, and the like.  
         [0025]    The frames can be adapted to measuring the non-parallel angle between other surfaces. In another preferred embodiment, the device can be adapted to measuring the non-parallel angle between the surfaces of two rolls. In this case, the device consists of two substantially identical frames that are mounted on the radial surfaces of the two rolls to be measured. A v-groove in the frame aligns the frame to the roll surface.  
         [0026]    The calculation method for the parallel orientation angle between the two frames is made considering the relative accuracy of the measurement of each component. One component is a differential distance measurement that can be performed by highly accurate instruments commonly available. Another component is the nominal distance between measuring points that can be measured by ordinary steel tapes.  
         [0027]    The differential distance measurements can be made using inside micrometers, scales, calipers, dial indicators, electronic distance measuring devices, and the like. A preferred embodiment is to use a dial indicator attached to the end of an adjustable length rod. Because differential distance measurements are needed to a high accuracy, a dial indicator with a very fine resolution may be employed. A dial indicator with a resolution of 0.001″ or better is most preferable. If the two frames are made to accurate machining tolerances, angular orientation measurements less than 0.00005 radians are obtainable.  
         [0028]    If a dial indicator is used for the differential distance measurement, the ends of the adjustable length rod and dial indictor rod can be adapted for highly repeatable measurements. Counter-bored ends provided enhanced repeatability and accuracy when using spherical shaped measuring points. The ends can be counter-bored as a straight hole or a cone.  
         [0029]    The calculations assume that the measuring points between the two frames are in substantially the same plane. Significant out of plane twist between frames is detrimental to the calculations. Fortunately, it is the normal case for the equipment surfaces to be substantially in the same plane. The allowable out of plane twist varies with the distance between the frames, the symmetry of the twist, the spacing of the measuring points on each frame, and the desired measuring error. However, the out of plane twist should be no worse than 0.1 radians, and preferably less than 0.01 radians for closely spaced frames.  
         [0030]    In most cases, equipment surfaces may be checked for level to see if they present potential out of plane twist problems. It may be convenient to add bubble vials to the two frames to provide for level measurement.  
         [0031]    In another preferred embodiment, it is possible to measure the differential distances between the two frames using a string, fine chain, or wire under tension. For example, a string can be attached to a highly accurate measuring device that provides a steady tension. The string and measuring device can be moved from one measuring pair of points to another. The difference in distance is thereby determined. A highly accurate measurement is obtained by using a fine measuring instrument, such as a dial indicator, that is attached to the string. Even string tension can be provided by a spring.  
         [0032]    The two frames may also be adapted for the accurate measurement of the frame perpendicular angle relative to a reference line defined by the position of the two frames. Three equally spaced measuring points can be placed on each of the two frames in a manner to allow the non-perpendicular angle of the frames relative to a centerline between the two frames to be measured.  
         [0033]    Some rolls are manufactured to include a crown. That is, they have a slightly larger diameter in the middle. The non-parallel alignment angle still can be measured accurately provided that any out of plane twist between measuring points is minimized.  
         [0034]    When measuring roll parallel orientation, the weight of the frames may cause the roll to rotate which presents difficulties with making accurate measurements. A clamp may be added to each frame so that a stabilizing bar may be used between the two frames to prevent roll rotation during the measurement. If the two frames are installed and strapped to the rolls first, the stabilizing rod can be clamped in a manner that does not change the parallel angle measurement. Counter weights may also be employed to prevent rotation.  
         [0035]    In another preferred embodiment, the relative longitudinal position of the two frames can be accurately measured. An additional differential distance measurement between measuring points can be made and the relative longitudinal offset distance between the frames can be calculated very accurately. This measurement is useful when rolls need to be centered to each other on the processing line. The frames can be centered on the rolls and then the horizontal offset measured from one frame to another.  
         [0036]    [0036]FIG. 1 shows an embodiment of the invention where the measurement of the non-parallel angle is performed by using defined measuring points. The non-parallel alignment angle is to be determined for two flat surfaces  101 ,  102  where one surface is not perpendicular to the x-z plane. The two duplicate frames  103  are attached to the surfaces  101 ,  102  with straps  110 . A dial indicator  104  is attached to a rigid rod  105  and the measurement of the distance between the two measuring points  106  and  107  is shown. A second measurement is obtained between points  108  and  109 . The change in the dial indicator reading (Δd) and the width (W) between points  106  and  108  are used to calculate the non-parallel angle (β) between the two surfaces  101 ,  102 .  
             β   =       sin     -   1            (       Δ                 d     W     )               (   1   )                               
 
         [0037]    The non-parallel angle (β) is measured in the plane defined by the measuring points  106 ,  107 ,  108 , and  109 .  
         [0038]    In actual measuring practice, the rigid rod  105  will have a minor amount of droop. For short distance measurements, the droop is negligible. For longer distance measurements, the droop can be significant. Since only the difference in distance is needed, droop is not a problem provided it is consistent between measuring point pairs. This can be controlled by not rotating the measuring rod  105  between measurements. Also, the rod can be made from very stiff materials.  
         [0039]    [0039]FIG. 2 shows the frame arrangement for the non-parallel angle measurement of two rolls. The two frames  201  do not have to be centered on the rolls for equation 1 to be accurate. The frames may be offset along their respective roll central longitudinal axis. In this figure, the frames  201  have three measuring points  202  on three different surfaces. For clarity, only two typical measuring points  202  are indicated. The multiple measuring surfaces allow measurement at different roll rotations.  
         [0040]    [0040]FIG. 3A shows an embodiment of the invention where the rolls need to be stabilized by attaching an anti-rotating stabilizing bar  301  to the end of the frames  302  using a sliding collar  303 . The detail view in FIG. 3B shows that the collar  303  is attached to the frame  302  by pins  304  that allow rotation perpendicular to the x-z plane so that the stabilizing bar  301  does not alter the angular position of the frames  302  on the roll surfaces. The stabilizing bar  301  may be allowed to slide freely through the opening in the collar  303  or it may be rigidly attached by locking thumbscrew  305 .  
         [0041]    [0041]FIG. 4A shows an embodiment of the invention where the relative measurement of distance is performed by a change in length of a string  405 . Two rolls  401 ,  402  are shown with duplicate frames  403 ,  404  and a change in length measuring device mounted on a base plate  412  that can be moved between two positions on frame  403  through mounting holes  406  and positioning pins (not shown) under the base plate  412 .  
         [0042]    [0042]FIG. 4B shows a detail view of a spring  409  that is attached to a dial indicator  410  which provides string tension through the dial indicator measuring rod. A freely rotating pulley wheel  411  redirects the string to the measuring point. The dial indicator  410 , spring  409 , and pulley wheel  411  are mounted on a base plate  412 . Stops  413  are anchored to the base plate  412  to protect the dial indicator from over travel. In FIG. 4A the base plate  412  is temporarily positioned on the frame  403  at one measuring position. To obtain a second reading, the base plate  412  is lifted and moved to a second measuring position on the other end of the same frame  403 . The string is also moved to the second measuring position  408  on the other frame  402 . An accurate method is needed to attach the string to the measuring points  407 ,  408  which could also include magnets, clamps, grooves, shapes, clips, and the like. FIG. 4A demonstrates a hook style.  
         [0043]    In some equipment alignment situations, the surfaces need to be aligned to a reference line that runs down the center of multiple surfaces. Additional calculations can be used to calculate individual angular orientation to the center of the frames.  
         [0044]    [0044]FIG. 5 shows a simplified top view representation of the two frames  51 ,  52  that highlights the measuring points  53 ,  54 ,  55 ,  56 ,  57 , and  58 . The distances between the measuring point pairs  53 - 56  (d1),  55 - 58  (d2),  53 - 58  (S 3 ),  55 - 56  (S 4 ), and  54 - 57  (d) are shown. The reference line  59  goes through points  54  and  57 . The calculation of the angles β1 for unit  51  and angle β2 for unit  52  relative to the reference line are:  
                 Δ                 d     =       d1   -     d2                 Δ                 S       =     S3   -   S4                            (   2   )               S   =             W   2     +     d   2         ≈         S3   +   S4     2                   d       =       d1   +   d2     2                                 β1   =       sin     -   1            [       1     2                 W            (         S        (     Δ                 S     )       d     +     Δ                 d       )       ]                                              β2   =       sin     -   1            [       1     2                 W            (         S        (     Δ                 S     )       d     -     Δ                 d       )       ]                                                            
 
         [0045]    where the angles β1 and β2 are positive when rotated clockwise and are the deviation from perpendicular to the reference line. The calculations in equation 2 are accurate when the angles β1 and β2 are less than 5 degrees because small angle assumptions were used. The non-parallel angle between the two surfaces is simply the difference between angles β1 and β2.  
         [0046]    [0046]FIG. 6 shows a simplified top view representation of two duplicate frames that highlights the measuring points for measuring the non-perpendicular angle β of the frame  60  in reference to a line  65  between points  61  and  63  on the frames. When β is zero, a line between points  62  and  64  is perpendicular to line  65 . The distances between the measuring point pairs  61 - 62  (S 1 ),  61 - 64  (S 2 ),  62 - 64  (W), and  61 - 63  (d) are shown. The non-perpendicular angle β between the two frames is calculated by:  
             S   =             d   2     +       W   2     4                       Δ                 S     =       S2   -     S1                 β       =       sin     -   1            (       S        (     Δ                 S     )         W                 d       )                   (   3   )                               
 
         [0047]    The dimension ΔS is a change in length and can be measured by the methods already disclosed. Fine resolution of ΔS is required. The dimensions d and W are nominal lengths that can be measured with a steel tape.  
         [0048]    [0048]FIG. 7 shows an embodiment of the invention where the measurement of the non-parallel angle β, and the horizontal offset distance ΔX, are obtained by using defined measuring points. Again, the top view is shown of two duplicate frames  71  and  72 . The distances between the measuring point pairs  73 - 76  (d1),  74 - 77  (d),  75 - 78  (d2),  73 - 78  (S 3 ),  75 - 76  (S 4 ), and  76 - 78  (W) are shown. The horizontal offset distance ΔX and the non-parallel angle β between frames  71  and  72  can be calculated by:  
                       Δ                 d     =       d1   -     d2                 β       =       sin     -   1            (       Δ                 d     W     )                                    Δ                 S     =       S3   -     S4                 Δ                 X       =         S        (     Δ                 S     )       +     d        (     Δ                 d     )           2                 W                       (   4   )                               
 
         [0049]    This series of equations assumes that the offset distance ΔX is small compared to the width W. The non-parallel angle β is measured relative to the line defined by the measuring points  73 ,  74 , and  75 .  
         [0050]    The determination of ΔX provides for additional understanding of the in plane angular orientation of the surfaces to each other. For example, when is ΔX is not zero, the measuring points define a parallelogram when β=0.  
         [0051]    While various embodiments of the present invention have been described, the invention may be modified and adapted to various angular measurements to those skilled in the art. Therefore, this invention is not limited to the description and figures shown herein, and includes all such changes and modifications that are encompassed by the scope of the claims.