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DEPARTMENT OF GEOMATICS ENGINEERING
TOPOGRAPHY
2012 – 2013 SPRING TERM
WEEK 4
CLASS PRESENTATIONS FOR SURVEYING I COURSE BY E.TARI, H. KARAMAN
ISTANBUL TECHNICAL UNIVERSITY
1ITU DEPARTMENT OF GEOMATICS ENGINEERING
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ANGLES AND DIRECTIONS
Determining the location of points and orientations of linesfrequently depends on measurements of angles and directions.
Angles measured in surveying are classified as either horizontal orvertical, depending on the plane in which they are observed.
Angles are most directly observed in the field with theodolites andtotal stations.
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ANGLES AND DIRECTIONS
An angle is defined as the difference in direction between twoconvergent lines. Three basic requirements determine the angle.
Figure:1(C.D.Ghilani & P.R.Wolf,2008)
As shown in this figure:1,
(1) reference or starting line
(2) direction of turning
(3) angular distance (value of the angle).
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ANGLES AND DIRECTIONS
Figure:2 (Ü.Öğün, Topografya Ders Notları)
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ANGLES AND DIRECTIONS
Vertical line: is a line that follows the direction of gravity as indicatedby a plumb line. (Figure2: ZN line)
Horizontal line: is a line in a horizontal plane. In plane surveying, aline perpendicular to the vertical. (Figure2: OA and OB line)
Horizontal plane: is a plane perpendicular to the direction of gravity.In plane surveying, a plane perpendicular to the plumb line.(Figure2: R plane)
Vertical plane: is a plane, including vertical line, perpendicular tohorizontal plane. (Figure2: P1 and P2 plane)
Horizontal angle: is formed by the directions to two objects in ahorizontal plane. (Figure2: ß angle, BOA angle)
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ANGLES AND DIRECTIONS
(Basic Surveying The Theory and Practice,2000. )
Level surface: is a curved surface that every point is perpendicularthe plumb line.
Plumb line: is a line that follows the direction of gravity.
Vertical angle: is formed by two intersecting lines in a vertical plane,one of these lines horizontal.
Zenith angle: is the complementary angle to the vertical angle and isformed by two intersecting lines in a vertical plane, one of theselines directed toward the zenith.
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ANGLES AND DIRECTIONS
Vertical angles:
Z : zenith angle
N : Nadir angle
α : slope angle
(vertical angle)
N : 200g - Z
Z + α = 100g
Figure:4 (Ü.Öğün, Topografya Ders Notları)
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ANGLES AND DIRECTIONS
Figure:5 (C.D.Ghilani & P.R.Wolf,2008)
In the Figure:5; OAB and ECD are horizontal planes, and OACE andABDC are vertical planes.
Then as illustrated, horizontal angles, such as angles AOB, andhorizontal distances OA and OB , are measured in horizontal planes.
Altitude (vertical) angles, such as AOC, are measured in verticalplanes; zenith angles, such as EOC, are also measured in verticalplanes; vertical lines, such as AC and BD, and slope distance, suchas OC, are determined along inclined planes.
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Theodolite:
A theodolite is an instrument which is used primarily to measureangles, both horizontal and vertical. It is also used for many othersubsidiary work during surveying such as setting up of intermediatepoints between inter visible points, establishment of inter visiblepoints, prolonging a line, laying out traverse etc.
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Types of theodolites:
Classification with respect to a construction:
Open-faced, vernier-equipped engineer’s transit
Optical theodolites with direct digital read-outs or micrometer-equipped read-outs (for more precise readings)
Electronic theodolites
Classification with respect to accuracy:
One-minute theodolites : the least division of the scale is 1 or 2minutes
One-second theodolites : the least division of the scale is 1 or 2seconds
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Theodolite:
Figure:6 (E.Tarı , M.Sahin , Surveying II Lecture Notes)
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Theodolite:
Figure:7 (E.Tarı , M.Sahin , Surveying II Lecture Notes)
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Theodolite:
Geometry of theodolite:
Figure:8 (Barry F. Kavanagh,2009)
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Theodolite:
Components of theodolite:
Figure:9 (E.Tarı , M.Sahin , Surveying II Lecture Notes)
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Theodolite:
Components of theodolite:
The vertical axis of these instruments goes up through the centerof the spindles and is oriented over a specific point on the earthsurface. The circle assembly and alidade rotate about this axis.
Horizontal axis of the telescope is perpendicular to the verticalaxis, and telescope and vertical circle tilt on it.
The line of sight (line of collimation) is a line joining theintersection of the reticle crosshairs and the center of the objectivelens. The line of sight is perpendicular to the horizontal axis andshould be exactly horizontal when the telescope level bubble iscentered and when the vertical circle is set at 100g – 300g or 0g forvernier transits.
Plate bubble axis is assumed to be tangent to the plate bubble.
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Theodolite:
Axes of theodolite:
SS: Vertical (standing) axis
TT: Horizontal (Trunnion) axis
PP: Plate bubble axis
CC: Collimation axis(line of sight)
Figure:11
Figure:10( H.Özener , Surveying Lecture Notes)
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Theodolite:
Axes of theodolite:
The most important relationships are as follows:
1. The axis of plate bubble should be in a plane perpendicular to thevertical axis.(main axis order).
2. The line of sight should be perpendicular to the horizontal axis.
3. The horizontal axis should be perpendicular to the vertical axis.
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Theodolite:
Instrument setup:
At each station point, before taking any observation, it is requiredto carry out some operations in sequence. The set of operationsthose are required to be done on an instrument in order to make itready for taking observation.
Setting
Centering
Leveling
Focusing
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Theodolite:
Instrument setup:
1. Tripod height – upper about chest height to make observation
easily. Place the instrument over the point with the tripod plate as
level as possible. Then place the theodolite on the top of tripod.
Theodolite must be hold by hand until the theodolite is attached to
tripod head.
2. Check that the station point can be seen
through the optical plummet. (Rotate the
focus reticle – pull in or out to focus
on the ground- monument)
Figure:11 ( H.Özener, Lecture Notes)
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Theodolite:
Instrument setup:
Then push in the tripod legs firmly by pressing down on thetripod shoe spurs. If the point is now not visible in the optical plumbsight, leave one leg in the ground, lift the other two legs, and rotatethe instrument, all the while looking through the optical plumb sight.When the point is sighted, carefully lower the two legs to the groundand reseat them keeping the station point view.
While looking through the optical plumb, manipulate the levelingscrews until the crosshair of the optical plummet is directly on thestation mark.
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Theodolite:
Instrument setup:
Figure:12 (E.Tarı , M.Sahin , Surveying II Lecture Notes)
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Theodolite:
Instrument setup:
Figure:13 (H.Özener , Surveying Lecture Notes)
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Theodolite:
Instrument setup:
3. Level the theodolite circular (pond) bubble by adjusting the tripodlegs up or down (approximate leveling). This is accomplished bynoting which leg, when slid up or down , moves the circular bubbletoward the bull’s eye. Upon adjusting the leg, either the bubble willmove into the circle, or it will slide around until it is exactly oppositeanother tripod leg. That leg should then be adjusted up or downuntil the bubble moves into the circle. If the bubble does not moveinto the circle, repeat the process. If this manipulation has beendone correctly, the bubble will be centered after the second leg hasbeen adjusted;
Perform a check through the optical plummet to confirm that it isstill close to being over the station mark / turn one or more levelingscrews to be ensure that circular bubble is now exactly centered (ifnecessary).
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Theodolite:
Instrument setup:
Figure:15
Figure:14 (H.Özener , Surveying Lecture Notes)
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Theodolite:
Instrument setup:
The instrument can be now be leveled precisely by centering theplate (tubular) bubble.
a) Set the plate bubble so that it is aligned in the same direction astwo of the foot screws. Turns these two screws in opposite directionuntil the bubble is centered.
b) Turn the instrument 100g , at which plate bubble will be alignedwith the third leveling ( foot) screw. Finally turn that third screw tocenter bubble.
Figure:15 (Ghilani & Wolf, 2008)(a) (b)
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Theodolite:
Instrument setup:
Finally, check the axis of plate bubble should be in a planeperpendicular to the vertical axis. main axis order). It is alwayschecked by turning the instrument through 200g . If the plate bubbleis centered , the instrument is leveled.
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Theodolite Sightings:
The telescope are short, have reticles with crosshairs etched onglass, and are equipped with rifle sight or collimators for roughpointing. Most telescope have two focusing controls. The objectivelens control is used to focus on the object being viewed. Theeyepiece control is used to focus on reticle. If the focusing of thetwo lenses is not coincident, a condition known as “parallax” willexist.
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Theodolite Sightings:
Parallax is the apparent motion of an object caused by amovement in the position of observer’s eye. The existence ofparallax can be observed by quickly shifting one’s eye positionslightly and watching for movement of the object in relation tocrosshairs. Careful adjustment of the eyepiece and objective lens willresult in a sharp image of both the object and the crosshairs with novisible parallax. Since the eye tends to tire through use, thepresence of parallax should be checked throughout the day.
A common mistake of beginners is to have a colleague “check”their pointing. This is not recommended for many reasons includingthe personal focusing differences that exist between differentindividuals.
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Theodolite Sightings:
Some typical theodolite diaphragms:
( Figure:16)
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Theodolite Sightings:
Some typical theodolite diaphragms:
Face left Face right
( Figure:17)
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Theodolite Sightings:
This is the sort of target that we have fixed to the wall outside
we need to superimpose the theodolite diaphragm over the
target.
Going for the centre point is difficult particularly if the central line of the target is not vertical.
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Theodolite Sightings:
Because of the “hole” in the lines of the diaphragm
this is still not good practice. I am not sure that I am
lined up on the top point.
Figure: 18
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Theodolite Sightings:
This is much better. I can repeat this alignment with
a fair degree of certainty.
This is how we should sight a target for horizontal
angle.
Figure: 19
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Theodolite Sightings:
This is how we should sight a target for
vertical angle measurements.
Figure:20
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ANGLE MEASUREMENT
Reading observations:
1. Reading microscope :
Reading directly on the
microscope :
108g 40c
Estimate the value between
two mean reading lines:
08c
Figure:21 Reading: 108g 40c + 08c =
108g 48c
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ANGULAR MEASUREMENT
Reading observations:
2. Scala microscope:
Vertical angle reading:
V = 291g 86c
Horizontal angle reading:
H = 372g 08c
Figure:22
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ANGULAR MEASUREMENT
Reading observations:
3. Optic micrometer microscope:
Horizontal angle reading:
218,758 grad
Figure:23 (unknown)
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ANGULAR MEASUREMENT
Reading observations:
4. Optic micrometre coincidence microscope:
Reading angle :
Direct reading : 105g 80c
Reading from micrometer : 2c 24cc
Total reading : 105g 82c 24cc
Figure:24 (unknown)
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Observing horizontal angles:
Horizontal angles are observed in horizontal planes. The theodoliteis set properly set over the instrument station and leveled, sight onthe left-hand station (usually), clamp the horizontal movement, andthen set the vertical crosshair precisely on the station by using thefine adjustment screws; second, set the scales to zero(usually) orsome other required value by turning the appropriate screws; third,loosen the clamp and turn the instrument until it is pointing at thesecond (right hand) station, set the clamp and use the fine adjustingscrew to precisely sight the vertical crosshair on that station; fourth,read and book the angles. To help eliminate mistakes and toimprove precision, angles are measured twice. Therefore, theodoliteis turning face II ,once with the telescope normal (right-side up) andonce with the telescope reverse (upside-down).
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Observing horizontal angles:
Firstly, re-sight the second station point (right-hand or foresight)in Face II as described above and then re-sight first station point (left-hand or back sight) in Face II. The mean angle determined bydirect and reversed observations.
P1 – station point
P2 – left target (back sight)
P3 – right target (foresight)
B : horizontal angle (clockwise)
Face I = P2 then P3 observations
Face II =P3 then P2 observations
Figure:25
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Observing horizontal angles:
To measure an angle set with a directional theodolite:
Point to the backsight in the direct position, lock on the targetand record the plate reading. Although not mathematically necessary, weset he horizontal circle to zero to simplify the calculations and to aid in anynecessary debugging of the data.
Loosen the horizontal motion and turn to the foresight. Lock thehorizontal motion, perfect the sighting, then record the horizontal platereading.
Loosen both horizontal and vertical motions, plunge the scopeand point to the foresight. Again (in the reverse position) lock thehorizontal motion, perfect the sighting and record the horizontal platereading.
Loosen the horizontal motion and turn to the backsight, lock thehorizontal motion, perfect the sighting and record the horizontal platereading.
This completes one set. Depending on the accuracy required additional setsshould be turned.
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Observing horizontal angles:
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Observing vertical angles:
A zenith angle is read on the vertical circle after pointing at atarget. (the direction to the zenith is given-vertical).
The vertical circle rotates with tilting of the telescope and indexesof the reading scale are (or should) be in horizontal position during ameasurement of the zenith angle.
The correct position of the indexes is ensured by;
Collimation (index) level – older types of theodolites
Compensator – it works automatically (modern instruments)
The mentioned requirements for axes of the theodolite have tobe fulfilled during a measurement of zenith angle too.
In addition to these requirements, a reading on the vertical circleshould be 100g if the line of sight is horizontal. There is so-calledindex error if this requirements is not fulfilled. It is possible to avoidthis error by measurement in both positions of the telescope and bycalculation of correction.
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Observing vertical angles:
If there is no index error,
Z1 + Z2 = 400g
If there is an index error;
Z1 + Z2 = 400g + 2i
i = (Z1 + Z2 - 400g ) /2
and corrected zenith angle
Z = Z1 - i
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Observing vertical angles:
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Errors in Angular measurement:
Natural error:
Wind
Temperature effects
Refraction
Tripod settlement
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Errors in Angular measurement:
Personal error:
Instrument not set up exactly over point
Bubbles not centered perfectly
Improper use of clamps and tangent screws
Poor focusing
Overly careful sights
Careless plumbing and placement of rod
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Errors in Angular measurement:
Instrumental errors:
Plate bubble out of adjustment
Horizontal axis not perpendicular to vertical axis
Axis of sight not perpendicular to horizontal axis
Vertical-circle indexing error
Eccentricity of centers
Circle graduation errors
Errors caused by peripheral equipment
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Errors in Angular measurement:
Instrumental errors:
For a properly adjusted instrument, the four axes must bear specificrelationship each other. If these relationships are not true, errors willresult in measured angles unless proper field procedures areobserved. A discussion of errors caused by mal-adjustment of theseaxes and other sources of instrumental errors follows;
1. Plate bubble out of adjustment: If the axis of the plate bubble isnot perpendicular to the vertical axis, the latter will not truly verticalwhen the plate bubble is centered. This condition causes errors inobserved horizontal and vertical angles that cannot be eliminated byaveraging direct and reserved readings. The plate bubble is out ofadjustment if after centering, it runs when the instrument is rotated200g .
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Errors in Angular measurement:
Instrumental errors:
Set the plate bubble so that it is aligned in the same direction as two of the foot screws. Turns these two screws in opposite direction until the bubble is centered.
When the instrument is rotated 200g. The amount of bubble run indicates twice error that exists. The half amount of bubble run can be eliminated by turning leveling screws and the other half of error can be eliminated by turning plate bubble adjustment screw with suitable direction. Then the adjustment must be controlled again.
2. Horizontal axis not perpendicular to vertical axis: After leveling and focusing, the error can be determined that carefully pointing to the same targets ( points higher or lower than theodolite height ) in both direct and reversed modes. If an adjustment is necessary, the qualified technician should adjust this condition in laboratory environment.
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Errors in Angular measurement:
Instrumental errors:
3. Axis of sight not perpendicular to horizontal axis: If this condition exists, as the telescope is plunged, the axis of sight generates a cone whose axis coincides with the horizontal axis of instrument. This error can be determined that pointing to a target in both face left and face right.
4. Vertical circle indexing error: when the axis of sight is horizontal, an altitude angle of zero, or a zenith angle of either 100g or 300g
should be read; otherwise an indexing error exists. The error can be eliminated by computing mean from equal numbers of altitude or zenith angles read in the direct and reversed modes.
5.Eccentricity of centers: this condition exists if the geometric center of the graduated horizontal or vertical circle does not coincide with its center of rotation.
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Errors in Angular measurement:
Instrumental errors:
6. Circle graduation errors: If the graduations around the circumference of a horizontal or vertical circle are nonuniform, errors in observed angles will result.
7.Errors caused by peripheral equipment: Additional instrumental errors can result from worn tribrachs, optical plummets that are out of adjustment, unsteady tripods, and sighting poles with maladjusted bull’s eye bubbles. This equipment should be regularly checked and kept in good condition or adjustment.
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REFERENCES:
Basic Surveying -The Theory and Practice, Oregon Department of Transportation,
Geometronics Unit, Ninth Annual Seminar, February 2000.
C.D. Ghilani, P.R. Wolf; Elementary Surveying , Pearson Education International Edition,
Twelfth Edition,2008 .
Barry F. Kavanagh, Surveying Principles and Applications, Pearson Education International
Edition, Eight Edition,2009.
Ü.Öğün , Topografya Ders Notları ,
E.Tarı , M.Sahin , Surveying II Lecture Notes - Slides ,
H.Özener , Surveying Lecture Notes , CE200 Surveying, Boğaziçi University Kandilli
Observatory and Earthquake Research Institute Department of Geodesy
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REFERENCES:http://nptel.iitm.ac.in/courses/Webcourse-contents/IIT-ROORKEE/SURVEYING/home.htm
http://k154.fsv.cvut.cz/~linkova/lect4.pps
http://www.civl.port.ac.uk/survey/