for the following data, Compute the Horizontal distance from a recorded slope distance AB. (A) AB=...
for the following data, Compute the Horizontal distance from a recorded slope distance AB.
(A) AB= 104.93 ft, slope angle = 2 degrees 13' 46''
(B) AB= 86.793 m, difference in Elevation A to B= -2.499 m
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for the following data, Compute the Horizontal distance from a
recorded slope distance AB.
(A) AB=...
For the following data, compute the horizontal distance for a recorded slope distance AB:(a) AB =...
For the following data, compute the horizontal distance for a recorded slope distance AB:(a) AB = 210.19 ft, slope angle = 3°14′28″(b) AB = 125.657 m, difference in elevation A to B = 3.566 m.
7. An elevation difference measurement by a total station is (a) is from the ground point...
7. An elevation difference measurement by a total station is (a) is from the ground point at the total station to the ground point at the prism computed from only slope distance and zenith angle (b) requires the horizontal circle to compute the elevation difference (c) requires sighting a known elevation on a backsight (d) usually requires height of instrument and height of target to be correctly derived 8. A horizontal angle at 2 from 1 to 3 is 65-08-10,...
The following slope distances and differences in elevations between the tape ends were recorded for a...
The following slope distances and differences in elevations between the tape ends were recorded for a measurement: Slope Distance Difference in elevation, m 30.005 1.452 29.950 3.500 30.000 0.505 25.989 2.445 10.345 1.595 Calculate the horizontal distance between the two endpoints of this line.
Q30: Trigonometric Leveling) Similar to Problem above, except the slope distance was 854.987 m, the zenith...
Q30: Trigonometric Leveling) Similar to Problem above, except the slope distance was 854.987 m, the zenith angle was 82° 13' 45"and the elevation of point P was 354.905 m above datum. What is the elevation of point Q? Q31: Trigonometric Levelingł In trigonometric leveling from point A to point B, the slope distance and zenith angle measured at A were 2504.897 m and 85° 08' 54". At B these measurements were 2504.891 m and 94° 52' 10"'respectively. If the instrument...
How do we find the slope distance, given the horizontal distance and the zenith angle? For...
How do we find the slope distance, given the horizontal distance and the zenith angle? For example, From Station 40 to Station 41 HD=148.04 ft ZA=89.4013
5) The total station is setup at A and and a known backshot point is sighted to zero the horizontal angle. The know...
5) The total station is setup at A and and a known backshot point is sighted to zero the horizontal angle. The known azimuth of the backshot is 63 03'18". Then the instrument is turned to point B with the following readings o Clockwise horizontal angle 55 37 '42" o Zenith angle 92°34 18" o Slope distance 435.09 ft o Height of the prism 6.00 ft Calculate the X, Y, and Z coordinates of point B. Assume the XY coordinates...
At a horizontal distance of 31 m from the bottom of a tree, the angle of...
At a horizontal distance of 31 m from the bottom of a tree, the angle of elevation to the top of the tree is 22°. How tall is the tree?
a) At a horizontal distance of 42 m from the bottom of a tree, the angle...
a) At a horizontal distance of 42 m from the bottom of a tree, the angle of elevation to the top of the tree is 28°. How tall is the tree? _______ m b)Find the polar coordinates corresponding to a point located at (−4.89, 12.16) in Cartesian coordinates. (___ ,___ °) c) Two points in a rectangular coordinate system have the coordinates (5.2, 3.3) and (−3.0, 5.4), where the units are centimeters. Determine the distance between these points. _______cm
Height of the Instrument Slope Distance Vertical Distance Height of the Building From Zenith Angle (DMS)...
Height of the Instrument Slope Distance Vertical Distance Height of the Building From Zenith Angle (DMS) To (ft) (in) (ft) (ft) (Ft) STN 8 156.409 62°51'34" STN 2 8 157.925 63'55'47" STN 3 8 233.255 72°20'20" STN 4 8 590.461 82°59'06" STN 5 8 78.827 76°14'45"
A distance was measured along a straight line from A to B to C with a...
A distance was measured along a straight line from A to B to C with a tape supposedly 100m long. Distance AB measured horizontally is found to be 516.27m and BC on a slope 317.86m. If the true distance AC (horizontally) is 833.62m and the difference in elevation between B and C is 23.25m, what is the erroneous length of the tape? a. 100.12m b. 100.04m c. 99.88m d. 99.96m
7. An elevation difference measurement by a total station is (a) is from the ground point at the total station to the ground point at the prism computed from only slope distance and zenith angle (b) requires the horizontal circle to compute the elevation difference (c) requires sighting a known elevation on a backsight (d) usually requires height of instrument and height of target to be correctly derived 8. A horizontal angle at 2 from 1 to 3 is 65-08-10,...
Q30: Trigonometric Leveling) Similar to Problem above, except the slope distance was 854.987 m, the zenith angle was 82° 13' 45"and the elevation of point P was 354.905 m above datum. What is the elevation of point Q? Q31: Trigonometric Levelingł In trigonometric leveling from point A to point B, the slope distance and zenith angle measured at A were 2504.897 m and 85° 08' 54". At B these measurements were 2504.891 m and 94° 52' 10"'respectively. If the instrument...
5) The total station is setup at A and and a known backshot point is sighted to zero the horizontal angle. The known azimuth of the backshot is 63 03'18". Then the instrument is turned to point B with the following readings o Clockwise horizontal angle 55 37 '42" o Zenith angle 92°34 18" o Slope distance 435.09 ft o Height of the prism 6.00 ft Calculate the X, Y, and Z coordinates of point B. Assume the XY coordinates...
Height of the Instrument Slope Distance Vertical Distance Height of the Building From Zenith Angle (DMS) To (ft) (in) (ft) (ft) (Ft) STN 8 156.409 62°51'34" STN 2 8 157.925 63'55'47" STN 3 8 233.255 72°20'20" STN 4 8 590.461 82°59'06" STN 5 8 78.827 76°14'45"
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