Given station A (3875, 5678) ft , and station B (1831, 3849)ft , find ( 20...

Given station A (3875, 5678) ft, and station B (1831, 3849)ft , find (20 pts) The...

Given station A (3875, 5678) ft, and station B (1831, 3849)ft , find (20 pts) The azimuth of the line, AB connecting the two stations                         AzAB = ___________________________________ The bearing of the line, BA connecting the two stations                         BrgBA =____________________________ The length of the line, AB connecting the two stations                   Length of AB = __________________________

The sizes of two matrices A and B are given. Find the sizes of the product...

The sizes of two matrices A and B are given. Find the sizes of the product AB and the product​ BA, whenever these products exist. A=3X5, B=3X1.

Given: L=200 ft equal tangent parabolic curve with g1 = -1.25%, g2 = +1.25%, VPI station...

Given: L=200 ft equal tangent parabolic curve with g1 = -1.25%, g2 = +1.25%, VPI station = 146+00, and VPI elevation = 1,895.00 ft. a. Compute stationing of BVC. b. Compute stationing of EVC. c. Compute rate of change, r. d. Compute elevation of BVC. e. Compute elevation at Station 145+50.

A 3.0% grade passing at station 20+00.00 at an elevation of 99.10 m meets a -2.0%...

A 3.0% grade passing at station 20+00.00 at an elevation of 99.10 m meets a -2.0% grade passing at station 20+50.00 at an elevation of 99.60 m. Please note that these two elevations and stations DO NOT correspond to BVC and EVC. a) Determine the station and elevation of the point of intersection of the two grades. b) If the highest point on the curve must lie at station 20+55.00, find the elevation of this point and the length of...

A -6.00% grade and a +2.00% grade intersect at station 20+00. The two grades are to...

A -6.00% grade and a +2.00% grade intersect at station 20+00. The two grades are to be connected by a vertical curve 400 ft long. The elevation of the BVC is 348.52. What is the... a. Elevation on the curve of the low/high point? b. Elevation of the curve at station 19+00 c. Elevation of the tangent at station 21+00 d. Elevation of the curve at station 21+50 e. Elevation of the curve at station 18+50

Assume that you are given segment AB of length 1 (a unit). Given line segment of...

Assume that you are given segment AB of length 1 (a unit). Given line segment of length a , b and c construct a line segment of length abc.

pr.1 The Observations were made from station P to signal at station Q. The distance between...

pr.1 The Observations were made from station P to signal at station Q. The distance between Pand Qis 12.5 km and diameter of signal at station Q was 20 cm. The sun rays make an angle of 50° with line PQ. Calculate the phase correction if observations were made:on the bright portion,on the bright line.. ,A base line was measured with a steel tape of designated length 30 m at 20°C ata pull of 100 N. The measured length of...

Observations, using an electronic theodolite were taken in the field for 5 sided polygon traverse, ABCDE....

Observations, using an electronic theodolite were taken in the field for 5 sided polygon traverse, ABCDE. These observations are tabulated below. The coordinates of station A are 1000.000m E, 1000.000 m N. Orienting bearing of leg AB is 73°00’00”. Leg BC is in S.E quadrant. Using these data determine the adjusted coordinates of B, C, D and E applying Bowditch’s rule. Horizontal distance (m) Horizontal Angle (included) Line Length (m) Station Angle AB 51.766 A 101°03’18” BC 26.947 B 101°41’48”...

Consider a polygon traverse. The azimuth of side AB is fixed at 35∘09′32′′.A=57∘00′50′′, B=88∘24′45′′, C=126∘36′58′′, D=46∘03′25′′,E=221∘53′52′′....

Consider a polygon traverse. The azimuth of side AB is fixed at 35∘09′32′′.A=57∘00′50′′, B=88∘24′45′′, C=126∘36′58′′, D=46∘03′25′′,E=221∘53′52′′. (Note: Line BC bears NW.) The lengths of the sides (in meters) are as follows: AB=383.808, BC=360.209, CD=342.204,DE=336.210, and EA=267.527. The coordinates of station A are X=310,630.892m and Y=121,311.411m. calculate by coordinates the area within the traverse above area=

Given: A = 101° 28’ B = 102° 11’ C = 104° 42’ D = 113°...

Given: A = 101° 28’ B = 102° 11’ C = 104° 42’ D = 113° 05’ E = 118° 34’ If bearing AB is N 62°30’ E, compute the bearing of DE. Bearing of DE =