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The high level bridge, a railway bridge that crosses the Oldman River is over 1km long. From one point on the river, the angle...Asked by Sonny
The high level bridge, a railway bridge that crosses the Oldman River is over 1km long. From one point on the river, the angle of elevation of the top of the bridge is 62.6 degrees. From a point 20m closer to the bridge, the angle of elevation of the top of the bridge is 72.8 degrees. How high is the brige above the river, to the nearest meter? I am really confused by this question like I know what its asking but I don't know how to draw it out on paper so i can work it out.
Answers
Answered by
Reiny
Draw a "side view"
Draw 3 points on the river, B , C, and D , B to the left of the points
draw a point A above B so that angle B is 90°
Join AC and AC , so that CD = 20
Mark angle ADC = 62.6° and angle ACB = 72.8°
label AB =h (h is the height) , BC = x
in triangle ABC:
tan 72.8° = h/x
h = xtan72.8°
in triangle ABD
tan62.6° = h/(x+20)
h = (x+20)tan62.6°
xtan72.8 = (x+20)tan62.6
xtan72.8 - xtan62.6) = 20tan62.6
x(tan72.8 - tan62.6) = 20tan62.6
x = 20tan62.6/(tan72.8 - tan62.6)
sub back into h = xtan72.8
h = 20(tan62.6)(tan72.8)/(tan72.8-tan62.6)
= ..... you do the button pushing
notice up to this point, I have not done any arithmetic or calculator work.
Also notice that the fact that the bridge was 1 km long did not enter the picture. It is important that you recognize what information is relevant and what is not.
BTW, I got 95.79 m
Alternate way:
in triangle ACD (not right-angled) , angle A = 10.2° , angle C = 107.2°
By the Sine Law:
AC/sin62.6 = 20/sin10.2
AC = 20sin62.5/sin10.2
in the right-angled triangle ABC
sin72.8 = h/AC
h = AC sin72.8 = (20sin62.6/sin10.2)(sin72.8) = 95.79
HOW ABOUT THAT ??
Draw 3 points on the river, B , C, and D , B to the left of the points
draw a point A above B so that angle B is 90°
Join AC and AC , so that CD = 20
Mark angle ADC = 62.6° and angle ACB = 72.8°
label AB =h (h is the height) , BC = x
in triangle ABC:
tan 72.8° = h/x
h = xtan72.8°
in triangle ABD
tan62.6° = h/(x+20)
h = (x+20)tan62.6°
xtan72.8 = (x+20)tan62.6
xtan72.8 - xtan62.6) = 20tan62.6
x(tan72.8 - tan62.6) = 20tan62.6
x = 20tan62.6/(tan72.8 - tan62.6)
sub back into h = xtan72.8
h = 20(tan62.6)(tan72.8)/(tan72.8-tan62.6)
= ..... you do the button pushing
notice up to this point, I have not done any arithmetic or calculator work.
Also notice that the fact that the bridge was 1 km long did not enter the picture. It is important that you recognize what information is relevant and what is not.
BTW, I got 95.79 m
Alternate way:
in triangle ACD (not right-angled) , angle A = 10.2° , angle C = 107.2°
By the Sine Law:
AC/sin62.6 = 20/sin10.2
AC = 20sin62.5/sin10.2
in the right-angled triangle ABC
sin72.8 = h/AC
h = AC sin72.8 = (20sin62.6/sin10.2)(sin72.8) = 95.79
HOW ABOUT THAT ??
Answered by
Sonny
Thanks so much!