You can
put this solution on YOUR website!picture the taller pole standing at the origin and running up the y-axis
the shorter pole is standing 40 ft out on the x-axis
the equation of the wire from the top of the taller pole to the bottom of the shorter pole is ___ y = (-5/4)x + 50
the equation of the other wire is ___ y = (3/4)x
substituting ___ (3/4)x = (-5/4)x + 50 ___ x = 25
substituting ___ y = (3/4)25 = 75/4 = 18.75
C is 18.75 ft off the ground and 25 ft from the taller pole
leaving the third part for you to find
*BIG HINT* ___ 3 - 4 - 5 TRIANGLE
You can
put this solution on YOUR website!Let A be the distance from the ground to the coupling C (perpendicular to the ground and parallel to both poles)
Let D be the distance from the tallest poll to the point on the ground from C.
(Angle-Angle (AA) Similarity) two pair of similar triangles are formed.
Using proportions on the smaller pair of triangles to find the distance on the ground from under C to the largest pole.
30d = 40a
for the larger pair of triangles
50(40-d) = 40a
Notice 40a, substituting on both equations
30d)=50(40-d)
30a = 2000-50d
80d = 2000
d = 25 feet. If you subtract from 40 you get the other base which is 15ft.
Substitute to find the height of the coupling
30d = 40a
30(25)=40a
a=750/40
a=18.75 feet height.
How far down the wire from the smaller pole is the coupling?
Notice that the smaller pole formed a dilation by a factor 10 from a 3,4,5 triangle. Therefore, the wire from the smaller pole to the base of the larger is 50ft. Then using the Triangle Proportionality Theorem, formulate the following proportion.
Let y be the distance of the segment from the pole to C (Coupling) use the proportion.
y=18.75 feet
For the distance from C to the Taller pole, using Pythagoras
the hypotenuse is about 64 feet round to the unit.
To find the distance from C to the taller pole, again use the Triangle Proportionality Theorem..
Let p be the distance from C to the Taller pole.
The distance is 40 feet.
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