The length of the bridge is the distance from the beginning to the end.
The distance b between each beam is 9ft.
Let:
[tex]I \to[/tex] I-Beam
[tex]d_I \to[/tex] distance between I beam and the bridge
[tex]b \to[/tex] distance between each I beam
Given that:
[tex]I = \frac 34 ft\\[/tex]
[tex]d_I = 3 ft[/tex]
[tex]Length = 55ft\ 6in[/tex] --- length of the bridge
From the diagram (see attachment), there are: 6 I-beams.
So, the length of the 6 I-beams is:
[tex]L_1 = 6 \times I[/tex]
[tex]L_1 = 6 \times \frac 34[/tex]
[tex]L_1 = \frac {18}4[/tex]
[tex]L_1 = 4.5ft[/tex]
There are 2 I-beams beside the bridge
So, the distance between the 2 I-beams and the bridge is:
[tex]d_1 =2 \times d_I[/tex]
[tex]d_1 =2 \times 3ft[/tex]
[tex]d_1 =6ft[/tex]
There are 5 spaces between the I-beams
So, the length of the total spaces is:
[tex]L_2 = 5 \times b[/tex]
[tex]L_2 = 5b[/tex]
The total length is:
[tex]Length = L_1 + d_1 + L_2[/tex]
So, we have:
[tex]4.5ft + 6ft + 5b = 55ft\ 6in[/tex]
Collect like terms
[tex]5b = 55ft\ 6in - 4.5ft - 6ft[/tex]
[tex]5b = 44.5ft\ 6in[/tex]
Convert inches to feet
[tex]5b = 44.5ft\ + \frac{6}{12}ft[/tex]
[tex]5b = 44.5ft\ + 0.5ft[/tex]
[tex]5b = 45ft[/tex]
Divide both sides by 5
[tex]b = 9ft[/tex]
Hence, the distance (b) between each beam is 9ft.
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