mathematical theory of suspension bridges . 
21 5 
Table II. continued . - 
a = 100. 
—The Ordinary Catenary. 
N. 
y - 
X. 
z. 
T. 
Angle. 
i .665290 
5 1 
13.289300 
5 3.239600 
113.289300 
O / 1/ 
61 58 9 
1 .682027 
52 
13.827388 
54 - 3753 ” 
1 1 3 . 8273 S8 
61 27 53 
1.698932 
53 
H-376853 
55.516346 
114.376853 
60 57 45 
1 .716006 
54 
H -937727 
56.662872 
” 4-937727 
60 27 46 
1.733252 
55 
1 5. 5 1 01 07 
57.815092 
1 15 .5 10107 
59 57 56 
1 .750672 
56 
16.094061 
58.973138 
1 16.094061 
59 28 14 
1 .768266 
57 
16.689588 
60. 1370 1 1 
116.689588 
58 58 42 
1.786037 
58 
17.296790 
61 . 306900 
117.296790 
58 29 19 
1 . 803988 
59 
I 7 - 9 I 577 ° 
62.483020 
” 7 - 9 i 577 o 
58 0 5 
1 .8221 18 
60 
18.546493 
63 .665306 
” 8.546493 
57 3 * * 
1 . 84043 1 
61 
19. 189099 
64.854000 
1 19. 189099 
57 2 5 
1 .858927 
62 
19.843586 
66.0491 13 
”9.843586 
56 33 20 
1 . 877610 
63 
20.5 1009S 
67 . 250901 
120.510098 
56 4 43 
1 . 896480 
64 
21 .188633 
68.459366 
121 . 188633 
55 36 16 
1.915540 
65 
21 .879300 
69.674600 
121.879300 
55 7 59 
1 * 93479 2 
66 
22.582171 
70.897028 
122.582171 
54 39 5 2 
i- 954 2 37 
67 
23-297283 
72. 126416 
123.297283 
54 ” 54 
1 - 973^77 
68 
24.024709 
73.362990 
124.024709 
53 44 6 
1 • 9937 I 5 
69 
24.764560 
74.606930 
124.764560 
53 *6 28 
2.013752 
70 
25.516873 
75.858326 
125.516873 
52 48 59 
2.03399° 
7 i 
26.281725 
77.117274 
126.281725 
52 21 41 
2-054433 
72 
27.059265 
78.384034 
127.059265 
5 * 54 33 
2.075080 
73 
27.849426 
79-658573 
1 27.849426 
5 * 27 34 
2-095935 
74 
28.652451 
80.941048 
128.652451 
51 0 46 
2- I I70OO 
75 
29.468327 
82 .231672 
129.468327 
5 ° 34 8 
2-138276 
76 
30.297123 
83-530476 
130.297123 
5° 7 4 ° 
2-159766 
77 
31-138956 
84.837643 
1 3 1 * 1 38956 
49 41 22 
2- 181472 
78 
3 1 - 9939°3 
86. 153296 
* 3 1 * 9939°3 
49 *5 *4 
2-203396 
79 
32 . 862044 
87-477555 
132.862044 
48 49 16 
2.225540 
80 
33-743457 
88.810542 
*33 *743457 
48 23 29 
2-247907 
81 
34.638263 
90.152436 
134.638263 
47 57 5 2 
2-270500 
82 
35.546581 
91 - 5034 18 
135.546581 
47 32 25 
2.293318 
83 
36.468371 
92-863428 
136.468371 
47 7 8 
2.316366 
84 
37 - 4 0 3837 
94.232762 
137*403837 
46 42 2 
2-339646 
85 
38.353056 
95 . 6 U 543 
138.353056 
46 17 6 
2.363160 
86 
39.3161 10 
96.999880 
139.316110 
45 5 2 20 
2.386910 
87 
40.293084 
98 • 3979 1 5 
140.293084 
45 2 7 45 
2.4IO9OO 
88 
41-284143 
99.805856 
141.284143 
45 » 20 
2-435129 
89 
42.289243 
101 .223656 
142.289243 
44 39 5 
2.459602 . 
9 ° 
43-308592 
102.651607 
*43-308592 
44 *5 * 
2.484322 
9 1 
44-342313 
104.089886 
*44-342313 
43 5 * "7 
2.509290 
92 
45-390455 
io 5 -538544 
145.390455 
43 2 7 2 3 
2 *533983 
93 
46.430931 
106.967368 
146.430931 
43 4 *8 
2.559981 
94 
47-530444 
108.467655 
*47-530444 
42 40 26 
2.585709 
95 
48.62250 6 
109.948393 
148.622506 
42 17 *3 
2.6l 1696 
96 
49-729447 
1 1 1 .440152 
149.729447 
41 54 10 
2.637944 
97 
50.851 184 
”2.943315 
150.851184 
41 31 18 
2.664455 
98 
51.988313 
1 14.457186 
*51.988313 
4* 8 36 
2.691234 
99 
53 -H 0537 
1 15.982862 
153-140537 
40 46 ■ 4 
2.718281 
100 
54.308027 
1 17.520072 
154.308027 
4 ° 2 3 4 2 
i 
:i 
