77 6 Mr. hutton’s Calculations to afcertain 
IS- 
For the fum of the fines below p in the S.W. quarter. 
Rings 
Radii. 
Sum of 
Dep. 
Sum of 
Tang. 
I 
2 
1 
1 3 
1 
4 
si 6 !? 
1 1 
8 
9 
•loji I 
1 
1 1 
j 12 
Sum of 
Diff. 
9 
5667 
620 
•°si i 
i 
1 1 
1 1 
10 
6333 
* 73 ° 
273 
i 
I 
1 
1 1 
•OO I 
1 1 
7000 
3 ° 3 ° 
433 ! 
I 
i 
1 h 
mi 2 
12 
7667 
4470 
583 1 ! 
1 
1 1 
1 
1 
1 2 
13 
8333 i 4660 
359 1 I 
t 
1 
1 
l i I 
1 
mi 2 
x 4 
9000 | 
373 ° 
4 i 4 1 
1 
1 
i 1 1 
1 1 
1 
2 
! 9667 j 
2390 
247 | 
! 
1 1 h 
1 1 1 * 
16 
t °333 1 
1460 
! 4 i | | 
I 1 1 
1 
111 1 
17 
i 1000 | 
800 
73 ! ! 
1 1 1 
1 1 1 
is 
1 1667 
I 3 ° 
nil 
1 I 1 
1 1 
2-785 = 
*011=: 
fum of the tangents, 
fum of the differences. 
1 
•on 
2 *774 - 
fum of the fines. 
l6. 
For the fum of the fines below p in the S.E. quarter. 
1 
1 
1 
1 
1 | 
2 | 
3 1 4 
5 1 6 1 7 
8 1 9 1 
I o| I I 
I2 | 
7 1 
4333 1 
80 1 
•018 | 
1 
II II II 1 1 
8 ! 
5 ° 00 1 
2 9 ° 1 
S8 | 
i 
M l 1 1 1 11 
9 1 
5667 j 
1810 | 
3 1 9 1 
1 
1 
1 1 1 1 1 1 1 1 •«> 
10 1 
6 333 1 
328° 1 
Si 8 1 
1 
1 1 1 
1 
1 
2 
11 1 
7000 | 
4640 1 
663 | 
I | 
1 1 1 
1 
1 
I | 
3 
12 1 
7667 | 
559 ° 1 
729 | 
1 | 
1 1 1 
1 
1 
1 | 
3 
*3 I 
8333 I 
5830 I 
7 00 1 
1 
1 1 1 
1 
1 
1 1 
3 
14 1 
9°°° J 
57 00 1 
6 33 1 
1 1 1 
1 1 
1 1 
1 I 
3 
*5 1 
9667 j 
S 240 1 
542 | 
1 1 
1 1 1 
1 
I 1 
I [ 
3 
1 6 | 
I0 333 1 
4S 6 ° 1 
441 j 
1 1 
*1 
1 I 
2 
x 7 | 
1 1000 | 
3920 | 
336 | 
1 1 
1 1 
i 
1 1 
1 
I | 
2 
18 j 
11667 j 
318° | 
273 1 
l 
1 1 
1 1 
1 
1 I 
1 
*9 1 
I2 333 1 
2630 j 
2"3 1 
l 
1 
1 1 
1 
20 | 
13000 | 
2230 j 
172 | 
l 
l 1 
1 
1 1 
1 
5 ,6 33 = ; 
•025 = : 
5-610 = : 
fum of the tangents, 
fum of the differences, 
fum of the fines. 
•025 
1 
Having 
