Per NP=2BD 



log 2 = 0,3010300 

 loge = 8,2245616 

 log coso = 9,9625532 

 logZ) = 8,4881448(— ) 



- 620 — 



essendo D = 



2e coso 



log 2 = 0,3010300 

 log B = 8,7336196 

 logZ> = 8,4881448(— ) 

 compi. ìogN = 1,5995347 



logP = log- 



2BD 



N 



\og2BD-hcompl.ìogN=9,1223291(—) 



P = — 0,132535, per approssimazione. 



Per NQ = L? — &—2(A-h F)(A — 



3 



,2\9 



logZ) 2 = 6,9762896 

 ]J = 0,0009468682 

 B 2 = 0,0029325100 

 D 2 — B 2 = — 0,0019856418 



F 



A 



A-hF: 



log 2 

 ìog(A-hF) 

 \og(A-C). 

 \og2(A-t-F)(A — C) 



; — 0,076141990 

 -h 0,004516250 

 — 0,071625740 

 ; 0,3010300 

 ; 8,8550690(— ) 

 9,1733063(— ) 

 ; 8,3294053(-H) 



C); F=(l — e 2 )2 cos 2 o — coso 



log(l — e 2 )2 — 9,9998167 

 log cos 2 o = 9,9251064 

 log(l — e 2 )* cos 2 o = 9,9249231 

 -+- (1 — e 2 )* cos 2 o = 0,84124620 

 — coso = 0,91738819 

 B 2 — B 2 = — 0,0019856418 

 2(A-hF)(A— C) = 0,0213503640 



QN= — 0,0233360058 

 log QN = 8,3680265(— ) 

 compi. \ogN= 1,5995347 



logQ = 9,9675612(— ) 

 Q = — 0,928028; R = -h 0,132535. 



log(^ -+- F) = 8,8550690(— ) 

 \og(A-+-Ff= 7,7101380 

 (A -+- Ff = 0,0051302447 

 — Z) 2 = — 0,0009468682 

 {A -+- Ff — Z> 2 = 0,0041833765 



Per NS = (A-^-F) 2 — D 2 , 



\og[{A -hF) 2 — D 2 ] = 7,6215270 

 compl.\ogN= 1,5995347 

 log£= 9,2210617 

 5=0,166365 



