366 ' H, A, Rowland—Diamagnetic Constants of 
= (80%, Qi, +. Y,,) 0080) 5 + A, Ay ((5Q", Wr + 5Q%,Q) 
+Q'Q'y+Q,Q’,)sin’6—(5Q’ Qy + Q,Q’y)cosé s + A, Ad(@Q, Qy 
+ 5Q,,, Vv + 8Q’,,, Vy + 3Q,,, Q"v) sin? 6 — (5Q’,,, Wr 
+ 3Q,,, Q’y) cos oe 
9 
Where 
Q, = cosd 
Qi, = 4 (5 cos’ 0 — 3 cos 8) 
Q =+4 (63 cos* 0 — 70 cos* 6 + 15 cos 6) 
Q’, ob ’ 
Sr (5 cos’ 6 — 1) 
Q’y = 15 (21 costd—14 cos’ 6+ 1) 
Q", aa O 
Q’ 4, == 15 cos 6 
"y sole lie apa 
f= cos 
A= 4isin 6{(A*,+ $4 A*, 041918 A) P—3A,A,,P+42A,Ayl 
ae oe Aves Ay a) M+ (— 27 PS ity Pm sg 7 ANE + 10A, Ay! 
— 385A, Avi + 4875 A) ALD) uo 4 (1g8.A%, + 8028 AYE 
TAA AvP A888 A AyD) io 4+(—24z8 AYE SZ8A,,Ayl) 
PARLE AME ptt.’ , : 
B= 4lsin 6{(—A",— 2 A* P3725A°4 6A, A,,,0—S2A, Art 
as SPEA,, yl) POA f —HPAP—10A,A,, 0+ APA Al 
aS Be Any A,i’) e+ (— 135 err Borie: : weet ik dimes i. i 
. mea; Ayl’) y! + (TPEA SISA Ayl’) uw * Be Basie 
c= 41} (—A’,— FEAT —3 A, Ave f+ zo A, Ay —#3 Aya Ay?) 
= (— $A, By ’) M+ Sree on TLS a 6A, Ay? a pA, Ar? 
+ 438 A,,, Ay?) w+ 9A, A Py + (45 A’), 0 + 2¢e A aa 
aR $A, A, ,, P+ a1 A, Ay c— ee a oe Ay P)— + A, Aw id 
iy mt geo BP So 177s A? 441A, Ayl* + 2484 Aya Ay 
* ($534 Aly 0 — $28 A,,, Av?) By 
Or we can write 
A= 4/sin0{Lu+L/ py? +L’ u'+ ete.} 
B= 4/sin6{Myu+M’u'+ ete.} 
: C=2{N +N’u +N" ete.} 
where the values of L, M, ete. are apparent. 
a Sum up we may then write as before 
at Alh,—k)a*+k,] + BU(k,— ka’? k] — Oe, Bae 
