follows from equation (10.91). The dimensionless number, 
2rqm B(hyj,h',j',3*)/p OT, determines that fractional part of 
A5(h4j) which is contributed to the value of A,(h',j',j*). For 
the examples in the plates, B(h,j,h',j',j*) is zero if h'<K and 
if h'>(2K + P - 1)/2 as stated by equation (10.93). It is also 
Zoron dias * jue 
The power in an area element in the v 0926 plane is given by 
equation (10.94). Aj(h',j',Jj*) has the dimensions of em>/radian, 
and the right hand side of (10.94) has the dimensions of em. 
The integral over 85 (see equation (10.55)) then becomes the sum 
given by equation (10.95). A(h',j*) has the dimensions of om? 
and the right hand side has the dimensions of com>. 
All of the terms of the form of B(h,j,j',j', j*) A,(h,j), 
which have the dimensions cm’, can be treated for a fixed h' and 
j*. Summed over all possible j', h, and j, they will be all con- 
tributions to the net elements in the vy ,,0, plane for a fixed h'. 
In fact, they must again equal the right hand side of equation 
(10.95) as is stated by equation (10.96). 
Equation (10.96) thus involves known values of B(h,j,j',j',j*) 
and a known value for the right hand side given by the values found 
in equation (10.67). The unknowns are given by the A,(h,j). Sepa- 
rate equations for each value of h' and j* result as shown by 
equation (10.97), and equation (10.96) with equation (10.97) there- 
fore stands for a system of 2q(m +1) linear equations. 
Also equation (10.98) follows from equation (10.24). The 
right hand side is known from equation (10.63). There are m+ 1 
equations of the form of equation (10.98) as stated by the con- 
dition (10.99). The unknowns are A,(h,j). 
= Xen 
