Lines Matching refs:MOD
5041 # k = N mod 4, so in particular, k = 0,1,2,or 3. #
5069 # k = N mod 4, so in particular, k = 0,1,2,or 3. #
5073 # 4. (k is odd) Set j1 := (k-1)/2, j2 := j1 (EOR) (k mod 2), ie. #
5743 # k = N mod 2, so in particular, k = 0 or 1. #
6852 # 2.3 Calculate J = N mod 64; so J = 0,1,2,..., #
6963 # 8.3 Calculate J = N mod 64, J = 0,1,...,63 #
7009 # 2.2 Calculate J = N mod 64; so J = 0,1,2,..., #
7247 and.l &0x3F,%d1 # D0 is J = N mod 64
7343 and.l &0x3F,%d1 # D0 is J = N mod 64
7411 and.l &0x3F,%d1 # D0 is J = N mod 64
9709 # smod(): computes the fp MOD of the input values X,Y. #
9727 # signQ := signX EOR signY. Record whether MOD or REM #
9737 # Step 3. Perform MOD(X,Y) #
9744 # Step 4. At this point, R = X - QY = MOD(X,Y). Set #
9746 # MOD is requested, go to Step 6. #
9748 # Step 5. R = MOD(X,Y), but REM(X,Y) is requested. #
9749 # 5.1 If R < Y/2, then R = MOD(X,Y) = REM(X,Y). Go to #
9905 #..expo(X) < expo(Y). Thus X = mod(X,Y)
Indexes created Tue Oct 28 12:10:06 GMT 2025