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Lines Matching refs:ODD

5046 #	5. (k is odd) Set j := (k-1)/2, sgn := (-1)**j. 		#
5053 #		where sin(r) is approximated by an odd polynomial in r	#
5073 #	4. (k is odd) Set j1 := (k-1)/2, j2 := j1 (EOR) (k mod 2), ie.	#
5077 #		sin(r) and cos(r) are computed as odd and even 		#
5082 #		sin(r) and cos(r) are computed as odd and even 		#
5184 	add.l		ADJN(%a6),%d1		# SEE IF D0 IS ODD OR EVEN
5185 	ror.l		&1,%d1			# D0 WAS ODD IFF D0 IS NEGATIVE
5394 	cmp.l		%d1,&0			# D0 < 0 IFF N IS ODD
5745 #	3. If k is odd, go to 5.					#
5753 #	4. (k is odd) Tan(X) = -cot(r). Since tan(r) is approximated by #
5907 	and.l		&0x80000000,%d1		# D0 WAS ODD IFF D0 < 0
6184 #	Step 6. Approximate arctan(X) by an odd polynomial in X. Exit.	#
6186 #	Step 7. Define X' = -1/X. Approximate arctan(X') by an odd 	#
8096 #	Step 1. If |X-1| < 1/16, approximate log(X) by an odd 		#
8114 #	Step 1: If |X| < 1/16, approximate log(1+X) by an odd 		#
8447 #--LOG(X) = LOG(1+U/2)-LOG(1-U/2) WHICH IS AN ODD POLYNOMIAL
9753 #            5.3 This is the tricky case of R = Y/2. If Q is odd,	#
10108 #..Q is odd, Q := Q + 1, signX := -signX
16056 	btst		&0x0,%d1		# is exp even or odd?
16078 	btst		&0x0,%d0		# is exp even or odd?