Searched refs:MO (Results 1 - 25 of 47) sorted by relevance

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/haiku-fatelf/src/system/libroot/posix/glibc/arch/x86/
H A D	e_acosh.S	38 #define MO(op) op##@GOTOFF(%edx) define 40 #define MO(op) op define 61 fsubl MO(one) // x-1 : log(2) 68 fcoml MO(limit) 75 2: faddl MO(one) // x+sqrt(2*(x-1)+(x-1)^2) : log(2) 92 fsubl MO(one) // x^2-1 : x : 2*x : log(2) 95 fdivrl MO(one) // 1/(x+sqrt(x^2-1)) : 2*x : log(2)
H A D	e_acoshf.S	38 #define MO(op) op##@GOTOFF(%edx) define 40 #define MO(op) op define 61 fsubl MO(one) // x-1 : log(2) 68 fcoml MO(limit) 75 2: faddl MO(one) // x+sqrt(2*(x-1)+(x-1)^2) : log(2) 92 fsubl MO(one) // x^2-1 : x : 2*x : log(2) 95 fdivrl MO(one) // 1/(x+sqrt(x^2-1)) : 2*x : log(2)
H A D	e_atanh.S	44 #define MO(op) op##@GOTOFF(%edx) define 46 #define MO(op) op define 67 fldt MO(ln2_2) // 0.5*ln2 70 fcoml MO(half) // |x| : 0.5*ln2 77 fsubrl MO(one) // 1-|x| : |x| : 2*|x| : 0.5*ln2 82 fcoml MO(limit) // 2*|x|+(2*|x|^2)/(1-|x|) : 0.5*ln2 92 4: faddl MO(one) // 1+2*|x|+(2*|x|^2)/(1-|x|) : 0.5*ln2 99 2: faddl MO(one) // 1+|x| : |x| : 0.5*ln2 101 fsubrl MO(one) // 1-|x| : 1+|x| : 0.5*ln2
H A D	e_atanhf.S	45 #define MO(op) op##@GOTOFF(%edx) define 47 #define MO(op) op define 67 fldt MO(ln2_2) // 0.5*ln2 70 fcoml MO(half) // |x| : 0.5*ln2 77 fsubrl MO(one) // 1-|x| : |x| : 2*|x| : 0.5*ln2 82 fcoml MO(limit) // 2*|x|+(2*|x|^2)/(1-|x|) : 0.5*ln2 92 4: faddl MO(one) // 1+2*|x|+(2*|x|^2)/(1-|x|) : 0.5*ln2 99 2: faddl MO(one) // 1+|x| : |x| : 0.5*ln2 101 fsubrl MO(one) // 1-|x| : 1+|x| : 0.5*ln2
H A D	e_atanhl.S	51 #define MO(op) op##@GOTOFF(%edx) define 53 #define MO(op) op define 74 fldt MO(ln2_2) // 0.5*ln2 77 fcoml MO(half) // |x| : 0.5*ln2 84 fsubrl MO(one) // 1-|x| : |x| : 2*|x| : 0.5*ln2 89 fcoml MO(limit) // 2*|x|+(2*|x|^2)/(1-|x|) : 0.5*ln2 99 4: faddl MO(one) // 1+2*|x|+(2*|x|^2)/(1-|x|) : 0.5*ln2 106 2: faddl MO(one) // 1+|x| : |x| : 0.5*ln2 108 fsubrl MO(one) // 1-|x| : 1+|x| : 0.5*ln2
H A D	e_log.S	30 #define MO(op) op##@GOTOFF(%edx) define 32 #define MO(op) op define 45 fsubl MO(one) // x-1 : x : log(2) 48 fcompl MO(limit) // x-1 : x : log(2)
H A D	e_logf.S	31 #define MO(op) op##@GOTOFF(%edx) define 33 #define MO(op) op define 46 fsubl MO(one) // x-1 : x : log(2) 49 fcompl MO(limit) // x-1 : x : log(2)
H A D	e_logl.S	31 #define MO(op) op##@GOTOFF(%edx) define 33 #define MO(op) op define 46 fsubl MO(one) // x-1 : x : log(2) 49 fcompl MO(limit) // x-1 : x : log(2)
H A D	s_expm1.S	44 #define MO(op) op##@GOTOFF(%edx) define 46 #define MO(op) op define 66 fldt MO(l2e) // log2(e) : x 75 fldl MO(one) // 1 : int(log2(e)*x) : 2^(log2(e)*x)-2^int(log2(e)*x) 77 fsubrl MO(one) // 1-2^int(log2(e)*x) : int(log2(e)*x) : 2^(log2(e)*x)-2^int(log2(e)*x) 85 fldl MO(minus1) // Set result to -1.0.
H A D	s_expm1f.S	44 #define MO(op) op##@GOTOFF(%edx) define 46 #define MO(op) op define 66 fldt MO(l2e) // log2(e) : x 75 fldl MO(one) // 1 : int(log2(e)*x) : 2^(log2(e)*x)-2^int(log2(e)*x) 77 fsubrl MO(one) // 1-2^int(log2(e)*x) : int(log2(e)*x) : 2^(log2(e)*x)-2^int(log2(e)*x) 85 fldl MO(minus1) // Set result to -1.0.
H A D	s_expm1l.S	44 #define MO(op) op##@GOTOFF(%edx) define 46 #define MO(op) op define 66 fldt MO(l2e) // log2(e) : x 75 fldl MO(one) // 1 : int(log2(e)*x) : 2^(log2(e)*x)-2^int(log2(e)*x) 77 fsubrl MO(one) // 1-2^int(log2(e)*x) : int(log2(e)*x) : 2^(log2(e)*x)-2^int(log2(e)*x) 85 fldl MO(minus1) // Set result to -1.0.
H A D	e_acoshl.S	44 #define MO(op) op##@GOTOFF(%edx) define 46 #define MO(op) op define 68 fsubl MO(one) // x-1 : log(2) 75 fcoml MO(limit) 82 2: faddl MO(one) // x+sqrt(2*(x-1)+(x-1)^2) : log(2) 99 fsubl MO(one) // x^2-1 : x : 2*x : log(2) 102 fdivrl MO(one) // 1/(x+sqrt(x^2-1)) : 2*x : log(2)
H A D	s_asinh.S	41 #define MO(op) op##@GOTOFF(%edx) define 43 #define MO(op) op define 76 faddl MO(one) // 1+|x|^2 : |x|^2 : |x| : log(2) 78 faddl MO(one) // 1+sqrt(1+|x|^2) : |x|^2 : |x| : log(2) 81 fcoml MO(limit) 93 6: faddl MO(one) 110 faddl MO(huge) // huge+x : x 129 faddl MO(one) // 1+|x|^2 : |x| : 2*|x| : log(2) 132 fdivrl MO(one) // 1/(|x|+sqrt(1+|x|^2)) : 2*|x| : log(2)
H A D	s_asinhf.S	41 #define MO(op) op##@GOTOFF(%edx) define 43 #define MO(op) op define 76 faddl MO(one) // 1+|x|^2 : |x|^2 : |x| : log(2) 78 faddl MO(one) // 1+sqrt(1+|x|^2) : |x|^2 : |x| : log(2) 81 fcoml MO(limit) 93 6: faddl MO(one) 110 faddl MO(huge) // huge+x : x 129 faddl MO(one) // 1+|x|^2 : |x| : 2*|x| : log(2) 132 fdivrl MO(one) // 1/(|x|+sqrt(1+|x|^2)) : 2*|x| : log(2)
H A D	s_asinhl.S	48 #define MO(op) op##@GOTOFF(%edx) define 50 #define MO(op) op define 83 faddl MO(one) // 1+|x|^2 : |x|^2 : |x| : log(2) 85 faddl MO(one) // 1+sqrt(1+|x|^2) : |x|^2 : |x| : log(2) 88 fcoml MO(limit) 100 6: faddl MO(one) 117 fldt MO(huge) // huge : x : x 137 faddl MO(one) // 1+|x|^2 : |x| : 2*|x| : log(2) 140 fdivrl MO(one) // 1/(|x|+sqrt(1+|x|^2)) : 2*|x| : log(2)
H A D	e_pow.S	53 #define MO(op) op##@GOTOFF(%ecx) define 56 #define MO(op) op define 115 fdivrl MO(one) // 1/x (now referred to as x) 119 4: fldl MO(one) // 1 : x 137 fldl MO(one) // 1.0 : x : y 149 fldl MO(one) // 1.0 : x : y 153 fcompl MO(limit) // 1.0 : x : y 169 faddl MO(one) // 2^fract(y*log2(x)) : int(y*log2(x)) 179 fldl MO(one) 187 fcompl MO(on [all...]
H A D	e_powf.S	53 #define MO(op) op##@GOTOFF(%ecx) define 56 #define MO(op) op define 114 fdivrl MO(one) // 1/x (now referred to as x) 116 4: fldl MO(one) // 1 : x 132 fldl MO(one) // 1.0 : x : y 144 fldl MO(one) // 1.0 : x : y 148 fcompl MO(limit) // 1.0 : x : y 164 faddl MO(one) // 2^fract(y*log2(x)) : int(y*log2(x)) 174 fldl MO(one) 182 fcompl MO(on [all...]
/haiku-fatelf/src/system/libroot/posix/glibc/arch/x86_64/
H A D	s_copysignf.S	36 #define MO(op) op##(%rip) define 38 #define MO(op) op define 43 movss MO(mask),%xmm3
H A D	e_log10l.S	33 #define MO(op) op##(%rip) define 35 #define MO(op) op define 47 4: fsubl MO(one) // x-1 : x : log10(2) 50 fcompl MO(limit) // x-1 : x : log10(2)
H A D	e_log2l.S	30 #define MO(op) op##(%rip) define 32 #define MO(op) op define 37 fldl MO(one) 47 fcompl MO(limit) // x-1 : x : 1
H A D	e_logl.S	32 #define MO(op) op##(%rip) define 34 #define MO(op) op define 46 4: fsubl MO(one) // x-1 : x : log(2) 49 fcompl MO(limit) // x-1 : x : log(2)
H A D	s_copysign.S	42 #define MO(op) op##(%rip) define 44 #define MO(op) op define 49 andpd MO(othermask),%xmm0 50 andpd MO(signmask),%xmm1
H A D	s_log1pl.S	34 #define MO(op) op##(%rip) define 36 #define MO(op) op define 52 fldt MO(limit) 58 faddl MO(one)
H A D	s_expm1l.S	44 #define MO(op) op##(%rip) define 46 #define MO(op) op define 66 fldt MO(l2e) // log2(e) : x 75 fldl MO(one) // 1 : int(log2(e)*x) : 2^(log2(e)*x)-2^int(log2(e)*x) 77 fsubrl MO(one) // 1-2^int(log2(e)*x) : int(log2(e)*x) : 2^(log2(e)*x)-2^int(log2(e)*x) 85 fldl MO(minus1) // Set result to -1.0.
H A D	e_powl.S	58 #define MO(op) op##(%rip) define 60 #define MO(op) op define 96 fldl MO(p63) // 1L<<63 : y : x 117 fdivrl MO(one) // 1/x (now referred to as x) 121 4: fldl MO(one) // 1 : x 139 fldl MO(one) // 1.0 : x : y 149 fldl MO(one) // 1.0 : x : y 150 fldl MO(limit) // 0.29 : 1.0 : x : y 175 faddl MO(one) // 2^fract(y*log2(x)) : int(y*log2(x)) 181 fldl MO(on [all...]

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Indexes created Wed May 22 12:01:17 MDT 2024