= fa_0[3]/ha_0/xor2_0/inv_0/Z fa_0[3]/ha_0/xor2_0/8_130_117#
= fa_0[3]/ha_0/xor2_0/inv_1/Z fa_0[3]/ha_0/xor2_0/8_88_6#
= A0 fa_0[3]/A
= A0 fa_0[3]/ha_0/A
= A0 fa_0[3]/ha_0/xor2_0/XORA
= A0 fa_0[3]/ha_0/xor2_0/inv_0/A
= A0 fa_0[3]/ha_0/nand2_0/B
= B0 fa_0[3]/B
= B0 fa_0[3]/ha_0/B
= B0 fa_0[3]/ha_0/xor2_0/XORB
= B0 fa_0[3]/ha_0/xor2_0/inv_1/A
= B0 fa_0[3]/ha_0/nand2_0/A
= Q0 fa_0[3]/Q
= Q0 fa_0[3]/ha_1/Q
= Q0 fa_0[3]/ha_1/xor2_0/Z
= fa_0[3]/ha_1/xor2_0/inv_0/Z fa_0[3]/ha_1/xor2_0/8_130_117#
= fa_0[3]/ha_1/xor2_0/inv_1/Z fa_0[3]/ha_1/xor2_0/8_88_6#
= Cin fa_0[3]/Cin
= Cin fa_0[3]/ha_1/A
= Cin fa_0[3]/ha_1/xor2_0/XORA
= Cin fa_0[3]/ha_1/xor2_0/inv_0/A
= Cin fa_0[3]/ha_1/nand2_0/B
= fa_0[3]/ha_1/B fa_0[3]/ha_0/Q
= fa_0[3]/ha_1/B fa_0[3]/8_15_13#
= fa_0[3]/ha_1/B fa_0[3]/ha_0/xor2_0/Z
= fa_0[3]/ha_1/B fa_0[3]/ha_1/xor2_0/XORB
= fa_0[3]/ha_1/B fa_0[3]/ha_1/xor2_0/inv_1/A
= fa_0[3]/ha_1/B fa_0[3]/ha_1/nand2_0/A
= GND! fa_0[0]/9_53_109#
= GND! fa_0[0]/ha_0/9_0_29#
= GND! fa_0[0]/ha_1/9_0_29#
= GND! fa_0[1]/9_53_109#
= GND! fa_0[1]/ha_0/9_0_29#
= GND! fa_0[1]/ha_1/9_0_29#
= GND! fa_0[2]/9_53_109#
= GND! fa_0[2]/ha_0/9_0_29#
= GND! fa_0[2]/ha_1/9_0_29#
= GND! fa_0[3]/9_53_109#
= GND! fa_0[3]/ha_0/9_0_29#
= GND! fa_0[3]/ha_1/9_0_29#
= fa_0[2]/Cin 9_65_798#
= fa_0[2]/Cin fa_0[2]/ha_1/A
= fa_0[2]/Cin fa_0[2]/ha_1/xor2_0/XORA
= fa_0[2]/Cin fa_0[2]/ha_1/xor2_0/inv_0/A
= fa_0[2]/Cin fa_0[2]/ha_1/nand2_0/B
= fa_0[2]/Cin fa_0[3]/Cout
= fa_0[2]/Cin fa_0[3]/nand2_0/Z
= Vdd! fa_0[0]/9_79_112#
= Vdd! fa_0[0]/ha_0/9_22_192#
= Vdd! fa_0[0]/ha_1/9_22_192#
= Vdd! fa_0[1]/9_79_112#
= Vdd! fa_0[1]/ha_0/9_22_192#
= Vdd! fa_0[1]/ha_1/9_22_192#
= Vdd! fa_0[2]/9_79_112#
= Vdd! fa_0[2]/ha_0/9_22_192#
= Vdd! fa_0[2]/ha_1/9_22_192#
= Vdd! fa_0[3]/9_79_112#
= Vdd! fa_0[3]/ha_0/9_22_192#
= Vdd! fa_0[3]/ha_1/9_22_192#
= fa_0[3]/ha_1/C fa_0[3]/8_324_35#
= fa_0[3]/ha_1/C fa_0[3]/ha_1/nand2_0/Z
= fa_0[3]/ha_1/C fa_0[3]/nand2_0/B
= fa_0[3]/ha_0/C fa_0[3]/8_308_123#
= fa_0[3]/ha_0/C fa_0[3]/ha_0/nand2_0/Z
= fa_0[3]/ha_0/C fa_0[3]/nand2_0/A
= fa_0[2]/ha_0/xor2_0/inv_0/Z fa_0[2]/ha_0/xor2_0/8_130_117#
= fa_0[2]/ha_0/xor2_0/inv_1/Z fa_0[2]/ha_0/xor2_0/8_88_6#
= A1 fa_0[2]/A
= A1 fa_0[2]/ha_0/A
= A1 fa_0[2]/ha_0/xor2_0/XORA
= A1 fa_0[2]/ha_0/xor2_0/inv_0/A
= A1 fa_0[2]/ha_0/nand2_0/B
= B1 fa_0[2]/B
= B1 fa_0[2]/ha_0/B
= B1 fa_0[2]/ha_0/xor2_0/XORB
= B1 fa_0[2]/ha_0/xor2_0/inv_1/A
= B1 fa_0[2]/ha_0/nand2_0/A
= Q1 fa_0[2]/Q
= Q1 fa_0[2]/ha_1/Q
= Q1 fa_0[2]/ha_1/xor2_0/Z
= fa_0[2]/ha_1/xor2_0/inv_0/Z fa_0[2]/ha_1/xor2_0/8_130_117#
= fa_0[2]/ha_1/xor2_0/inv_1/Z fa_0[2]/ha_1/xor2_0/8_88_6#
= fa_0[2]/ha_1/B fa_0[2]/ha_0/Q
= fa_0[2]/ha_1/B fa_0[2]/8_15_13#
= fa_0[2]/ha_1/B fa_0[2]/ha_0/xor2_0/Z
= fa_0[2]/ha_1/B fa_0[2]/ha_1/xor2_0/XORB
= fa_0[2]/ha_1/B fa_0[2]/ha_1/xor2_0/inv_1/A
= fa_0[2]/ha_1/B fa_0[2]/ha_1/nand2_0/A
= fa_0[1]/Cin 9_65_536#
= fa_0[1]/Cin fa_0[1]/ha_1/A
= fa_0[1]/Cin fa_0[1]/ha_1/xor2_0/XORA
= fa_0[1]/Cin fa_0[1]/ha_1/xor2_0/inv_0/A
= fa_0[1]/Cin fa_0[1]/ha_1/nand2_0/B
= fa_0[1]/Cin fa_0[2]/Cout
= fa_0[1]/Cin fa_0[2]/nand2_0/Z
= fa_0[2]/ha_1/C fa_0[2]/8_324_35#
= fa_0[2]/ha_1/C fa_0[2]/ha_1/nand2_0/Z
= fa_0[2]/ha_1/C fa_0[2]/nand2_0/B
= fa_0[2]/ha_0/C fa_0[2]/8_308_123#
= fa_0[2]/ha_0/C fa_0[2]/ha_0/nand2_0/Z
= fa_0[2]/ha_0/C fa_0[2]/nand2_0/A
= fa_0[1]/ha_0/xor2_0/inv_0/Z fa_0[1]/ha_0/xor2_0/8_130_117#
= fa_0[1]/ha_0/xor2_0/inv_1/Z fa_0[1]/ha_0/xor2_0/8_88_6#
= A2 fa_0[1]/A
= A2 fa_0[1]/ha_0/A
= A2 fa_0[1]/ha_0/xor2_0/XORA
= A2 fa_0[1]/ha_0/xor2_0/inv_0/A
= A2 fa_0[1]/ha_0/nand2_0/B
= B2 fa_0[1]/B
= B2 fa_0[1]/ha_0/B
= B2 fa_0[1]/ha_0/xor2_0/XORB
= B2 fa_0[1]/ha_0/xor2_0/inv_1/A
= B2 fa_0[1]/ha_0/nand2_0/A
= Q2 fa_0[1]/Q
= Q2 fa_0[1]/ha_1/Q
= Q2 fa_0[1]/ha_1/xor2_0/Z
= fa_0[1]/ha_1/xor2_0/inv_0/Z fa_0[1]/ha_1/xor2_0/8_130_117#
= fa_0[1]/ha_1/xor2_0/inv_1/Z fa_0[1]/ha_1/xor2_0/8_88_6#
= fa_0[1]/ha_1/B fa_0[1]/ha_0/Q
= fa_0[1]/ha_1/B fa_0[1]/8_15_13#
= fa_0[1]/ha_1/B fa_0[1]/ha_0/xor2_0/Z
= fa_0[1]/ha_1/B fa_0[1]/ha_1/xor2_0/XORB
= fa_0[1]/ha_1/B fa_0[1]/ha_1/xor2_0/inv_1/A
= fa_0[1]/ha_1/B fa_0[1]/ha_1/nand2_0/A
= fa_0[0]/Cin 9_65_274#
= fa_0[0]/Cin fa_0[0]/ha_1/A
= fa_0[0]/Cin fa_0[0]/ha_1/xor2_0/XORA
= fa_0[0]/Cin fa_0[0]/ha_1/xor2_0/inv_0/A
= fa_0[0]/Cin fa_0[0]/ha_1/nand2_0/B
= fa_0[0]/Cin fa_0[1]/Cout
= fa_0[0]/Cin fa_0[1]/nand2_0/Z
= fa_0[1]/ha_1/C fa_0[1]/8_324_35#
= fa_0[1]/ha_1/C fa_0[1]/ha_1/nand2_0/Z
= fa_0[1]/ha_1/C fa_0[1]/nand2_0/B
= fa_0[1]/ha_0/C fa_0[1]/8_308_123#
= fa_0[1]/ha_0/C fa_0[1]/ha_0/nand2_0/Z
= fa_0[1]/ha_0/C fa_0[1]/nand2_0/A
= fa_0[0]/ha_0/xor2_0/inv_0/Z fa_0[0]/ha_0/xor2_0/8_130_117#
= fa_0[0]/ha_0/xor2_0/inv_1/Z fa_0[0]/ha_0/xor2_0/8_88_6#
= A3 fa_0[0]/A
= A3 fa_0[0]/ha_0/A
= A3 fa_0[0]/ha_0/xor2_0/XORA
= A3 fa_0[0]/ha_0/xor2_0/inv_0/A
= A3 fa_0[0]/ha_0/nand2_0/B
= B3 fa_0[0]/B
= B3 fa_0[0]/ha_0/B
= B3 fa_0[0]/ha_0/xor2_0/XORB
= B3 fa_0[0]/ha_0/xor2_0/inv_1/A
= B3 fa_0[0]/ha_0/nand2_0/A
= Q3 fa_0[0]/Q
= Q3 fa_0[0]/ha_1/Q
= Q3 fa_0[0]/ha_1/xor2_0/Z
= fa_0[0]/ha_1/xor2_0/inv_0/Z fa_0[0]/ha_1/xor2_0/8_130_117#
= fa_0[0]/ha_1/xor2_0/inv_1/Z fa_0[0]/ha_1/xor2_0/8_88_6#
= fa_0[0]/ha_1/B fa_0[0]/ha_0/Q
= fa_0[0]/ha_1/B fa_0[0]/8_15_13#
= fa_0[0]/ha_1/B fa_0[0]/ha_0/xor2_0/Z
= fa_0[0]/ha_1/B fa_0[0]/ha_1/xor2_0/XORB
= fa_0[0]/ha_1/B fa_0[0]/ha_1/xor2_0/inv_1/A
= fa_0[0]/ha_1/B fa_0[0]/ha_1/nand2_0/A
= Cout fa_0[0]/Cout
= Cout fa_0[0]/nand2_0/Z
= fa_0[0]/ha_1/C fa_0[0]/8_324_35#
= fa_0[0]/ha_1/C fa_0[0]/ha_1/nand2_0/Z
= fa_0[0]/ha_1/C fa_0[0]/nand2_0/B
= fa_0[0]/ha_0/C 9_222_26#
= fa_0[0]/ha_0/C fa_0[0]/8_308_123#
= fa_0[0]/ha_0/C fa_0[0]/ha_0/nand2_0/Z
= fa_0[0]/ha_0/C fa_0[0]/nand2_0/A