BMæ6(( °  úúÿ–ú–úúúÿ–úúúÿ–ú–úúúÿúúÿúúÿ2–2–2–úúÿúúÿ2–úúÿúúÿúúÿúúÿdddddddddúúÿúúÿddddddúúÿúúÿúúÿ2–2–2–úúÿúúÿ2–úúÿ2–úúÿúúÿúúÿ–úúúÿ–úúúÿ–úúúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿ2–2–úúÿúúÿúúÿúúÿúúÿdddúúÿúúÿúúÿdddúúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿ2–2–úúÿúúÿúúÿúúÿúúÿ–úúúÿ–úúúÿ–úúúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿ2–2–úúÿúúÿúúÿúúÿúúÿdddúúÿúúÿdddúúÿúúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿ2–2–úúÿúúÿúúÿúúÿúúÿ–úúúÿ–úúúÿ–úúúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿ2–2–úúÿúúÿúúÿúúÿúúÿdddúúÿúúÿdddúúÿúúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿ2–2–úúÿúúÿúúÿúúÿúúÿ–úúúÿ–úúúÿ–úúúÿúúÿúúÿúúÿúúÿ2–úúÿ2–úúÿ2–úúÿúúÿúúÿúúÿúúÿdddúúÿdddúúÿúúÿúúÿúúÿúúÿúúÿúúÿ2–úúÿ2–úúÿ2–úúÿúúÿúúÿúúÿúúÿ–úúúÿ–úúúÿ–úúúÿúúÿúúÿúúÿúúÿ2–úúÿ2–úúÿ2–úúÿúúÿúúÿúúÿúúÿddddddddddddúúÿúúÿúúÿúúÿúúÿúúÿ2–úúÿ2–úúÿ2–úúÿúúÿúúÿúúÿúúÿ–ú–úúúÿ–ú–úúúÿúúÿúúÿúúÿúúÿ2–úúÿ2–úúÿ2–úúÿúúÿúúÿúúÿúúÿdddúúÿúúÿúúÿdddúúÿúúÿúúÿúúÿúúÿ2–úúÿ2–úúÿ2–úúÿúúÿúúÿúúÿúúÿ–ú–úúúÿ–ú–úúúÿúúÿúúÿúúÿúúÿ2–2–úúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿdddúúÿúúÿúúÿdddúúÿúúÿúúÿúúÿúúÿ2–2–úúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿ–ú–úúúÿ–ú–úúúÿúúÿúúÿúúÿúúÿ2–2–úúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿdddúúÿúúÿúúÿdddúúÿúúÿúúÿúúÿúúÿ2–2–úúÿúúÿ2–úúÿúúÿúúÿúúÿ–ú–ú–úúúÿ–ú–ú–úúúÿúúÿúúÿ2–2–2–úúÿ2–2–2–úúÿúúÿúúÿdddddddddddddddúúÿúúÿúúÿúúÿúúÿ2–2–2–úúÿ2–2–2–úúÿúúÿ