BMæ6(( °  úúÿ2–2–2–úúÿúúÿ2–2–úúÿúúÿúúÿúúÿúúÿúúÿ–d úúÿúúÿúúÿúúÿúúÿúúÿ–2–2–2úúÿúúÿ–2úúÿúúÿúúÿúúÿúúÿúúÿ2–2–2–úúÿúúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿúúÿúúÿ–d úúÿúúÿúúÿúúÿúúÿúúÿúúÿ–2úúÿúúÿ–2–2úúÿúúÿúúÿúúÿ2–2–úúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿúúÿúúÿ–d úúÿ–d úúÿúúÿúúÿúúÿúúÿúúÿ–2úúÿúúÿ–2–2úúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿ2–úúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿúúÿúúÿ–d úúÿ–d úúÿúúÿúúÿúúÿúúÿúúÿ–2úúÿúúÿ–2–2úúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿ2–úúÿ2–úúÿúúÿúúÿúúÿúúÿúúÿúúÿúúÿ–d úúÿ–d úúÿúúÿúúÿúúÿúúÿúúÿ–2úúÿ–2úúÿ–2úúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿ2–2–2–2–úúÿúúÿúúÿúúÿúúÿúúÿúúÿ–d úúÿ–d úúÿúúÿúúÿúúÿúúÿúúÿ–2úúÿ–2úúÿ–2úúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿ–d úúÿúúÿúúÿ–d úúÿúúÿúúÿúúÿúúÿ–2úúÿ–2úúÿ–2úúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿ–d úúÿúúÿúúÿ–d úúÿúúÿúúÿúúÿúúÿ–2–2úúÿúúÿ–2úúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿúúÿ–d úúÿúúÿúúÿ–d úúÿúúÿúúÿúúÿúúÿ–2–2úúÿúúÿ–2úúÿúúÿúúÿúúÿúúÿ2–úúÿúúÿúúÿ2–úúÿúúÿúúÿúúÿ2–2–2–2–2–úúÿúúÿúúÿúúÿúúÿ–d –d –d úúÿ–d –d –d úúÿúúÿúúÿ–2–2–2úúÿ–2–2–2úúÿúúÿúúÿúúÿúúÿ2–2–2–úúÿúúÿúúÿúúÿ