DegreesAndMultiplicities2A5sc_5mod6 := [ [1, 1], [Phi1*Phi3*Phi6, q], [q*Phi10, 1], [Phi3*Phi6*Phi10, q], [q^2*Phi3*Phi6^2, 1], [1/2*Phi1*Phi3*Phi4*Phi10, 2], [1/2*Phi2^3*Phi6*Phi10, 2], [q*Phi1^2*Phi3*Phi4*Phi6, q], [Phi1*Phi3*Phi6*Phi10, 1/2*q*(q-1)], [Phi1*Phi3*Phi4*Phi10, 1/2*q-1/2], [q^3*Phi4*Phi10, 1], [q*Phi3*Phi6*Phi10, q], [q^3*Phi3*Phi10, 1], [Phi2*Phi3*Phi6*Phi10, 1/2*(q+1)*(q-2)], [Phi2^3*Phi6*Phi10, 1/2*q-3/2], [q^4*Phi1^3*Phi3*Phi4, 1], [q*Phi1^2*Phi3*Phi4*Phi10, q], [q^2*Phi1*Phi3*Phi6*Phi10, q], [Phi1*Phi3*Phi4*Phi6*Phi10, q*(q-1)], [q*Phi3*Phi6^2*Phi10, q], [1/3*Phi3*Phi4*Phi6^2*Phi10, 3], [1/3*Phi1^2*Phi2^4*Phi4*Phi10, 6], [Phi1^2*Phi3*Phi4*Phi6*Phi10, 1/6*q*(q-1)*(q-2)], [q*Phi1*Phi3*Phi6^2*Phi10, 1/2*q*(q-1)], [q*Phi1*Phi3*Phi4*Phi6*Phi10, q*(q-1)], [q^3*Phi1*Phi3*Phi4*Phi6^2, q], [q^2*Phi3*Phi6^2*Phi10, q], [Phi3*Phi4*Phi6^2*Phi10, 1/6*(q+1)*(q-2)], [q^3*Phi1*Phi3*Phi4*Phi10, q], [Phi1*Phi2*Phi3*Phi4*Phi6*Phi10, 1/2*q*(q+1)*(q-2)], [q^6*Phi4*Phi10, 1], [q*Phi2*Phi3*Phi6^2*Phi10, 1/2*(q+1)*(q-2)], [q^2*Phi3*Phi4*Phi6*Phi10, q], [Phi1^2*Phi2^2*Phi3*Phi4*Phi10, 1/3*q*(q-1)*(q+1)], [q^6*Phi3*Phi10, 1], [Phi2^2*Phi3*Phi6^2*Phi10, 1/2*(q+1)*(q-2)], [Phi1^2*Phi2^4*Phi4*Phi10, 1/3*(q+1)*(q-2)], [1/2*q^2*Phi1^3*Phi3*Phi4*Phi10, 2], [1/2*Phi1*Phi3*Phi4*Phi6^2*Phi10, q-1], [1/2*Phi1*Phi2^2*Phi3*Phi6^2*Phi10, q+1], [1/2*Phi2*Phi3*Phi4*Phi6^2*Phi10, q+1], [1/2*q^2*Phi2^3*Phi4*Phi6*Phi10, 2], [1/2*Phi2^3*Phi3*Phi6^2*Phi10, q-1], [q^2*Phi1^3*Phi3*Phi4*Phi10, 1/2*q-1/2], [q*Phi1^2*Phi3*Phi4*Phi6*Phi10, q*(q-1)], [Phi1*Phi3*Phi4*Phi6^2*Phi10, 1/4*(q-1)*(q^2-2*q-1)], [q^4*Phi1*Phi3*Phi6*Phi10, q], [q^2*Phi1*Phi3*Phi4*Phi6*Phi10, 1/2*q*(q-1)], [q^3*Phi3*Phi6^2*Phi10, q], [q*Phi3*Phi4*Phi6^2*Phi10, 1/2*q*(q-1)], [Phi1*Phi2^2*Phi3*Phi6^2*Phi10, 1/4*(q+1)*(q^2-2*q-1)], [q^7*Phi3*Phi6^2, 1], [q^3*Phi3*Phi4*Phi6*Phi10, q], [Phi2*Phi3*Phi4*Phi6^2*Phi10, 1/4*(q+1)*(q^2-2*q-1)], [q*Phi2^2*Phi3*Phi6^2*Phi10, 1/2*(q+1)*(q-2)], [q^2*Phi2*Phi3*Phi4*Phi6*Phi10, 1/2*(q+1)*(q-2)], [q^2*Phi2^3*Phi4*Phi6*Phi10, 1/2*q-3/2], [Phi2^3*Phi3*Phi6^2*Phi10, 1/4*(q-3)*(q^2-3)], [q*Phi1^3*Phi3*Phi4*Phi6*Phi10, 1/6*q*(q-1)*(q-2)], [Phi1^2*Phi3*Phi4*Phi6^2*Phi10, 1/24*q*(q-1)*(q-2)*(q-3)], [q^2*Phi1^2*Phi3*Phi4*Phi6*Phi10, q*(q-1)], [q^3*Phi1*Phi3*Phi6^2*Phi10, 1/2*q*(q-1)], [q*Phi1*Phi3*Phi4*Phi6^2*Phi10, 1/2*q*(q-1)*(q-2)], [q^4*Phi1^2*Phi3*Phi4*Phi10, q], [q^6*Phi1^2*Phi3*Phi4*Phi6, q], [q*Phi1^2*Phi2*Phi3*Phi4*Phi6*Phi10, 1/2*q*(q+1)*(q-2)], [q^3*Phi1*Phi3*Phi4*Phi6*Phi10, q*(q-1)], [Phi1*Phi2*Phi3*Phi4*Phi6^2*Phi10, 1/4*q*(q-1)*(q-2)*(q+1)], [q^4*Phi3*Phi6^2*Phi10, q], [q^2*Phi3*Phi4*Phi6^2*Phi10, 1/2*q*(q-1)], [q*Phi1^3*Phi2^2*Phi3*Phi4*Phi10, 1/3*q*(q-1)*(q+1)], [Phi1^2*Phi2^2*Phi3*Phi4*Phi6*Phi10, 1/3*q^2*(q-1)*(q+1)], [q^10*Phi10, 1], [q^6*Phi3*Phi6*Phi10, q], [q^3*Phi2*Phi3*Phi6^2*Phi10, 1/2*(q+1)*(q-2)], [q*Phi2*Phi3*Phi4*Phi6^2*Phi10, 1/2*q*(q+1)*(q-2)], [Phi1*Phi2^3*Phi3*Phi6^2*Phi10, 1/4*q^2*(q-1)*(q+1)], [q^2*Phi2^2*Phi3*Phi6^2*Phi10, 1/2*(q+1)*(q-2)], [Phi2^2*Phi3*Phi4*Phi6^2*Phi10, 1/8*(q+1)*(q-2)*(q^2-q-4)], [1/6*Phi1^3*Phi3*Phi4*Phi6^2*Phi10, 6], [1/6*Phi1^3*Phi2^4*Phi3*Phi4*Phi10, 12], [1/6*Phi1^2*Phi2^5*Phi4*Phi6*Phi10, 12], [1/6*Phi2^3*Phi3*Phi4*Phi6^2*Phi10, 6], [1/3*Phi1^3*Phi3*Phi4*Phi6^2*Phi10, 1/2*q-5/2], [1/3*Phi1^3*Phi2^2*Phi3*Phi4*Phi6*Phi10, 2*q+2], [1/3*q^3*Phi3*Phi4*Phi6^2*Phi10, 3], [1/3*Phi1^3*Phi2^4*Phi3*Phi4*Phi10, 2*q-4], [1/3*q^3*Phi1^2*Phi2^4*Phi4*Phi10, 6], [1/3*Phi1^2*Phi2^5*Phi4*Phi6*Phi10, 3*q-9], [1/3*Phi2^3*Phi3*Phi4*Phi6^2*Phi10, 3/2*q-9/2], [1/2*Phi1^3*Phi3*Phi4*Phi6^2*Phi10, 1/12*(q+1)*(q-5)], [1/2*Phi1^2*Phi2*Phi3*Phi4*Phi6^2*Phi10, 1/4*(q-1)*(q+1)], [1/2*q^2*Phi1*Phi3*Phi4*Phi6^2*Phi10, q-1], [1/2*Phi1^2*Phi2^3*Phi3*Phi6^2*Phi10, 1/2*(q-1)*(q+1)], [1/2*q^2*Phi1*Phi2^2*Phi3*Phi6^2*Phi10, q+1], [1/2*q^6*Phi1*Phi3*Phi4*Phi10, 2], [1/2*Phi1*Phi2^2*Phi3*Phi4*Phi6^2*Phi10, 1/4*(q+1)*(3*q-7)], [1/2*q^2*Phi2*Phi3*Phi4*Phi6^2*Phi10, q+1], [1/2*Phi1^3*Phi2^4*Phi3*Phi4*Phi10, 2/3*(q+1)*(q-2)], [1/2*Phi1^2*Phi2^5*Phi4*Phi6*Phi10, 2/3*(q+1)*(q-2)], [1/2*Phi1*Phi2^4*Phi3*Phi6^2*Phi10, 1/2*(q-1)*(q+1)], [1/2*q^6*Phi2^3*Phi6*Phi10, 2], [1/2*q^2*Phi2^3*Phi3*Phi6^2*Phi10, q-1], [1/2*Phi2^3*Phi3*Phi4*Phi6^2*Phi10, 1/12*(q+1)*(7*q-23)], [Phi1^3*Phi3*Phi4*Phi6^2*Phi10, 1/720*(q+1)*(q-5)*(q^3-6*q^2+16*q-31)], [q*Phi1^2*Phi3*Phi4*Phi6^2*Phi10, 1/24*q*(q-1)*(q-2)*(q-3)], [q^3*Phi1^2*Phi3*Phi4*Phi6*Phi10, 1/6*q*(q-1)*(q-2)], [Phi1^2*Phi2*Phi3*Phi4*Phi6^2*Phi10, 1/48*(q-1)*(q-3)*(q+1)*(q^2-q+1)], [q^2*Phi1*Phi3*Phi4*Phi6^2*Phi10, 1/4*(q-1)*(q^2-2*q-1)], [Phi1^3*Phi2^2*Phi3*Phi4*Phi6*Phi10, 1/18*(q-2)*(q^2-q+2)*(q+1)^2], [q^6*Phi1*Phi3*Phi6*Phi10, 1/2*q*(q-1)], [q^4*Phi1*Phi3*Phi4*Phi6*Phi10, q*(q-1)], [q*Phi1*Phi2*Phi3*Phi4*Phi6^2*Phi10, 1/4*q*(q-1)*(q-2)*(q+1)], [q^3*Phi3*Phi4*Phi6^2*Phi10, 1/6*(q+1)*(q-2)], [Phi1^2*Phi2^3*Phi3*Phi6^2*Phi10, 1/8*(q+1)*(q^2+q+1)*(q-1)^2], [q*Phi1^2*Phi2^2*Phi3*Phi4*Phi6*Phi10, 1/3*q^2*(q-1)*(q+1)], [q^10*Phi1*Phi3*Phi6, q], [q^2*Phi1*Phi2^2*Phi3*Phi6^2*Phi10, 1/4*(q+1)*(q^2-2*q-1)], [q^6*Phi1*Phi3*Phi4*Phi10, 1/2*q-1/2], [q^3*Phi1*Phi2*Phi3*Phi4*Phi6*Phi10, 1/2*q*(q+1)*(q-2)], [q^7*Phi3*Phi6*Phi10, q], [Phi1*Phi2^2*Phi3*Phi4*Phi6^2*Phi10, 1/16*(q+1)*(q^4-3*q^3-2*q^2+5*q+7)], [q^2*Phi2*Phi3*Phi4*Phi6^2*Phi10, 1/4*(q+1)*(q^2-2*q-1)], [Phi1^3*Phi2^4*Phi3*Phi4*Phi6^2, 1/5*q*(q-1)*(q+1)*(q^2+1)], [q^3*Phi1^2*Phi2^2*Phi3*Phi4*Phi10, 1/3*q*(q-1)*(q+1)], [Phi1^2*Phi2^3*Phi3*Phi4*Phi6*Phi10, 1/6*q*(q-1)*(q-2)*(q+1)^2], [q^15, 1], [q*Phi1*Phi2^3*Phi3*Phi6^2*Phi10, 1/4*q^2*(q-1)*(q+1)], [q^6*Phi2*Phi3*Phi6*Phi10, 1/2*(q+1)*(q-2)], [q^3*Phi2^2*Phi3*Phi6^2*Phi10, 1/2*(q+1)*(q-2)], [q*Phi2^2*Phi3*Phi4*Phi6^2*Phi10, 1/8*(q+1)*(q-2)*(q^2-q-4)], [Phi1^3*Phi2^4*Phi3*Phi4*Phi10, 1/18*(q+1)*(q-2)*(q^3+q-4)], [q^3*Phi1^2*Phi2^4*Phi4*Phi10, 1/3*(q+1)*(q-2)], [Phi1^2*Phi2^5*Phi4*Phi6*Phi10, 1/6*(q+1)*(q^4-2*q^3+3*q^2-6*q+6)], [Phi1*Phi2^4*Phi3*Phi6^2*Phi10, 1/8*(q-1)*(q+1)*(q^3-2*q^2-1)], [q^6*Phi2^3*Phi6*Phi10, 1/2*q-3/2], [q^2*Phi2^3*Phi3*Phi6^2*Phi10, 1/4*(q-3)*(q^2-3)], [Phi2^3*Phi3*Phi4*Phi6^2*Phi10, 1/48*(q-3)*(q+1)*(q^3-2*q^2-6*q+3)] ];