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R1 r2 r1
yes press R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2,R1,R2, then press select to complete the entire game
8059
Let R1 = rational number Let X = irrational number Assume R1 + X = (some rational number) We add -R1 to both sides, and we get: -R1 + x = (some irrational number) + (-R1), thus X = (SIR) + (-R1), which implies that X, an irrational number, is the sum of two rational numbers, which is a contradiction. Thus, the sum of a rational number and an irrational number is always irrational. (Proof by contradiction)
R1, R1, R2, R2, Right Trigger, Left Trigger, R1, R1, R2, R2.
L1,L1,L1,R1,R1,R1,R1,R1,L2,L2,L2,L2 This may not work
R1 easily
it should work L2 UP R1 R1 LEFT R1 R1 R2 RIGHT DOWN
R1, R1, L2, R1, R1, L2, Circle, Circle.
yes to unlock all maps r1 l1 l1 r1 r1 r1
U1, l2, d1, l1,u1, l2, d3, r1, d1, r2, u1, l2, r1, u2, r1, u1, l2, r1, d1, l1, r1, d3, r3, u1, l2, d1, l1, u3, r1, u1, l1, r3, d1, l3, r2, d2, r1, d1, l3, u3, r1, d1,r1, d1, l2
L1, D4, R1, D2, L1, U5, D4, L2, D1, R1, D1, R1, U2, R1, U2, L1, U2, R1, U2, L1, D3, U4, L2, D1, R1, U1, R1, D3 and put the last one in place.