<<< native [ ESubsup (EIdentifier "x") (EIdentifier "b") (EIdentifier "a") , ESpace (1 % 1) , ESubsup (EIdentifier "x") (EIdentifier "b") (EIdentifier "a") , ESpace (1 % 1) , EUnder True (EMathOperator "min") (EIdentifier "A") , ESpace (1 % 1) , EUnder True (EMathOperator "max") (EIdentifier "B") , ESpace (1 % 1) , EUnder True (EMathOperator "det") (EIdentifier "C") , ESpace (1 % 1) , EUnder True (EMathOperator "Pr") (EIdentifier "A") , ESpace (1 % 1) , EUnder True (EMathOperator "gcd") (EIdentifier "A") , ESpace (1 % 1) , ESuper (EOver False (EIdentifier "u") (ESymbol Accent "\775")) (ENumber "2") , ESpace (1 % 1) , ESub (EOver False (EIdentifier "u") (ESymbol TOver "\175")) (EIdentifier "\949") , ESpace (1 % 1) , ESubsup (EUnder False (EIdentifier "u") (ESymbol TUnder "_")) (EIdentifier "b") (EIdentifier "a") , ESpace (1 % 1) , EOver False (EOver False (EGrouped [ EIdentifier "a" , ESymbol Bin "+" , EIdentifier "b" ]) (ESymbol TOver "\9182")) (EText TextNormal "term") , ESpace (1 % 1) , EOver False (EOver False (EGrouped [ EIdentifier "a" , ESymbol Bin "+" , EIdentifier "b" ]) (ESymbol TOver "\9140")) (EIdentifier "c") , ESpace (1 % 1) , EUnder False (EUnder False (EGrouped [ EIdentifier "a" , ESymbol Bin "+" , EIdentifier "b" ]) (ESymbol TUnder "\9183")) (EIdentifier "c") , ESpace (1 % 1) , EUnder False (EUnder False (EGrouped [ EIdentifier "a" , ESymbol Bin "+" , EIdentifier "b" ]) (ESymbol TUnder "\9141")) (EIdentifier "c") , ESuper (ESpace (1 % 1)) (EIdentifier "H") , EIdentifier "e" , ENumber "3" , ESub (ESpace (1 % 1)) (EIdentifier "x") , EIdentifier "A" , ESubsup (ESpace (1 % 1)) (EIdentifier "x") (ENumber "3") ] >>> eqn x sub b sup a fwd 100 x sub b sup a fwd 100 min from A fwd 100 max from B fwd 100 "det" from C fwd 100 "Pr" from A fwd 100 "gcd" from A fwd 100 {u to \[u0307]} sup 2 fwd 100 {u to \[u00AF]} sub \[u03B5] fwd 100 {u from _} sub b sup a fwd 100 {{a + b} to \[u23DE]} to {roman "term"} fwd 100 {{a + b} to \[u23B4]} to c fwd 100 {{a + b} from \[u23DF]} from c fwd 100 {{a + b} from \[u23B5]} from c {fwd 100} sup H e 3 {fwd 100} sub x A {fwd 100} sub x sup 3