Solve more homework problems.
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HomeworkEight.idr
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34
HomeworkEight.idr
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module HomeworkEight
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%default total
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%access public export
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data Exp = Var String | Abs String Exp | App Exp Exp
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data Occur : List String -> Exp -> Type where
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OVar : Occur [s] (Var s)
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OAbs : Occur xs e -> Occur xs (Abs s e)
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OApp : Occur xs e1 -> Occur ys e2 -> Occur (xs ++ ys) (App e1 e2)
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occ1 : Occur ["x"] (Var "x")
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occ1 = OVar
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occ2 : Occur ["x"] (Abs "y" (Var "x"))
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occ2 = OAbs OVar
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occ3 : Occur ["x","x"] (App (Var "x") (Var "x"))
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occ3 = OApp OVar OVar
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occ4 : Occur ["x","x"] (Abs "x" (App (Var "x") (Var "x")))
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occ4 = OAbs occ3
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--
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-- -----------------
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-- [x] @ x
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--
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-- xs @ e
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-- -----------------
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-- xs @ \x . e
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--
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-- xs @ e1 ys @ e2 zs = xs ++ ys
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-- -------------------------------
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-- zs @ e1 e2
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55
HomeworkFive.idr
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55
HomeworkFive.idr
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module HomeworkFive
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import HomeworkFour
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%default total
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zeroEven : even Z = True
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zeroEven = Refl
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twoEven : even (S (S Z)) = True
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twoEven = Refl
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threeOdd : even (S (S (S Z))) = False
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threeOdd = Refl
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fourEven : even (S (S (S (S Z)))) = True
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fourEven = Refl
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xor : Bool -> Bool -> Bool
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xor True p = not p
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xor False p = p
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xorNot : b1 = b2 -> xor (not b1) b2 = True
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xorNot {b1=True} Refl = Refl
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xorNot {b1=False} Refl = Refl
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xorEq : xor (not b1) b2 = b1 == b2
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xorEq {b1=True} {b2=True} = Refl
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xorEq {b1=True} {b2=False} = Refl
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xorEq {b1=False} {b2=True} = Refl
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xorEq {b1=False} {b2=False} = Refl
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plusE : even n = bn -> even m = bm -> even (n+m) = (xor (not bn) bm)
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plusE {n=Z} Refl p = p
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plusE {n=S Z} Refl p = evenFlip p
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plusE {n=S (S m)} p1 p2 = plusE {n=m} p1 p2
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plusEE : even n = True -> even m = True -> even (n+m) = True
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plusEE = plusE
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plusOE : even n = False -> even m = True -> even (n+m) = False
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plusOE = plusE
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plusEO : even n = True -> even m = False -> even (n+m) = False
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plusEO = plusE
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plusOO : even n = False -> even m = False -> even (n+m) = True
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plusOO = plusE
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plusEvenOdd : even n = even m -> even (n+m) = True
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plusEvenOdd p = replace (xorNot (sym p)) $ plusE p (sym p)
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plusEvenOdd' : even n = x -> even m = y -> even (n+m) = x==y
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plusEvenOdd' p1 p2 = replace xorEq (plusE p1 p2)
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plusEvenOdd'' : even n = x -> even m = y -> x = y -> even (n+m) = True
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plusEvenOdd'' Refl Refl eq = plusEvenOdd eq
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39
HomeworkFour.idr
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39
HomeworkFour.idr
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module HomeworkFour
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%default total
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%access public export
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even : Nat -> Bool
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even Z = True
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even (S Z) = False
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even (S (S n)) = even n
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evenSuc : even n = True -> even (S n) = False
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evenSuc {n=Z} Refl = Refl
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evenSuc {n=S Z} Refl impossible
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evenSuc {n=S (S m)} p = evenSuc {n=m} p
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oddSuc : even n = False -> even (S n) = True
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oddSuc {n=Z} Refl impossible
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oddSuc {n=S Z} Refl = Refl
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oddSuc {n=S (S m)} p = oddSuc {n=m} p
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evenFlip : even n = b -> even (S n) = not b
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evenFlip {n=Z} Refl = Refl
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evenFlip {n=S Z} Refl = Refl
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evenFlip {n=S (S m)} p = evenFlip {n=m} p
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evenFlip' : even n = b -> even (S n) = not b
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evenFlip' {b=True} p = evenSuc p
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evenFlip' {b=False} p = oddSuc p
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evenSucSuc : even n = True -> even (S (S n)) = True
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evenSucSuc p = p
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oddSucSuc : even n = False -> even (S (S n)) = False
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oddSucSuc p = p
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evenStay : even n = b -> even (S (S n)) = b
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evenStay p = p
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evenStayEq : even n = even (S (S n))
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evenStayEq = Refl
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23
HomeworkNine.idr
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23
HomeworkNine.idr
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module HomeworkNine
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import HomeworkEight
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%default total
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remove : Eq a => a -> List a -> List a
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remove x = filter (/=x)
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data FV : List String -> Exp -> Type where
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FVar : FV [s] (Var s)
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FAbs : FV xs e -> FV (remove s xs) (Abs s e)
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FApp : FV xs e1 -> FV ys e2 -> FV (xs ++ ys) (App e1 e2)
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fv1 : FV ["x"] (Var "x")
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fv1 = FVar
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fv2 : FV ["x"] (Abs "y" (Var "x"))
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fv2 = FAbs FVar
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fv3 : FV ["x","x"] (App (Var "x") (Var "x"))
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fv3 = FApp FVar FVar
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fv4 : FV [] (Abs "x" (App (Var "x") (Var "x")))
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fv4 = FAbs fv3
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25
HomeworkSeven.idr
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25
HomeworkSeven.idr
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module HomeworkSeven
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%default total
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data Tree = Node String Tree Tree | Leaf
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data Height : Tree -> Nat -> Type where
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HLeaf : Height Leaf 1
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HNode : Height t1 n1 -> Height t2 n2 -> Height (Node s t1 t2) (S (max n1 n2))
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e1 : Height (Node "a" Leaf Leaf) 2
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e1 = HNode HLeaf HLeaf
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e2 : Height (Node "b" Leaf (Node "a" Leaf Leaf)) 3
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e2 = HNode HLeaf e1
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e3 : Height (Node "c" (Node "b" Leaf (Node "a" Leaf Leaf)) Leaf) 4
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e3 = HNode e2 HLeaf
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--
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-- -------------
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-- Leaf ^ 1
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--
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-- t1 ^ n1 t2 ^ n2 n = 1 + max(n1,n2)
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-- ------------------------------------
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-- Tree s t1 t2 ^ n
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20
HomeworkSix.idr
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20
HomeworkSix.idr
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module HomeworkSix
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%default total
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data Term = Tru | Fls | Not Term | Cond Term Term Term
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data OT : Term -> Type where
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OptNotNot : OT (Not (Not t))
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OptNot : OT t -> OT (Not t)
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OptCond1 : OT t1 -> OT (Cond t1 t2 t3)
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OptCond2 : OT t2 -> OT (Cond t1 t2 t3)
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OptCond3 : OT t3 -> OT (Cond t1 t2 t3)
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p1 : OT (Cond (Not Tru) (Not (Not Tru)) Fls)
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p1 = OptCond2 OptNotNot
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p2 : OT (Not (Not (Not Fls)))
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p2 = OptNotNot
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p3 : OT (Not (Cond (Not Tru) (Not (Not Tru)) Fls))
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p3 = OptNot p1
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