w8 · tx · Azk···M1g

tx · AzkepTgdsr4fYGk5ZLwJnFd387drQyDzUAC8hQq6gM1g

3N3n75UqB8G1GKmXFr4zPhKCjGcqJPRSuJY:  -0.01000000 Waves

2024.03.23 17:18 [3030813] smart account 3N3n75UqB8G1GKmXFr4zPhKCjGcqJPRSuJY > SELF 0.00000000 Waves

{
    "type": 13,
    "id": "AzkepTgdsr4fYGk5ZLwJnFd387drQyDzUAC8hQq6gM1g",
    "fee": 1000000,
    "feeAssetId": null,
    "timestamp": 1711203534191,
    "version": 2,
    "chainId": 84,
    "sender": "3N3n75UqB8G1GKmXFr4zPhKCjGcqJPRSuJY",
    "senderPublicKey": "2AWdnJuBMzufXSjTvzVcawBQQhnhF1iXR6QNVgwn33oc",
    "proofs": [
        "TVsaYF9XZs3hLmjrjkHLTu1awArP5WZhJ7vf4c5npvFYegmiFnUxXfCiBNvCQ4GW7eAMTYBC9RerHrpqnCZMX1H"
    ],
    "script": "base64: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    "height": 3030813,
    "applicationStatus": "succeeded",
    "spentComplexity": 0
}

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Diff: 
Old New Differences
13 13  
14 14  let f = [-192349]
15 15  
16 - func g (h) = {
17 -     let i = 2718281
18 -     let j = 1000000
19 -     let k = if ((0 > h))
16 + func g (h,i) = {
17 +     let j = 2718281
18 +     let k = 1000000
19 +     let l = if ((0 > h))
20 20          then -(h)
21 21          else h
22 -     let l = fraction(i, j, k)
23 -     fraction(j, j, (j + l))
22 +     let m = fraction(j, k, l)
23 +     let n = fraction(k, k, (k + m))
24 +     $Tuple2([IntegerEntry((i + "positiveZ"), l), IntegerEntry((i + "expPart"), m), IntegerEntry((i + "sigValue"), n)], n)
24 25      }
25 26  
26 27  
27 - func m (n,o,p) = {
28 -     let q = ((((fraction(n[0], o[0][0], 1000000) + fraction(n[1], o[0][1], 1000000)) + fraction(n[2], o[0][2], 1000000)) + fraction(n[3], o[0][3], 1000000)) + p[0])
29 -     let r = ((((fraction(n[0], o[1][0], 1000000) + fraction(n[1], o[1][1], 1000000)) + fraction(n[2], o[1][2], 1000000)) + fraction(n[3], o[1][3], 1000000)) + p[1])
30 -     let s = ((((fraction(n[0], o[2][0], 1000000) + fraction(n[1], o[2][1], 1000000)) + fraction(n[2], o[2][2], 1000000)) + fraction(n[3], o[2][3], 1000000)) + p[2])
31 -     let t = ((((fraction(n[0], o[3][0], 1000000) + fraction(n[1], o[3][1], 1000000)) + fraction(n[2], o[3][2], 1000000)) + fraction(n[3], o[3][3], 1000000)) + p[3])
32 -     let u = g(q)
33 -     let v = g(r)
34 -     let w = g(s)
35 -     let x = g(t)
36 - [u, v, w, x]
28 + func o (p,q,r,i) = {
29 +     let s = ((((fraction(p[0], q[0][0], 1000000) + fraction(p[1], q[0][1], 1000000)) + fraction(p[2], q[0][2], 1000000)) + fraction(p[3], q[0][3], 1000000)) + r[0])
30 +     let t = ((((fraction(p[0], q[1][0], 1000000) + fraction(p[1], q[1][1], 1000000)) + fraction(p[2], q[1][2], 1000000)) + fraction(p[3], q[1][3], 1000000)) + r[1])
31 +     let u = ((((fraction(p[0], q[2][0], 1000000) + fraction(p[1], q[2][1], 1000000)) + fraction(p[2], q[2][2], 1000000)) + fraction(p[3], q[2][3], 1000000)) + r[2])
32 +     let v = ((((fraction(p[0], q[3][0], 1000000) + fraction(p[1], q[3][1], 1000000)) + fraction(p[2], q[3][2], 1000000)) + fraction(p[3], q[3][3], 1000000)) + r[3])
33 +     let w = g(s, (i + "L0N0"))
34 +     let x = w._1
35 +     let y = w._2
36 +     let z = g(t, (i + "L1N0"))
37 +     let A = z._1
38 +     let B = z._2
39 +     let C = g(u, (i + "L2N0"))
40 +     let D = C._1
41 +     let E = C._2
42 +     let F = g(v, (i + "L3N0"))
43 +     let G = F._1
44 +     let H = F._2
45 +     $Tuple2([y, B, E, H], (((x ++ A) ++ D) ++ G))
37 46      }
38 47  
39 48  
40 - func y (n,o,p) = {
41 -     let q = ((fraction(n[0], o[0][0], 1000000) + fraction(n[1], o[0][1], 1000000)) + p[0])
42 -     let r = ((fraction(n[0], o[1][0], 1000000) + fraction(n[1], o[1][1], 1000000)) + p[1])
43 -     let u = g(q)
44 -     let v = g(r)
45 - [u, v]
49 + func I (p,q,r,i) = {
50 +     let s = ((fraction(p[0], q[0][0], 1000000) + fraction(p[1], q[0][1], 1000000)) + r[0])
51 +     let t = ((fraction(p[0], q[1][0], 1000000) + fraction(p[1], q[1][1], 1000000)) + r[1])
52 +     let J = g(s, (i + "L0N0"))
53 +     let x = J._1
54 +     let y = J._2
55 +     let K = g(t, (i + "L1N0"))
56 +     let A = K._1
57 +     let B = K._2
58 +     $Tuple2([y, B], (x ++ A))
46 59      }
47 60  
48 61  
49 - func z (n,o,A) = {
50 -     let B = (fraction(n[0], o[0], 1000000) + fraction(n[1], o[0], 1000000))
51 -     let C = (B + A)
52 -     g(C)
62 + func L (p,q,M,i) = {
63 +     let N = (fraction(p[0], q[0], 1000000) + fraction(p[1], q[0], 1000000))
64 +     let O = (N + M)
65 +     g(O, i)
53 66      }
54 67  
55 68  
56 - @Callable(D)
57 - func predict_three (E,F) = {
58 -     let G = if ((E == 1))
69 + @Callable(P)
70 + func predict (Q,R) = {
71 +     let S = if ((Q == 1))
59 72          then 1000000
60 73          else 0
61 -     let H = if ((F == 1))
74 +     let T = if ((R == 1))
62 75          then 1000000
63 76          else 0
64 -     let I = [G, H]
65 -     let J = m(I, a, b)
66 -     let K = y(J, c, d)
67 -     let L = z(K, [-8939640, 9517362], -192349)
68 - [IntegerEntry("result", L)]
77 +     let U = [S, T]
78 +     let V = o(U, a, b, "Layer1")
79 +     let W = V._1
80 +     let X = V._2
81 +     let Y = I(W, c, d, "Layer2")
82 +     let Z = Y._1
83 +     let aa = Y._2
84 +     let ab = L(Z, [-8939640, 9517362], -192349, "Layer3")
85 +     let ac = ab._1
86 +     let ad = ab._2
87 + [IntegerEntry("result", ac[0].value)]
69 88      }
70 89  
71 90  
Full: 
Old New Differences
1 1  {-# STDLIB_VERSION 5 #-}
2 2  {-# SCRIPT_TYPE ACCOUNT #-}
3 3  {-# CONTENT_TYPE DAPP #-}
4 4  let a = [[-9275240, 6222139], [-9201827, -6516189], [-1528731, 11450396], [-7524843, -6044814]]
5 5  
6 6  let b = [-2569627, 2312524, -4752973, 1895166]
7 7  
8 8  let c = [[-7575203, 5523326, 6581110, 3773202], [6861028, -5706216, -6035509, -3323542]]
9 9  
10 10  let d = [-3161622, 2945010]
11 11  
12 12  let e = [[-8939640, 9517362]]
13 13  
14 14  let f = [-192349]
15 15  
16 - func g (h) = {
17 -     let i = 2718281
18 -     let j = 1000000
19 -     let k = if ((0 > h))
16 + func g (h,i) = {
17 +     let j = 2718281
18 +     let k = 1000000
19 +     let l = if ((0 > h))
20 20          then -(h)
21 21          else h
22 -     let l = fraction(i, j, k)
23 -     fraction(j, j, (j + l))
22 +     let m = fraction(j, k, l)
23 +     let n = fraction(k, k, (k + m))
24 +     $Tuple2([IntegerEntry((i + "positiveZ"), l), IntegerEntry((i + "expPart"), m), IntegerEntry((i + "sigValue"), n)], n)
24 25      }
25 26  
26 27  
27 - func m (n,o,p) = {
28 -     let q = ((((fraction(n[0], o[0][0], 1000000) + fraction(n[1], o[0][1], 1000000)) + fraction(n[2], o[0][2], 1000000)) + fraction(n[3], o[0][3], 1000000)) + p[0])
29 -     let r = ((((fraction(n[0], o[1][0], 1000000) + fraction(n[1], o[1][1], 1000000)) + fraction(n[2], o[1][2], 1000000)) + fraction(n[3], o[1][3], 1000000)) + p[1])
30 -     let s = ((((fraction(n[0], o[2][0], 1000000) + fraction(n[1], o[2][1], 1000000)) + fraction(n[2], o[2][2], 1000000)) + fraction(n[3], o[2][3], 1000000)) + p[2])
31 -     let t = ((((fraction(n[0], o[3][0], 1000000) + fraction(n[1], o[3][1], 1000000)) + fraction(n[2], o[3][2], 1000000)) + fraction(n[3], o[3][3], 1000000)) + p[3])
32 -     let u = g(q)
33 -     let v = g(r)
34 -     let w = g(s)
35 -     let x = g(t)
36 - [u, v, w, x]
28 + func o (p,q,r,i) = {
29 +     let s = ((((fraction(p[0], q[0][0], 1000000) + fraction(p[1], q[0][1], 1000000)) + fraction(p[2], q[0][2], 1000000)) + fraction(p[3], q[0][3], 1000000)) + r[0])
30 +     let t = ((((fraction(p[0], q[1][0], 1000000) + fraction(p[1], q[1][1], 1000000)) + fraction(p[2], q[1][2], 1000000)) + fraction(p[3], q[1][3], 1000000)) + r[1])
31 +     let u = ((((fraction(p[0], q[2][0], 1000000) + fraction(p[1], q[2][1], 1000000)) + fraction(p[2], q[2][2], 1000000)) + fraction(p[3], q[2][3], 1000000)) + r[2])
32 +     let v = ((((fraction(p[0], q[3][0], 1000000) + fraction(p[1], q[3][1], 1000000)) + fraction(p[2], q[3][2], 1000000)) + fraction(p[3], q[3][3], 1000000)) + r[3])
33 +     let w = g(s, (i + "L0N0"))
34 +     let x = w._1
35 +     let y = w._2
36 +     let z = g(t, (i + "L1N0"))
37 +     let A = z._1
38 +     let B = z._2
39 +     let C = g(u, (i + "L2N0"))
40 +     let D = C._1
41 +     let E = C._2
42 +     let F = g(v, (i + "L3N0"))
43 +     let G = F._1
44 +     let H = F._2
45 +     $Tuple2([y, B, E, H], (((x ++ A) ++ D) ++ G))
37 46      }
38 47  
39 48  
40 - func y (n,o,p) = {
41 -     let q = ((fraction(n[0], o[0][0], 1000000) + fraction(n[1], o[0][1], 1000000)) + p[0])
42 -     let r = ((fraction(n[0], o[1][0], 1000000) + fraction(n[1], o[1][1], 1000000)) + p[1])
43 -     let u = g(q)
44 -     let v = g(r)
45 - [u, v]
49 + func I (p,q,r,i) = {
50 +     let s = ((fraction(p[0], q[0][0], 1000000) + fraction(p[1], q[0][1], 1000000)) + r[0])
51 +     let t = ((fraction(p[0], q[1][0], 1000000) + fraction(p[1], q[1][1], 1000000)) + r[1])
52 +     let J = g(s, (i + "L0N0"))
53 +     let x = J._1
54 +     let y = J._2
55 +     let K = g(t, (i + "L1N0"))
56 +     let A = K._1
57 +     let B = K._2
58 +     $Tuple2([y, B], (x ++ A))
46 59      }
47 60  
48 61  
49 - func z (n,o,A) = {
50 -     let B = (fraction(n[0], o[0], 1000000) + fraction(n[1], o[0], 1000000))
51 -     let C = (B + A)
52 -     g(C)
62 + func L (p,q,M,i) = {
63 +     let N = (fraction(p[0], q[0], 1000000) + fraction(p[1], q[0], 1000000))
64 +     let O = (N + M)
65 +     g(O, i)
53 66      }
54 67  
55 68  
56 - @Callable(D)
57 - func predict_three (E,F) = {
58 -     let G = if ((E == 1))
69 + @Callable(P)
70 + func predict (Q,R) = {
71 +     let S = if ((Q == 1))
59 72          then 1000000
60 73          else 0
61 -     let H = if ((F == 1))
74 +     let T = if ((R == 1))
62 75          then 1000000
63 76          else 0
64 -     let I = [G, H]
65 -     let J = m(I, a, b)
66 -     let K = y(J, c, d)
67 -     let L = z(K, [-8939640, 9517362], -192349)
68 - [IntegerEntry("result", L)]
77 +     let U = [S, T]
78 +     let V = o(U, a, b, "Layer1")
79 +     let W = V._1
80 +     let X = V._2
81 +     let Y = I(W, c, d, "Layer2")
82 +     let Z = Y._1
83 +     let aa = Y._2
84 +     let ab = L(Z, [-8939640, 9517362], -192349, "Layer3")
85 +     let ac = ab._1
86 +     let ad = ab._2
87 + [IntegerEntry("result", ac[0].value)]
69 88      }
70 89  
71 90

Old	New		Differences
13	13
14	14		let f = [-192349]
15	15
16		-	func g (h) = {
17		-	let i = 2718281
18		-	let j = 1000000
19		-	let k = if ((0 > h))
	16	+	func g (h,i) = {
	17	+	let j = 2718281
	18	+	let k = 1000000
	19	+	let l = if ((0 > h))
20	20		then -(h)
21	21		else h
22		-	let l = fraction(i, j, k)
23		-	fraction(j, j, (j + l))
	22	+	let m = fraction(j, k, l)
	23	+	let n = fraction(k, k, (k + m))
	24	+	$Tuple2([IntegerEntry((i + "positiveZ"), l), IntegerEntry((i + "expPart"), m), IntegerEntry((i + "sigValue"), n)], n)
24	25		}
25	26
26	27
27		-	func m (n,o,p) = {
28		-	let q = ((((fraction(n[0], o[0][0], 1000000) + fraction(n[1], o[0][1], 1000000)) + fraction(n[2], o[0][2], 1000000)) + fraction(n[3], o[0][3], 1000000)) + p[0])
29		-	let r = ((((fraction(n[0], o[1][0], 1000000) + fraction(n[1], o[1][1], 1000000)) + fraction(n[2], o[1][2], 1000000)) + fraction(n[3], o[1][3], 1000000)) + p[1])
30		-	let s = ((((fraction(n[0], o[2][0], 1000000) + fraction(n[1], o[2][1], 1000000)) + fraction(n[2], o[2][2], 1000000)) + fraction(n[3], o[2][3], 1000000)) + p[2])
31		-	let t = ((((fraction(n[0], o[3][0], 1000000) + fraction(n[1], o[3][1], 1000000)) + fraction(n[2], o[3][2], 1000000)) + fraction(n[3], o[3][3], 1000000)) + p[3])
32		-	let u = g(q)
33		-	let v = g(r)
34		-	let w = g(s)
35		-	let x = g(t)
36		-	[u, v, w, x]
	28	+	func o (p,q,r,i) = {
	29	+	let s = ((((fraction(p[0], q[0][0], 1000000) + fraction(p[1], q[0][1], 1000000)) + fraction(p[2], q[0][2], 1000000)) + fraction(p[3], q[0][3], 1000000)) + r[0])
	30	+	let t = ((((fraction(p[0], q[1][0], 1000000) + fraction(p[1], q[1][1], 1000000)) + fraction(p[2], q[1][2], 1000000)) + fraction(p[3], q[1][3], 1000000)) + r[1])
	31	+	let u = ((((fraction(p[0], q[2][0], 1000000) + fraction(p[1], q[2][1], 1000000)) + fraction(p[2], q[2][2], 1000000)) + fraction(p[3], q[2][3], 1000000)) + r[2])
	32	+	let v = ((((fraction(p[0], q[3][0], 1000000) + fraction(p[1], q[3][1], 1000000)) + fraction(p[2], q[3][2], 1000000)) + fraction(p[3], q[3][3], 1000000)) + r[3])
	33	+	let w = g(s, (i + "L0N0"))
	34	+	let x = w._1
	35	+	let y = w._2
	36	+	let z = g(t, (i + "L1N0"))
	37	+	let A = z._1
	38	+	let B = z._2
	39	+	let C = g(u, (i + "L2N0"))
	40	+	let D = C._1
	41	+	let E = C._2
	42	+	let F = g(v, (i + "L3N0"))
	43	+	let G = F._1
	44	+	let H = F._2
	45	+	$Tuple2([y, B, E, H], (((x ++ A) ++ D) ++ G))
37	46		}
38	47
39	48
40		-	func y (n,o,p) = {
41		-	let q = ((fraction(n[0], o[0][0], 1000000) + fraction(n[1], o[0][1], 1000000)) + p[0])
42		-	let r = ((fraction(n[0], o[1][0], 1000000) + fraction(n[1], o[1][1], 1000000)) + p[1])
43		-	let u = g(q)
44		-	let v = g(r)
45		-	[u, v]
	49	+	func I (p,q,r,i) = {
	50	+	let s = ((fraction(p[0], q[0][0], 1000000) + fraction(p[1], q[0][1], 1000000)) + r[0])
	51	+	let t = ((fraction(p[0], q[1][0], 1000000) + fraction(p[1], q[1][1], 1000000)) + r[1])
	52	+	let J = g(s, (i + "L0N0"))
	53	+	let x = J._1
	54	+	let y = J._2
	55	+	let K = g(t, (i + "L1N0"))
	56	+	let A = K._1
	57	+	let B = K._2
	58	+	$Tuple2([y, B], (x ++ A))
46	59		}
47	60
48	61
49		-	func z (n,o,A) = {
50		-	let B = (fraction(n[0], o[0], 1000000) + fraction(n[1], o[0], 1000000))
51		-	let C = (B + A)
52		-	g(C)
	62	+	func L (p,q,M,i) = {
	63	+	let N = (fraction(p[0], q[0], 1000000) + fraction(p[1], q[0], 1000000))
	64	+	let O = (N + M)
	65	+	g(O, i)
53	66		}
54	67
55	68
56		-	@Callable(D)
57		-	func predict~~_three~~ (E,F) = {
58		-	let G = if ((E == 1))
	69	+	@Callable(P)
	70	+	func predict (Q,R) = {
	71	+	let S = if ((Q == 1))
59	72		then 1000000
60	73		else 0
61		-	let H = if ((F == 1))
	74	+	let T = if ((R == 1))
62	75		then 1000000
63	76		else 0
64		-	let I = [G, H]
65		-	let J = m(I, a, b)
66		-	let K = y(J, c, d)
67		-	let L = z(K, [-8939640, 9517362], -192349)
68		-	[IntegerEntry("result", L)]
	77	+	let U = [S, T]
	78	+	let V = o(U, a, b, "Layer1")
	79	+	let W = V._1
	80	+	let X = V._2
	81	+	let Y = I(W, c, d, "Layer2")
	82	+	let Z = Y._1
	83	+	let aa = Y._2
	84	+	let ab = L(Z, [-8939640, 9517362], -192349, "Layer3")
	85	+	let ac = ab._1
	86	+	let ad = ab._2
	87	+	[IntegerEntry("result", ac[0].value)]
69	88		}
70	89
71	90

Old	New		Differences
1	1		{-# STDLIB_VERSION 5 #-}
2	2		{-# SCRIPT_TYPE ACCOUNT #-}
3	3		{-# CONTENT_TYPE DAPP #-}
4	4		let a = [[-9275240, 6222139], [-9201827, -6516189], [-1528731, 11450396], [-7524843, -6044814]]
5	5
6	6		let b = [-2569627, 2312524, -4752973, 1895166]
7	7
8	8		let c = [[-7575203, 5523326, 6581110, 3773202], [6861028, -5706216, -6035509, -3323542]]
9	9
10	10		let d = [-3161622, 2945010]
11	11
12	12		let e = [[-8939640, 9517362]]
13	13
14	14		let f = [-192349]
15	15
16		-	func g (h) = {
17		-	let i = 2718281
18		-	let j = 1000000
19		-	let k = if ((0 > h))
	16	+	func g (h,i) = {
	17	+	let j = 2718281
	18	+	let k = 1000000
	19	+	let l = if ((0 > h))
20	20		then -(h)
21	21		else h
22		-	let l = fraction(i, j, k)
23		-	fraction(j, j, (j + l))
	22	+	let m = fraction(j, k, l)
	23	+	let n = fraction(k, k, (k + m))
	24	+	$Tuple2([IntegerEntry((i + "positiveZ"), l), IntegerEntry((i + "expPart"), m), IntegerEntry((i + "sigValue"), n)], n)
24	25		}
25	26
26	27
27		-	func m (n,o,p) = {
28		-	let q = ((((fraction(n[0], o[0][0], 1000000) + fraction(n[1], o[0][1], 1000000)) + fraction(n[2], o[0][2], 1000000)) + fraction(n[3], o[0][3], 1000000)) + p[0])
29		-	let r = ((((fraction(n[0], o[1][0], 1000000) + fraction(n[1], o[1][1], 1000000)) + fraction(n[2], o[1][2], 1000000)) + fraction(n[3], o[1][3], 1000000)) + p[1])
30		-	let s = ((((fraction(n[0], o[2][0], 1000000) + fraction(n[1], o[2][1], 1000000)) + fraction(n[2], o[2][2], 1000000)) + fraction(n[3], o[2][3], 1000000)) + p[2])
31		-	let t = ((((fraction(n[0], o[3][0], 1000000) + fraction(n[1], o[3][1], 1000000)) + fraction(n[2], o[3][2], 1000000)) + fraction(n[3], o[3][3], 1000000)) + p[3])
32		-	let u = g(q)
33		-	let v = g(r)
34		-	let w = g(s)
35		-	let x = g(t)
36		-	[u, v, w, x]
	28	+	func o (p,q,r,i) = {
	29	+	let s = ((((fraction(p[0], q[0][0], 1000000) + fraction(p[1], q[0][1], 1000000)) + fraction(p[2], q[0][2], 1000000)) + fraction(p[3], q[0][3], 1000000)) + r[0])
	30	+	let t = ((((fraction(p[0], q[1][0], 1000000) + fraction(p[1], q[1][1], 1000000)) + fraction(p[2], q[1][2], 1000000)) + fraction(p[3], q[1][3], 1000000)) + r[1])
	31	+	let u = ((((fraction(p[0], q[2][0], 1000000) + fraction(p[1], q[2][1], 1000000)) + fraction(p[2], q[2][2], 1000000)) + fraction(p[3], q[2][3], 1000000)) + r[2])
	32	+	let v = ((((fraction(p[0], q[3][0], 1000000) + fraction(p[1], q[3][1], 1000000)) + fraction(p[2], q[3][2], 1000000)) + fraction(p[3], q[3][3], 1000000)) + r[3])
	33	+	let w = g(s, (i + "L0N0"))
	34	+	let x = w._1
	35	+	let y = w._2
	36	+	let z = g(t, (i + "L1N0"))
	37	+	let A = z._1
	38	+	let B = z._2
	39	+	let C = g(u, (i + "L2N0"))
	40	+	let D = C._1
	41	+	let E = C._2
	42	+	let F = g(v, (i + "L3N0"))
	43	+	let G = F._1
	44	+	let H = F._2
	45	+	$Tuple2([y, B, E, H], (((x ++ A) ++ D) ++ G))
37	46		}
38	47
39	48
40		-	func y (n,o,p) = {
41		-	let q = ((fraction(n[0], o[0][0], 1000000) + fraction(n[1], o[0][1], 1000000)) + p[0])
42		-	let r = ((fraction(n[0], o[1][0], 1000000) + fraction(n[1], o[1][1], 1000000)) + p[1])
43		-	let u = g(q)
44		-	let v = g(r)
45		-	[u, v]
	49	+	func I (p,q,r,i) = {
	50	+	let s = ((fraction(p[0], q[0][0], 1000000) + fraction(p[1], q[0][1], 1000000)) + r[0])
	51	+	let t = ((fraction(p[0], q[1][0], 1000000) + fraction(p[1], q[1][1], 1000000)) + r[1])
	52	+	let J = g(s, (i + "L0N0"))
	53	+	let x = J._1
	54	+	let y = J._2
	55	+	let K = g(t, (i + "L1N0"))
	56	+	let A = K._1
	57	+	let B = K._2
	58	+	$Tuple2([y, B], (x ++ A))
46	59		}
47	60
48	61
49		-	func z (n,o,A) = {
50		-	let B = (fraction(n[0], o[0], 1000000) + fraction(n[1], o[0], 1000000))
51		-	let C = (B + A)
52		-	g(C)
	62	+	func L (p,q,M,i) = {
	63	+	let N = (fraction(p[0], q[0], 1000000) + fraction(p[1], q[0], 1000000))
	64	+	let O = (N + M)
	65	+	g(O, i)
53	66		}
54	67
55	68
56		-	@Callable(D)
57		-	func predict~~_three~~ (E,F) = {
58		-	let G = if ((E == 1))
	69	+	@Callable(P)
	70	+	func predict (Q,R) = {
	71	+	let S = if ((Q == 1))
59	72		then 1000000
60	73		else 0
61		-	let H = if ((F == 1))
	74	+	let T = if ((R == 1))
62	75		then 1000000
63	76		else 0
64		-	let I = [G, H]
65		-	let J = m(I, a, b)
66		-	let K = y(J, c, d)
67		-	let L = z(K, [-8939640, 9517362], -192349)
68		-	[IntegerEntry("result", L)]
	77	+	let U = [S, T]
	78	+	let V = o(U, a, b, "Layer1")
	79	+	let W = V._1
	80	+	let X = V._2
	81	+	let Y = I(W, c, d, "Layer2")
	82	+	let Z = Y._1
	83	+	let aa = Y._2
	84	+	let ab = L(Z, [-8939640, 9517362], -192349, "Layer3")
	85	+	let ac = ab._1
	86	+	let ad = ab._2
	87	+	[IntegerEntry("result", ac[0].value)]
69	88		}
70	89
71	90

github/deemru/w8io/6500d08 
37.90 ms ◑