Datasets:

roozbeh-yz
/

IMO-Steps

	import Mathlib

	set_option linter.unusedVariables.analyzeTactics true


	lemma imo_1983_p6_1
	(a b c : ℝ)
	(x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂: c ≤ b ∧ b ≤ a)
	(h₃: z ≤ y ∧ y ≤ x) :
	a * z + c * y + b * x ≤ c * z + b * y + a * x := by
	suffices h₄: c * (y - z) + b * (x - y) ≤ a * (x - z)
	. linarith
	. have h₅: c * (y - z) + b * (x - y) ≤ b * (y - z) + b * (x - y) := by
	simp
	refine mul_le_mul h₂.1 ?_ ?_ ?_
	. exact le_rfl
	. exact sub_nonneg_of_le h₃.1
	. exact le_of_lt h₀.2.1
	refine le_trans h₅ ?_
	rw [mul_sub, mul_sub, add_comm]
	rw [← add_sub_assoc, sub_add_cancel]
	rw [← mul_sub]
	refine mul_le_mul h₂.2 ?_ ?_ ?_
	. exact le_rfl
	. refine sub_nonneg_of_le ?_
	exact le_trans h₃.1 h₃.2
	. exact le_of_lt h₀.1



	lemma imo_1983_p6_1_1
	(a b c x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂ : c ≤ b ∧ b ≤ a)
	(h₃ : z ≤ y ∧ y ≤ x) :
	c * (y - z) + b * (x - y) ≤ a * (x - z) := by
	have h₅: c * (y - z) + b * (x - y) ≤ b * (y - z) + b * (x - y) := by
	simp
	refine mul_le_mul h₂.1 ?_ ?_ ?_
	. exact le_rfl
	. exact sub_nonneg_of_le h₃.1
	. exact le_of_lt h₀.2.1
	refine le_trans h₅ ?_
	rw [mul_sub, mul_sub, add_comm]
	rw [← add_sub_assoc, sub_add_cancel]
	rw [← mul_sub]
	refine mul_le_mul h₂.2 ?_ ?_ ?_
	. exact le_rfl
	. refine sub_nonneg_of_le ?_
	exact le_trans h₃.1 h₃.2
	. exact le_of_lt h₀.1


	lemma imo_1983_p6_1_2
	(a b c x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂ : c ≤ b ∧ b ≤ a)
	(h₃ : z ≤ y ∧ y ≤ x) :
	c * (y - z) + b * (x - y) ≤ b * (y - z) + b * (x - y) := by
	simp
	refine mul_le_mul h₂.1 ?_ ?_ ?_
	. exact le_rfl
	. exact sub_nonneg_of_le h₃.1
	. exact le_of_lt h₀.2.1


	lemma imo_1983_p6_1_3
	(a b c x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂ : c ≤ b ∧ b ≤ a)
	(h₃ : z ≤ y ∧ y ≤ x)
	(h₅ : c * (y - z) + b * (x - y) ≤ b * (y - z) + b * (x - y)) :
	c * (y - z) + b * (x - y) ≤ a * (x - z) := by
	refine le_trans h₅ ?_
	rw [mul_sub, mul_sub, add_comm]
	rw [← add_sub_assoc, sub_add_cancel]
	rw [← mul_sub]
	refine mul_le_mul h₂.2 ?_ ?_ ?_
	. exact le_rfl
	. refine sub_nonneg_of_le ?_
	exact le_trans h₃.1 h₃.2
	. exact le_of_lt h₀.1


	lemma imo_1983_p6_1_4
	(a b c x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂ : c ≤ b ∧ b ≤ a)
	(h₃ : z ≤ y ∧ y ≤ x) :
	-- (h₅ : c * (y - z) + b * (x - y) ≤ b * (y - z) + b * (x - y)) :
	b * (y - z) + b * (x - y) ≤ a * (x - z) := by
	rw [mul_sub, mul_sub, add_comm]
	rw [← add_sub_assoc, sub_add_cancel]
	rw [← mul_sub]
	refine mul_le_mul h₂.2 ?_ ?_ ?_
	. exact le_rfl
	. refine sub_nonneg_of_le ?_
	exact le_trans h₃.1 h₃.2
	. exact le_of_lt h₀.1


	lemma imo_1983_p6_1_5
	(a b c x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂ : c ≤ b ∧ b ≤ a)
	(h₃ : z ≤ y ∧ y ≤ x) :
	-- (h₅ : c * (y - z) + b * (x - y) ≤ b * (y - z) + b * (x - y)) :
	b * (x - z) ≤ a * (x - z) := by
	refine mul_le_mul h₂.2 ?_ ?_ ?_
	. exact le_rfl
	. refine sub_nonneg_of_le ?_
	exact le_trans h₃.1 h₃.2
	. exact le_of_lt h₀.1




	lemma imo_1983_p6_2
	(a b c : ℝ)
	(x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂: c ≤ b ∧ b ≤ a)
	(h₃: z ≤ y ∧ y ≤ x) :
	b * z + a * y + c * x ≤ c * z + b * y + a * x := by
	suffices h₄: c * (x - z) + b * (z - y) ≤ a * (x - y)
	. linarith
	. have h₅: c * (x - z) + b * (z - y) ≤ b * (x - z) + b * (z - y) := by
	simp
	refine mul_le_mul h₂.1 ?_ ?_ ?_
	. exact le_rfl
	. refine sub_nonneg_of_le ?_
	exact le_trans h₃.1 h₃.2
	. exact le_of_lt h₀.2.1
	refine le_trans h₅ ?_
	rw [mul_sub, mul_sub]
	rw [← add_sub_assoc, sub_add_cancel]
	rw [← mul_sub]
	refine mul_le_mul h₂.2 ?_ ?_ ?_
	. exact le_rfl
	. exact sub_nonneg_of_le h₃.2
	. exact le_of_lt h₀.1


	lemma imo_1983_p6_2_1
	(a b c x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂ : c ≤ b ∧ b ≤ a)
	(h₃ : z ≤ y ∧ y ≤ x) :
	c * (x - z) + b * (z - y) ≤ a * (x - y) := by
	have h₅: c * (x - z) + b * (z - y) ≤ b * (x - z) + b * (z - y) := by
	simp
	refine mul_le_mul h₂.1 ?_ ?_ ?_
	. exact le_rfl
	. refine sub_nonneg_of_le ?_
	exact le_trans h₃.1 h₃.2
	. exact le_of_lt h₀.2.1
	refine le_trans h₅ ?_
	rw [mul_sub, mul_sub]
	rw [← add_sub_assoc, sub_add_cancel]
	rw [← mul_sub]
	refine mul_le_mul h₂.2 ?_ ?_ ?_
	. exact le_rfl
	. exact sub_nonneg_of_le h₃.2
	. exact le_of_lt h₀.1


	lemma imo_1983_p6_2_2
	(a b c x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂ : c ≤ b ∧ b ≤ a)
	(h₃ : z ≤ y ∧ y ≤ x) :
	c * (x - z) + b * (z - y) ≤ b * (x - z) + b * (z - y) := by
	simp
	refine mul_le_mul h₂.1 ?_ ?_ ?_
	. exact le_rfl
	. refine sub_nonneg_of_le ?_
	exact le_trans h₃.1 h₃.2
	. exact le_of_lt h₀.2.1


	lemma imo_1983_p6_2_3
	(a b c x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂ : c ≤ b ∧ b ≤ a)
	(h₃ : z ≤ y ∧ y ≤ x) :
	c * (x - z) ≤ b * (x - z) := by
	refine mul_le_mul h₂.1 ?_ ?_ ?_
	. exact le_rfl
	. refine sub_nonneg_of_le ?_
	exact le_trans h₃.1 h₃.2
	. exact le_of_lt h₀.2.1


	lemma imo_1983_p6_2_4
	-- (a b c : ℝ)
	(x y z : ℝ)
	-- (h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	-- (h₂ : c ≤ b ∧ b ≤ a)
	(h₃ : z ≤ y ∧ y ≤ x) :
	0 ≤ x - z := by
	refine sub_nonneg_of_le ?_
	exact le_trans h₃.1 h₃.2


	lemma imo_1983_p6_2_5
	(a b c x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂ : c ≤ b ∧ b ≤ a)
	(h₃ : z ≤ y ∧ y ≤ x) :
	-- (h₅ : c * (x - z) + b * (z - y) ≤ b * (x - z) + b * (z - y)) :
	b * (x - z) + b * (z - y) ≤ a * (x - y) := by
	rw [mul_sub, mul_sub]
	rw [← add_sub_assoc, sub_add_cancel]
	rw [← mul_sub]
	refine mul_le_mul h₂.2 ?_ ?_ ?_
	. exact le_rfl
	. exact sub_nonneg_of_le h₃.2
	. exact le_of_lt h₀.1


	lemma imo_1983_p6_2_6
	(a b c x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂ : c ≤ b ∧ b ≤ a)
	(h₃ : z ≤ y ∧ y ≤ x) :
	-- (h₅ : c * (x - z) + b * (z - y) ≤ b * (x - z) + b * (z - y)) :
	b * (x - y) ≤ a * (x - y) := by
	refine mul_le_mul h₂.2 ?_ ?_ ?_
	. exact le_rfl
	. exact sub_nonneg_of_le h₃.2
	. exact le_of_lt h₀.1



	lemma imo_1983_p6_3
	(a b c : ℝ)
	(hap : 0 < a )
	(hbp : 0 < b )
	(hcp : 0 < c )
	(h₁ : c < a + b)
	-- (h₂ : b < a + c)
	(h₃ : a < b + c)
	(hba: b ≤ a)
	(hcb: c ≤ b) :
	0 ≤ a^2 * b * (a - b) + b^2 * c * (b - c) + c^2 * a * (c - a) := by
	have g₀: b * c ≤ a * c := by exact (mul_le_mul_iff_of_pos_right hcp).mpr hba
	have g₁: a * c ≤ a * b := by exact (mul_le_mul_iff_of_pos_left hap).mpr hcb
	have g₂: a * (b + c - a) ≤ b * (a + c - b) := by
	have g₂₁: 0 ≤ (a-b) * (a+b-c) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hba
	. refine le_of_lt ?_
	exact sub_pos.mpr h₁
	linarith
	have g₃: b * (a + c - b) ≤ c * (a + b - c) := by
	have g₃₁: 0 ≤ (b - c) * (b + c - a) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hcb
	. refine le_of_lt ?_
	exact sub_pos.mpr h₃
	linarith
	have g₄: (a * b) * (a * (b + c - a)) + (b * c) * (b * (a + c - b)) + (a * c) * (c * (a + b - c))
	≤ (b * c) * (a * (b + c - a)) + (a * c) * (b * (a + c - b)) + (a * b) * (c * (a + b - c)) := by
	refine imo_1983_p6_1 (a * b) (a * c) (b * c) (c * (a + b - c)) (b * (a + c - b)) (a * (b + c - a)) ?_ ?_ ?_
	. constructor
	. exact mul_pos hap hbp
	. constructor
	. exact mul_pos hap hcp
	. exact mul_pos hbp hcp
	. exact { left := g₀, right := g₁ }
	. exact { left := g₂, right := g₃ }
	linarith


	lemma imo_1983_p6_3_1
	(a b c : ℝ)
	-- (hap : 0 < a)
	-- (hbp : 0 < b)
	-- (hcp : 0 < c)
	(h₁ : c < a + b)
	-- (h₃ : a < b + c)
	(hba : b ≤ a) :
	-- (hcb : c ≤ b)
	-- (g₀ : b * c ≤ a * c)
	-- (g₁ : a * c ≤ a * b) :
	a * (b + c - a) ≤ b * (a + c - b) := by
	have g₂₁: 0 ≤ (a-b) * (a+b-c) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hba
	. refine le_of_lt ?_
	exact sub_pos.mpr h₁
	linarith


	lemma imo_1983_p6_3_2
	(a b c : ℝ)
	-- (hap : 0 < a)
	-- (hbp : 0 < b)
	-- (hcp : 0 < c)
	-- (h₁ : c < a + b)
	(h₃ : a < b + c)
	-- (hba : b ≤ a)
	(hcb : c ≤ b) :
	-- (g₀ : b * c ≤ a * c)
	-- (g₁ : a * c ≤ a * b)
	-- (g₂ : a * (b + c - a) ≤ b * (a + c - b)) :
	b * (a + c - b) ≤ c * (a + b - c) := by
	have g₃: b * (a + c - b) ≤ c * (a + b - c) := by
	have g₃₁: 0 ≤ (b - c) * (b + c - a) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hcb
	. refine le_of_lt ?_
	exact sub_pos.mpr h₃
	linarith
	linarith


	lemma imo_1983_p6_3_3
	(a b c : ℝ)
	(hap : 0 < a)
	(hbp : 0 < b)
	(hcp : 0 < c)
	-- (h₁ : c < a + b)
	-- (h₃ : a < b + c)
	-- (hba : b ≤ a)
	-- (hcb : c ≤ b)
	(g₀ : b * c ≤ a * c)
	(g₁ : a * c ≤ a * b)
	(g₂ : a * (b + c - a) ≤ b * (a + c - b))
	(g₃ : b * (a + c - b) ≤ c * (a + b - c)) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	have g₄: (a * b) * (a * (b + c - a)) + (b * c) * (b * (a + c - b)) + (a * c) * (c * (a + b - c))
	≤ (b * c) * (a * (b + c - a)) + (a * c) * (b * (a + c - b)) + (a * b) * (c * (a + b - c)) := by
	refine imo_1983_p6_1 (a * b) (a * c) (b * c) (c * (a + b - c)) (b * (a + c - b)) (a * (b + c - a)) ?_ ?_ ?_
	. constructor
	. exact mul_pos hap hbp
	. constructor
	. exact mul_pos hap hcp
	. exact mul_pos hbp hcp
	. exact { left := g₀, right := g₁ }
	. exact { left := g₂, right := g₃ }
	linarith


	lemma imo_1983_p6_3_4
	(a b c : ℝ)
	(hap : 0 < a)
	(hbp : 0 < b)
	(hcp : 0 < c)
	-- (h₁ : c < a + b)
	-- (h₃ : a < b + c)
	-- (hba : b ≤ a)
	-- (hcb : c ≤ b)
	(g₀ : b * c ≤ a * c)
	(g₁ : a * c ≤ a * b)
	(g₂ : a * (b + c - a) ≤ b * (a + c - b))
	(g₃ : b * (a + c - b) ≤ c * (a + b - c)) :
	a * b * (a * (b + c - a)) + b * c * (b * (a + c - b)) + a * c * (c * (a + b - c)) ≤
	b * c * (a * (b + c - a)) + a * c * (b * (a + c - b)) + a * b * (c * (a + b - c)) := by
	refine imo_1983_p6_1 (a * b) (a * c) (b * c) (c * (a + b - c)) (b * (a + c - b)) (a * (b + c - a)) ?_ ?_ ?_
	. constructor
	. exact mul_pos hap hbp
	. constructor
	. exact mul_pos hap hcp
	. exact mul_pos hbp hcp
	. exact { left := g₀, right := g₁ }
	. exact { left := g₂, right := g₃ }



	lemma imo_1983_p6_4
	(a b c : ℝ)
	(hap : 0 < a )
	(hbp : 0 < b )
	(hcp : 0 < c )
	(h₁ : c < a + b)
	-- (h₂ : b < a + c)
	(h₃ : a < b + c)
	(hba: b ≤ a)
	(hcb: c ≤ b) :
	0 ≤ a^2 * c * (a - c) + c^2 * b * (c - b) + b^2 * a * (b - a) := by
	have g₀: b * c ≤ a * c := by exact (mul_le_mul_iff_of_pos_right hcp).mpr hba
	have g₁: a * c ≤ a * b := by exact (mul_le_mul_iff_of_pos_left hap).mpr hcb
	have g₂: a * (b + c - a) ≤ b * (a + c - b) := by
	have g₂₁: 0 ≤ (a-b) * (a+b-c) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hba
	. refine le_of_lt ?_
	exact sub_pos.mpr h₁
	linarith
	have g₃: b * (a + c - b) ≤ c * (a + b - c) := by
	have g₃₁: 0 ≤ (b - c) * (b + c - a) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hcb
	. refine le_of_lt ?_
	exact sub_pos.mpr h₃
	linarith
	have g₄: (a * c) * (a * (b + c - a)) + (a * b) * (b * (a + c - b)) + (b * c) * (c * (a + b - c))
	≤ (b * c) * (a * (b + c - a)) + (a * c) * (b * (a + c - b)) + (a * b) * (c * (a + b - c)) := by
	refine imo_1983_p6_2 (a * b) (a * c) (b * c) (c * (a + b - c)) (b * (a + c - b)) (a * (b + c - a)) ?_ ?_ ?_
	. constructor
	. exact mul_pos hap hbp
	. constructor
	. exact mul_pos hap hcp
	. exact mul_pos hbp hcp
	. exact { left := g₀, right := g₁ }
	. exact { left := g₂, right := g₃ }
	linarith


	lemma imo_1983_p6_4_1
	(a b c : ℝ)
	(hap : 0 < a)
	(hbp : 0 < b)
	(hcp : 0 < c)
	(h₁ : c < a + b)
	(h₃ : a < b + c)
	(hba : b ≤ a)
	(hcb : c ≤ b)
	(g₀ : b * c ≤ a * c)
	(g₁ : a * c ≤ a * b) :
	0 ≤ a ^ 2 * c * (a - c) + c ^ 2 * b * (c - b) + b ^ 2 * a * (b - a) := by
	have g₂: a * (b + c - a) ≤ b * (a + c - b) := by
	have g₂₁: 0 ≤ (a-b) * (a+b-c) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hba
	. refine le_of_lt ?_
	exact sub_pos.mpr h₁
	linarith
	have g₃: b * (a + c - b) ≤ c * (a + b - c) := by
	have g₃₁: 0 ≤ (b - c) * (b + c - a) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hcb
	. refine le_of_lt ?_
	exact sub_pos.mpr h₃
	linarith
	have g₄: (a * c) * (a * (b + c - a)) + (a * b) * (b * (a + c - b)) + (b * c) * (c * (a + b - c))
	≤ (b * c) * (a * (b + c - a)) + (a * c) * (b * (a + c - b)) + (a * b) * (c * (a + b - c)) := by
	refine imo_1983_p6_2 (a * b) (a * c) (b * c) (c * (a + b - c)) (b * (a + c - b)) (a * (b + c - a)) ?_ ?_ ?_
	. constructor
	. exact mul_pos hap hbp
	. constructor
	. exact mul_pos hap hcp
	. exact mul_pos hbp hcp
	. exact { left := g₀, right := g₁ }
	. exact { left := g₂, right := g₃ }
	linarith


	lemma imo_1983_p6_4_2
	(a b c : ℝ)
	(hap : 0 < a)
	(hbp : 0 < b)
	(hcp : 0 < c)
	-- (h₁ : c < a + b)
	(h₃ : a < b + c)
	-- (hba : b ≤ a)
	(hcb : c ≤ b)
	(g₀ : b * c ≤ a * c)
	(g₁ : a * c ≤ a * b)
	(g₂ : a * (b + c - a) ≤ b * (a + c - b)) :
	0 ≤ a ^ 2 * c * (a - c) + c ^ 2 * b * (c - b) + b ^ 2 * a * (b - a) := by
	have g₃: b * (a + c - b) ≤ c * (a + b - c) := by
	have g₃₁: 0 ≤ (b - c) * (b + c - a) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hcb
	. refine le_of_lt ?_
	exact sub_pos.mpr h₃
	linarith
	have g₄: (a * c) * (a * (b + c - a)) + (a * b) * (b * (a + c - b)) + (b * c) * (c * (a + b - c))
	≤ (b * c) * (a * (b + c - a)) + (a * c) * (b * (a + c - b)) + (a * b) * (c * (a + b - c)) := by
	refine imo_1983_p6_2 (a * b) (a * c) (b * c) (c * (a + b - c)) (b * (a + c - b)) (a * (b + c - a)) ?_ ?_ ?_
	. constructor
	. exact mul_pos hap hbp
	. constructor
	. exact mul_pos hap hcp
	. exact mul_pos hbp hcp
	. exact { left := g₀, right := g₁ }
	. exact { left := g₂, right := g₃ }
	linarith


	lemma imo_1983_p6_4_3
	(a b c : ℝ)
	(hap : 0 < a)
	(hbp : 0 < b)
	(hcp : 0 < c)
	-- (h₁ : c < a + b)
	-- (h₃ : a < b + c)
	-- (hba : b ≤ a)
	-- (hcb : c ≤ b)
	(g₀ : b * c ≤ a * c)
	(g₁ : a * c ≤ a * b)
	(g₂ : a * (b + c - a) ≤ b * (a + c - b))
	(g₃ : b * (a + c - b) ≤ c * (a + b - c)) :
	0 ≤ a ^ 2 * c * (a - c) + c ^ 2 * b * (c - b) + b ^ 2 * a * (b - a) := by
	have g₄: (a * c) * (a * (b + c - a)) + (a * b) * (b * (a + c - b)) + (b * c) * (c * (a + b - c))
	≤ (b * c) * (a * (b + c - a)) + (a * c) * (b * (a + c - b)) + (a * b) * (c * (a + b - c)) := by
	refine imo_1983_p6_2 (a * b) (a * c) (b * c) (c * (a + b - c)) (b * (a + c - b)) (a * (b + c - a)) ?_ ?_ ?_
	. constructor
	. exact mul_pos hap hbp
	. constructor
	. exact mul_pos hap hcp
	. exact mul_pos hbp hcp
	. exact { left := g₀, right := g₁ }
	. exact { left := g₂, right := g₃ }
	linarith


	lemma imo_1983_p6_4_4
	(a b c : ℝ)
	-- (hap : 0 < a)
	-- (hbp : 0 < b)
	-- (hcp : 0 < c)
	(h₁ : c < a + b)
	-- (h₃ : a < b + c)
	(hba : b ≤ a) :
	-- (hcb : c ≤ b)
	-- (g₀ : b * c ≤ a * c)
	-- (g₁ : a * c ≤ a * b) :
	a * (b + c - a) ≤ b * (a + c - b) := by
	have g₂₁: 0 ≤ (a-b) * (a+b-c) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hba
	. refine le_of_lt ?_
	exact sub_pos.mpr h₁
	linarith


	lemma imo_1983_p6_4_5
	(a b c : ℝ)
	-- (hap : 0 < a)
	-- (hbp : 0 < b)
	-- (hcp : 0 < c)
	(h₁ : c < a + b)
	-- (h₃ : a < b + c)
	(hba : b ≤ a) :
	-- (hcb : c ≤ b)
	-- (g₀ : b * c ≤ a * c)
	-- (g₁ : a * c ≤ a * b) :
	0 ≤ (a - b) * (a + b - c) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hba
	. refine le_of_lt ?_
	exact sub_pos.mpr h₁


	lemma imo_1983_p6_4_6
	(a b c : ℝ)
	-- (hap : 0 < a)
	-- (hbp : 0 < b)
	-- (hcp : 0 < c)
	-- (h₁ : c < a + b)
	(h₃ : a < b + c)
	-- (hba : b ≤ a)
	(hcb : c ≤ b) :
	-- (g₀ : b * c ≤ a * c)
	-- (g₁ : a * c ≤ a * b)
	-- (g₂ : a * (b + c - a) ≤ b * (a + c - b)) :
	b * (a + c - b) ≤ c * (a + b - c) := by
	have g₃₁: 0 ≤ (b - c) * (b + c - a) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hcb
	. refine le_of_lt ?_
	exact sub_pos.mpr h₃
	linarith


	lemma imo_1983_p6_4_7
	(a b c : ℝ)
	-- (hap : 0 < a)
	-- (hbp : 0 < b)
	-- (hcp : 0 < c)
	-- (h₁ : c < a + b)
	(h₃ : a < b + c)
	-- (hba : b ≤ a)
	(hcb : c ≤ b) :
	-- (g₀ : b * c ≤ a * c)
	-- (g₁ : a * c ≤ a * b)
	-- (g₂ : a * (b + c - a) ≤ b * (a + c - b)) :
	0 ≤ (b - c) * (b + c - a) := by
	refine mul_nonneg ?_ ?_
	. exact sub_nonneg_of_le hcb
	. refine le_of_lt ?_
	exact sub_pos.mpr h₃


	lemma imo_1983_p6_4_8
	(a b c : ℝ)
	(hap : 0 < a)
	(hbp : 0 < b)
	(hcp : 0 < c)
	-- (h₁ : c < a + b)
	-- (h₃ : a < b + c)
	-- (hba : b ≤ a)
	-- (hcb : c ≤ b)
	(g₀ : b * c ≤ a * c)
	(g₁ : a * c ≤ a * b)
	(g₂ : a * (b + c - a) ≤ b * (a + c - b))
	(g₃ : b * (a + c - b) ≤ c * (a + b - c)) :
	a * c * (a * (b + c - a)) + a * b * (b * (a + c - b)) + b * c * (c * (a + b - c)) ≤
	b * c * (a * (b + c - a)) + a * c * (b * (a + c - b)) + a * b * (c * (a + b - c)) := by
	refine imo_1983_p6_2 (a * b) (a * c) (b * c) (c * (a + b - c)) (b * (a + c - b)) (a * (b + c - a)) ?_ ?_ ?_
	. constructor
	. exact mul_pos hap hbp
	. constructor
	. exact mul_pos hap hcp
	. exact mul_pos hbp hcp
	. exact { left := g₀, right := g₁ }
	. exact { left := g₂, right := g₃ }


	lemma imo_1983_p6_5_1
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	(h₂ : b < a + c)
	(h₃ : a < b + c)
	(ho₀ : a < b)
	(ho₁ : b < c) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	rw [add_comm] at h₁ h₂ h₃
	have g₀: 0 ≤ c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) := by
	exact imo_1983_p6_4 c b a h₀.2.2 h₀.2.1 h₀.1 h₃ h₁ (le_of_lt ho₁) (le_of_lt ho₀)
	linarith


	lemma imo_1983_p6_5_2
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	(h₂ : b < a + c)
	(h₃ : a < b + c)
	(ho₀ : a < b)
	(ho₁ : c ≤ b)
	(ho₂ : a < c) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	rw [add_comm] at h₁ h₂
	have g₀: 0 ≤ b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) := by
	exact imo_1983_p6_3 b c a h₀.2.1 h₀.2.2 h₀.1 h₃ h₂ ho₁ (le_of_lt ho₂)
	linarith


	lemma imo_1983_p6_5_3
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	(h₂ : b < a + c)
	(h₃ : a < b + c)
	(ho₀ : a < b)
	(ho₁ : c ≤ b)
	(ho₂ : c ≤ a) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	rw [add_comm] at h₁
	have g₀: 0 ≤ b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) := by
	exact imo_1983_p6_4 b a c h₀.2.1 h₀.1 h₀.2.2 h₁ h₂ (le_of_lt ho₀) ho₂
	linarith


	lemma imo_1983_p6_5_4
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	(h₂ : b < a + c)
	(h₃ : a < b + c)
	(ho₀ : b ≤ a)
	(ho₁ : b < c)
	(ho₂ : a < c) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	rw [add_comm] at h₂ h₃
	have g₀: 0 ≤ c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) := by
	exact imo_1983_p6_3 c a b h₀.2.2 h₀.1 h₀.2.1 h₂ h₁ (le_of_lt ho₂) ho₀
	linarith


	lemma imo_1983_p6_5_5
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	-- (h₁ : c < a + b)
	(h₂ : b < a + c)
	(h₃ : a < b + c)
	(ho₀ : b ≤ a)
	(ho₁ : b < c)
	(ho₂ : c ≤ a) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	rw [add_comm] at h₃
	exact imo_1983_p6_4 a c b h₀.1 h₀.2.2 h₀.2.1 h₂ h₃ ho₂ (le_of_lt ho₁)


	lemma imo_1983_p6_5_6
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	(h₂ : b < a + c)
	(h₃ : a < b + c)
	(ho₀ : a < b) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	wlog ho₁: c ≤ b generalizing a b c
	. clear this
	push_neg at ho₁ -- a < b < c
	rw [add_comm] at h₁ h₂ h₃
	have g₀: 0 ≤ c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) := by
	exact imo_1983_p6_4 c b a h₀.2.2 h₀.2.1 h₀.1 h₃ h₁ (le_of_lt ho₁) (le_of_lt ho₀)
	linarith
	. wlog ho₂: c ≤ a generalizing a b c
	. clear this -- a < c ≤ b
	push_neg at ho₂
	rw [add_comm] at h₁ h₂
	have g₀: 0 ≤ b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) := by
	exact imo_1983_p6_3 b c a h₀.2.1 h₀.2.2 h₀.1 h₃ h₂ ho₁ (le_of_lt ho₂)
	linarith
	. -- c ≤ a < b
	rw [add_comm] at h₁
	have g₀: 0 ≤ b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) := by
	exact imo_1983_p6_4 b a c h₀.2.1 h₀.1 h₀.2.2 h₁ h₂ (le_of_lt ho₀) ho₂
	linarith


	lemma imo_1983_p6_5_7
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	(h₂ : b < a + c)
	(h₃ : a < b + c)
	(ho₀ : a < b)
	(ho₁ : c ≤ b) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	wlog ho₂: c ≤ a generalizing a b c
	. clear this -- a < c ≤ b
	push_neg at ho₂
	rw [add_comm] at h₁ h₂
	have g₀: 0 ≤ b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) := by
	exact imo_1983_p6_3 b c a h₀.2.1 h₀.2.2 h₀.1 h₃ h₂ ho₁ (le_of_lt ho₂)
	linarith
	. -- c ≤ a < b
	rw [add_comm] at h₁
	have g₀: 0 ≤ b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) := by
	exact imo_1983_p6_4 b a c h₀.2.1 h₀.1 h₀.2.2 h₁ h₂ (le_of_lt ho₀) ho₂
	linarith


	lemma imo_1983_p6_5_8
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	(h₂ : b < a + c)
	(h₃ : a < b + c)
	(ho₀ : b ≤ a) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	wlog ho₁: c ≤ b generalizing a b c
	. clear this
	push_neg at ho₁
	wlog ho₂: c ≤ a generalizing a b c
	. clear this
	push_neg at ho₂ -- b < a < c
	rw [add_comm] at h₂ h₃
	have g₀: 0 ≤ c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) := by
	exact imo_1983_p6_3 c a b h₀.2.2 h₀.1 h₀.2.1 h₂ h₁ (le_of_lt ho₂) ho₀
	linarith
	. rw [add_comm] at h₃
	exact imo_1983_p6_4 a c b h₀.1 h₀.2.2 h₀.2.1 h₂ h₃ ho₂ (le_of_lt ho₁)
	. exact imo_1983_p6_3 a b c h₀.1 h₀.2.1 h₀.2.2 h₁ h₃ ho₀ ho₁



	lemma imo_1983_p6_5_9
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	(h₂ : b < a + c)
	(h₃ : a < b + c)
	(ho₀ : b ≤ a)
	(ho₁ : b < c) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	wlog ho₂: c ≤ a generalizing a b c
	. clear this
	push_neg at ho₂ -- b < a < c
	rw [add_comm] at h₂ h₃
	have g₀: 0 ≤ c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) := by
	exact imo_1983_p6_3 c a b h₀.2.2 h₀.1 h₀.2.1 h₂ h₁ (le_of_lt ho₂) ho₀
	linarith
	. rw [add_comm] at h₃
	exact imo_1983_p6_4 a c b h₀.1 h₀.2.2 h₀.2.1 h₂ h₃ ho₂ (le_of_lt ho₁)


	lemma imo_1983_p6_6
	(a b c : ℝ)
	-- (hap : 0 < a )
	-- (hbp : 0 < b )
	(hcp : 0 < c )
	-- (h₁ : c < a + b)
	-- (h₂ : b < a + c)
	-- (h₃ : a < b + c)
	(hba: b ≤ a)
	(hcb: c ≤ b) :
	a^2 * c * (a - c) + c^2 * b * (c - b) + b^2 * a * (b - a) ≤
	a^2 * b * (a - b) + b^2 * c * (b - c) + c^2 * a * (c - a) := by
	have h₄ : 0 ≤ (a + b + c) * (a - b) * (a - c) * (b - c) := by
	refine mul_nonneg ?_ (by linarith)
	refine mul_nonneg ?_ (by linarith)
	refine mul_nonneg ?_ (by linarith)
	linarith
	linarith


	-- give the tight as a hypothesis, use it to prove each of the 6 cases
	lemma imo_1983_p6_7_1
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	-- (h₂ : b < a + c)
	(h₃ : a < b + c)
	(ho₀ : a < b)
	(ho₁ : b < c)
	(ht : ∀ a b c :ℝ, (0 < a ∧ 0 < b ∧ 0 < c) → (c < a + b ∧ a < b + c) → (c ≤ b ∧ b ≤ a)
	→ 0 ≤ a^2 * c * (a - c) + c^2 * b * (c - b) + b^2 * a * (b - a)) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	have h₄: 0 ≤ c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) := by
	refine ht c b a ?_ ?_ ?_
	. simp_all only [and_self]
	. constructor
	. rw [add_comm]
	exact h₃
	. rw [add_comm]
	exact h₁
	. constructor
	. exact le_of_lt ho₀
	. exact le_of_lt ho₁
	linarith


	lemma imo_1983_p6_7_2
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	-- (h₁ : c < a + b)
	(h₂ : b < a + c)
	(h₃ : a < b + c)
	-- (ho₀ : a < b)
	(ho₁ : c ≤ b)
	(ho₂ : a < c)
	(ht : ∀ a b c :ℝ, (0 < a ∧ 0 < b ∧ 0 < c) → (c < a + b ∧ a < b + c) → (c ≤ b ∧ b ≤ a)
	→ 0 ≤ a^2 * c * (a - c) + c^2 * b * (c - b) + b^2 * a * (b - a)) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	have h₄: 0 ≤ b ^ 2 * a * (b - a) + a ^ 2 * c * (a - c) + c ^ 2 * b * (c - b) := by
	refine ht b c a ?_ ?_ ?_
	. simp_all only [and_self]
	. constructor
	. exact h₃
	. rw [add_comm]
	exact h₂
	. constructor
	. exact le_of_lt ho₂
	. exact ho₁
	refine le_trans h₄ ?_
	have h₅: b ^ 2 * a * (b - a) + a ^ 2 * c * (a - c) + c ^ 2 * b * (c - b) ≤
	b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) := by
	rw [add_comm] at h₂
	refine imo_1983_p6_6 b c a h₀.1 ho₁ ?_
	exact le_of_lt ho₂
	linarith


	lemma imo_1983_p6_7_3
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	(h₂ : b < a + c)
	-- (h₃ : a < b + c)
	(ho₀ : a < b)
	-- (ho₁ : c ≤ b)
	(ho₂ : c ≤ a)
	(ht : ∀ a b c :ℝ, (0 < a ∧ 0 < b ∧ 0 < c) → (c < a + b ∧ a < b + c) → (c ≤ b ∧ b ≤ a)
	→ 0 ≤ a^2 * c * (a - c) + c^2 * b * (c - b) + b^2 * a * (b - a)) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	have h₄: 0 ≤ b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) := by
	refine ht b a c ?_ ?_ ?_
	. simp_all only [and_self]
	. constructor
	. rw [add_comm]
	exact h₁
	. exact h₂
	. constructor
	. exact ho₂
	. exact le_of_lt ho₀
	linarith


	lemma imo_1983_p6_7_4
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	(h₂ : b < a + c)
	-- (h₃ : a < b + c)
	(ho₀ : b ≤ a)
	-- (ho₁ : b < c)
	(ho₂ : a < c)
	(ht : ∀ a b c :ℝ, (0 < a ∧ 0 < b ∧ 0 < c) → (c < a + b ∧ a < b + c) → (c ≤ b ∧ b ≤ a)
	→ 0 ≤ a^2 * c * (a - c) + c^2 * b * (c - b) + b^2 * a * (b - a)) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	have h₄: 0 ≤ c ^ 2 * b * (c - b) + b ^ 2 * a * (b - a) + a ^ 2 * c * (a - c) := by
	refine ht c a b ?_ ?_ ?_
	. simp_all only [and_self]
	. constructor
	. rw [add_comm]
	exact h₂
	. exact h₁
	. constructor
	. exact ho₀
	. exact le_of_lt ho₂
	refine le_trans h₄ ?_
	have h₅: c ^ 2 * b * (c - b) + b ^ 2 * a * (b - a) + a ^ 2 * c * (a - c) ≤
	c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) := by
	rw [add_comm] at h₂
	refine imo_1983_p6_6 c a b h₀.2.1 ?_ ho₀
	exact le_of_lt ho₂
	linarith


	lemma imo_1983_p6_7_5
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	-- (h₁ : c < a + b)
	(h₂ : b < a + c)
	(h₃ : a < b + c)
	-- (ho₀ : b ≤ a)
	(ho₁ : b < c)
	(ho₂ : c ≤ a)
	(ht : ∀ a b c :ℝ, (0 < a ∧ 0 < b ∧ 0 < c) → (c < a + b ∧ a < b + c) → (c ≤ b ∧ b ≤ a)
	→ 0 ≤ a^2 * c * (a - c) + c^2 * b * (c - b) + b^2 * a * (b - a)) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	refine ht a c b ?_ ?_ ?_
	. simp_all only [and_self]
	. simp_all only [true_and]
	rw [add_comm]
	exact h₃
	. constructor
	. exact le_of_lt ho₁
	. exact ho₂


	lemma imo_1983_p6_7_6
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	-- (h₂ : b < a + c)
	(h₃ : a < b + c)
	(ho₀ : b ≤ a)
	(ho₁ : c ≤ b)
	(ht : ∀ a b c :ℝ, (0 < a ∧ 0 < b ∧ 0 < c) → (c < a + b ∧ a < b + c) → (c ≤ b ∧ b ≤ a)
	→ 0 ≤ a^2 * c * (a - c) + c^2 * b * (c - b) + b^2 * a * (b - a)) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	have h₄: 0 ≤ a^2 * c * (a - c) + c^2 * b * (c - b) + b^2 * a * (b - a) := by
	refine ht a b c h₀ ?_ ?_
	. simp_all only [true_and]
	. constructor
	. exact ho₁
	. exact ho₀
	refine le_trans h₄ ?_
	refine imo_1983_p6_6 a b c h₀.2.2 ho₀ ho₁


	lemma imo_1983_p6_8_1
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	-- (h₁ : c < a + b)
	(h₂ : b < a + c)
	(h₃ : a < b + c)
	-- (ho₀ : a < b)
	(ho₁ : c ≤ b)
	(ho₂ : a < c)
	(ht : ∀ a b c :ℝ, (0 < a ∧ 0 < b ∧ 0 < c) → (c < a + b ∧ a < b + c) → (c ≤ b ∧ b ≤ a)
	→ 0 ≤ a^2 * b * (a - b) + b^2 * c * (b - c) + c^2 * a * (c - a)) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	have h₄: 0 ≤ b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) := by
	refine ht b c a ?_ ?_ ?_
	. exact and_rotate.mp h₀
	. simp_all only [true_and]
	linarith
	. constructor
	. exact le_of_lt ho₂
	. exact ho₁
	linarith


	lemma imo_1983_p6_8_2
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	(h₂ : b < a + c)
	-- (h₃ : a < b + c)
	(ho₀ : b ≤ a)
	-- (ho₁ : b < c)
	(ho₂ : a < c)
	(ht : ∀ a b c :ℝ, (0 < a ∧ 0 < b ∧ 0 < c) → (c < a + b ∧ a < b + c) → (c ≤ b ∧ b ≤ a)
	→ 0 ≤ a^2 * b * (a - b) + b^2 * c * (b - c) + c^2 * a * (c - a)) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	have h₄: 0 ≤ c ^ 2 * a * (c - a) + a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) := by
	refine ht c a b ?_ ?_ ?_
	. exact and_rotate.mp (and_rotate.mp h₀)
	. constructor
	. rw [add_comm]
	exact h₂
	. exact h₁
	. constructor
	. exact ho₀
	. exact le_of_lt ho₂
	linarith


	lemma imo_1983_p6_8_3
	(a b c : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₁ : c < a + b)
	-- (h₂ : b < a + c)
	(h₃ : a < b + c)
	(ho₀ : b ≤ a)
	(ho₁ : c ≤ b)
	(ht : ∀ a b c :ℝ, (0 < a ∧ 0 < b ∧ 0 < c) → (c < a + b ∧ a < b + c) → (c ≤ b ∧ b ≤ a)
	→ 0 ≤ a^2 * b * (a - b) + b^2 * c * (b - c) + c^2 * a * (c - a)) :
	0 ≤ a ^ 2 * b * (a - b) + b ^ 2 * c * (b - c) + c ^ 2 * a * (c - a) := by
	refine ht a b c h₀ ?_ ?_
	. simp_all only [true_and]
	. constructor
	. exact ho₁
	. exact ho₀


	lemma mylemma_1x
	(a b c : ℝ)
	(x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	-- (h₁ : 0 < x ∧ 0 < y ∧ 0 < z)
	(h₂: c ≤ b ∧ b ≤ a)
	(h₃: x ≤ y ∧ y ≤ z) :
	x / c + y / a + z / b ≤ x / a + y / b + z / c := by
	have g3: (z - x) / b ≤ (z - x) / c := by
	have g31: 0 ≤ (z-x) := by
	refine sub_nonneg_of_le ?_
	exact le_trans h₃.1 h₃.2
	exact div_le_div_of_nonneg_left g31 (by linarith) h₂.1
	have g4: (y-x)/a + (z-y)/b ≤ (z-x)/b := by
	have g41: (y-x)/a + (z-y)/b ≤ (y-x)/b + (z-y)/b := by
	rw [add_le_add_iff_right ((z-y)/b)]
	have g411: 0 ≤ (y-x) := by linarith
	exact div_le_div_of_nonneg_left g411 (by linarith) h₂.2
	have g42: (y-x)/b + (z-y)/b = (z-x)/b := by ring
	linarith
	have g5: (y-x)/a + (z-y)/b ≤ (z-x)/c := by
	exact le_trans g4 g3
	ring_nf at g5
	ring_nf
	linarith


	lemma my_lemma_2x
	(a b c : ℝ)
	(x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	-- (h₁ : 0 < x ∧ 0 < y ∧ 0 < z)
	(h₂: c ≤ b ∧ b ≤ a)
	(h₃: x ≤ y ∧ y ≤ z) :
	x/c + y/a + z/b ≤ x/a + y/b + z/c := by
	have g3: (z-x)/b ≤ (z-x)/c := by
	have g31: 0 ≤ (z-x) := by linarith
	exact div_le_div_of_nonneg_left g31 (by linarith) h₂.1
	have g4: (y-x)/a + (z-y)/b ≤ (z-x)/b := by
	have g41: (y-x)/a + (z-y)/b ≤ (y-x)/b + (z-y)/b := by
	rw [add_le_add_iff_right ((z-y)/b)]
	have g411: 0 ≤ (y-x) := by linarith
	exact div_le_div_of_nonneg_left g411 (by linarith) h₂.2
	have g42: (y-x)/b + (z-y)/b = (z-x)/b := by ring_nf
	linarith
	have g5: (y-x)/a + (z-y)/b ≤ (z-x)/c := by exact le_trans g4 g3
	ring_nf at g5
	ring_nf
	linarith


	lemma my_lemma_3x
	(a b c : ℝ)
	(x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	-- (h₁ : 0 < x ∧ 0 < y ∧ 0 < z)
	(h₂: c ≤ b ∧ b ≤ a)
	(h₃: x ≤ y ∧ y ≤ z) :
	x/b + y/c + z/a ≤ x/a + y/b + z/c := by
	have g3: (z-y)/b ≤ (z-y)/c := by
	have g31: 0 ≤ (z-y) := by linarith
	exact div_le_div_of_nonneg_left g31 (by linarith) h₂.1
	have g4: (x-y)/b + (z-x)/a ≤ (z-y)/b := by
	have g41: (x-y)/b + (z-x)/a ≤ (x-y)/b + (z-x)/b := by
	rw [add_le_add_iff_left ((x-y)/b)]
	have g411: 0 ≤ (z-x) := by linarith
	exact div_le_div_of_nonneg_left g411 (by linarith) h₂.2
	have g42: (x-y)/b + (z-x)/b = (z-y)/b := by ring_nf
	linarith
	have g5: (x-y)/b + (z-x)/a ≤ (z-y)/c := by
	exact le_trans g4 g3
	ring_nf at g5
	ring_nf
	linarith


	lemma my_lemma_4x
	(a b c : ℝ)
	(x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	-- (h₁ : 0 < x ∧ 0 < y ∧ 0 < z)
	(h₂: c ≤ b ∧ b ≤ a)
	(h₃: x ≤ y ∧ y ≤ z) :
	x/b + y/a + z/c ≤ x/a + y/b + z/c := by
	rw [add_le_add_iff_right (z/c)]
	have g2: (y-x)/a ≤ (y-x)/b := by
	exact div_le_div_of_nonneg_left (by linarith) h₀.2.1 h₂.2
	rw [sub_div] at g2
	rw [sub_div] at g2
	linarith


	lemma my_lemma_5x
	(a b c : ℝ)
	(x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	-- (h₁ : 0 < x ∧ 0 < y ∧ 0 < z)
	(h₂: c ≤ b ∧ b ≤ a)
	(h₃: x ≤ y ∧ y ≤ z) :
	x/a + y/c + z/b ≤ x/a + y/b + z/c := by
	rw [add_assoc (x/a)]
	rw [add_assoc (x/a)]
	rw [add_le_add_iff_left (x/a)]
	have g1: (z-y)/b ≤ (z-y)/c := by
	exact div_le_div_of_nonneg_left (by linarith) h₀.2.2 h₂.1
	rw [sub_div] at g1
	rw [sub_div] at g1
	linarith


	lemma my_lemma_6x
	(a b c : ℝ)
	(x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	-- (h₁ : 0 < x ∧ 0 < y ∧ 0 < z)
	(h₂: c ≤ b ∧ b ≤ a)
	(h₃: x ≤ y ∧ y ≤ z) :
	x/c + y/b + z/a ≤ x/a + y/b + z/c := by
	have g1: (z-x)/a ≤ (z-x)/c := by
	exact div_le_div_of_nonneg_left (by linarith) h₀.2.2 (by linarith)
	have g2: x/c + z/a ≤ x/a + z/c := by
	rw [sub_div] at g1
	rw [sub_div] at g1
	linarith
	linarith


	lemma mylemma_7x
	(a b c : ℝ)
	(x y z : ℝ)
	(h₀ : 0 < a ∧ 0 < b ∧ 0 < c)
	(h₂: c ≤ b ∧ b ≤ a)
	(h₃: x ≤ y ∧ y ≤ z) :
	x / c + y / a + z / b ≤ x / a + y / b + z / c := by
	have g3: (z - x) / b ≤ (z - x) / c := by
	have g31: 0 ≤ (z-x) := by
	refine sub_nonneg_of_le ?_
	exact le_trans h₃.1 h₃.2
	exact div_le_div_of_nonneg_left g31 (by linarith) h₂.1
	have g4: (y-x)/a + (z-y)/b ≤ (z-x)/b := by
	have g41: (y-x)/a + (z-y)/b ≤ (y-x)/b + (z-y)/b := by
	rw [add_le_add_iff_right ((z-y)/b)]
	have g411: 0 ≤ (y-x) := by linarith
	exact div_le_div_of_nonneg_left g411 (by linarith) h₂.2
	have g42: (y-x)/b + (z-y)/b = (z-x)/b := by ring
	linarith
	have g5: (y-x)/a + (z-y)/b ≤ (z-x)/c := by
	exact le_trans g4 g3
	ring_nf at g5
	ring_nf
	linarith