aphex twin : Windowlicker

Windowlicker

Tracks

		!"£$%^&*(())
		02 ”Mi€± = €ЋNо=1NDi[n][Јj€{i}Fji[n - 1] + Fexti[[n-1]]
		02 ΔMi−1 = −αΣn=1NDi[n][Σj∈C{i}Fji[n - 1] + Fexti[[n-1]]
		#1
		1..NDi[Eta][(SigmajEC{i}Fji[Eta-1]+Fexti[Eta^-1]]
		#3
		!"A?$% &*(())
		A Complex Mathematical Equation
		-a ### Di[n][ ###F ij[n-1]+Fexti[n-1]]
		Ageispolis
		Alberto Balsalm
		A Mathematical Equation
		Aphex Twin - Nannou
		Blackbox Life Recorder 21f
		Come To Daddy (Pappy Mix)
		Complex Mathematical Equation
		DeltaMi-1=aSigman=1Di(n)(SigmajEC(i)Fij(n-1)+Fexti(n-1))
		DeltaMi-1=aSigman=1Di(n)[SigmajEC(i)Fij(n-1)+Fexti(n-1)]
		dMi-1=-aSigmaEta=1..NDi[Eta][(SigmajEC{i}Fji[Eta-1]+Fexti[Eta^-1]]
		dMi-1=-aSigman=1..NDi(n)(SigmajEC(i)Fji(n-1)+Fexti(n-1))
		(Equation)
		[Equation]
		Equation
		Equation [Early Version, Edit]
		[Formula]
		Formula
		Intro
		M1^-1=-a…Di[n][…Fij[n-1]+Fexti[n^-1]]
		^M1-1=-aED1[O][EF1[n-1]+Fext1[n-1]]
		M¹ = D[n] [ F[n1] + F ext[n¹]]
		? Mi-1=-a? Di(n)(? Fij(n-1)+Fexti(n-1))
		?Mi-1=-a?Di(n)(?Fij(n-1)+Fexti(n-1))
		∆Mi-1=-a ∑ Di[n][ ∑F ij[n-1]+Fexti[n-1]]
		∆Mi-1=-a∑Di(n)(∑Fij(n-1 )+Fexti(n-1))
		∆Mi-1=-a∑Di(n)(∑Fij(n-1)+Fexti(n-1))
		∆Mi-1=-a∑Di(n)[∑Fij[n-1]+Fexti[n-1]]
		∆Mi-1=-a∑Di[n][∑Fij[n-1]+Fexti[n-1]]
		∆Mi-1=-a∑Di[n][∑Fji[n-1]+Fexti[n-1]]
		?Mi-1 = -aSn=1NDi[n] [Sj?C{i}Fij[n - 1] + [Fexti[[n-1]]
		∆Mi-1 = -∂ ∑ Di[n] [∑ Fji[n-1] + F exti[n-1]]
		Mi1 = Di[n] [ Fji[n1] + F exti[n1]]
		∆Mᵢ⁻¹ = -∂ ∑ Dᵢ[n] [∑ Fⱼᵢ[n-1] + F extᵢ[n⁻¹]]
		∆Mᵢ⁻¹ = −∂ ∑ Dᵢ[n] [∑ Fⱼᵢ[n−1] + F extᵢ[n⁻¹]]
		∆Mi-1 = -∂ E Di[n] [E Fji[n-1] + F exti[n-1]]
		∆Mᵢ⁻¹=−α ∑ Dᵢ[η][ ∑ Fjᵢ[η−1]+Fextᵢ [η⁻¹]]
		Nannou
		Nannou - Aphex Twin - Windowlicker
		Nannou (EP Version)
		Nannou - EP Version
		N ∆Mᵢ⁻¹=−α ∑ Dᵢ[η][ ∑ Fjᵢ[η−1]+Fextᵢ [η⁻¹]] η=1 j∈C{ᵢ}
		Pikachu Mutha Fucka
		Polynomial-C
		(Strange Formula)
		[Symbol]
		(symbols)
		Tamphex (headphug Mix)
		Track 1
		Track 2 (EP Version)
		Track 2 - EP Version
		Window Licker
		Windowlicker
		Windowlicker - Aphex Twin
		Windowlicker - Aphex Twin - Windowlicker
		Windowlicker (demo)
		Windowlicker (Demo Version)
		Windowlicker [Demo Version] [Antibiotics]
		Windowlicker (End-Roll Version)
		Windowlicker [End-roll Version
		Windowlicker [End-Roll Version]
		Windowlicker (EP Version)
		Windowlicker - EP Version
		Windowlicker (Internet Demo Version)
		Windowlicker (Original Demo)
		Windowlicker [Original Demo]
		Windowlicker(Originaldemo)
		Windowlicker (Radio Edit)
		Windowlicker (Scratch Intro)
		Windowlicker Scratch Intro (cos-mix)
		Xtal
		Δ𝑀𝑖⁻¹ = −𝑎∑𝑛=1𝑁 𝐷𝑖[𝑛] [∑𝑗∈ℂ{𝑖} 𝐹𝑖𝑗[𝑛 − 1] + 𝐹ext𝑖[𝑛⁻¹] ]
		ΔMi-1=-a ΣDi[n][ΣF ij[n-1]+Fexti[n-1]]
		Δmi−1 = −aσn=1ndi[n] [σj∈ℂ{i}fij[n − 1] + [fexti[[n−1]]
		ΔMi−1=-aΣn=1NDi[n][Σj∈ℂ{i}Fij[n-1]+[Fexti[n-1]\;]
		ΔM i −1=−α∑ η=1 N D i [η][∑ j∈C{i} F ji [η−1]+Fext i [η −1]]
		ΔMi-1=-αΣDi[n][ΣFji[n-1]+Fexti[n-1]]
		ΔMi-1 = -αΣn=1NDi[n][Σj∈C{i}Fji[n - 1] + Fexti[[n-1]]
		ΔMi^−1=−αΣn=1NDi[n][Σj∈C{i}Fji[n − 1]+Fexti[(n^−1)]
		ΔMi−1 = −αΣn=1NDi[n][Σj∈C[i]Fji[n − 1] + Fexti[[n−1]]
		ΔMi−1 = −αΣn=1NDi[n][Σj∈C[i]Fji[n − 1] + Fexti[n−1]]
		ΔMi−1 = −αΣn=1NDi[n][Σj∈C{i}Fji[n − 1] + Fexti[[n−1]]
		ΔMi−1 = −αΣn=1NDi[n][Σj∈C{i}Fji[n − 1] + Fexti[n−1]]
		ΔMᵢ⁻¹=−αΣn=1NDᵢ[n][Σj∈C{i}Fⱼᵢ[n-1]+Fextᵢ[n⁻¹]]