ΔEΔt=ΔpΔx=h/4π
ΔEΔt=h/4π
ΔE=√h/4π
ΔE=-√h/4π
Δt=√h/4π
Δt=-√h/4π
ΔpΔx=h/4π
Δp=√h/4π
Δp=-√h/4π
Δx=√h/4π
Δx=-√h/4π
ΔE=√h/4π
ΔE=√h/√4π
1/ΔE=√4π/√h
1/ΔE=√4π/h
ΔE=-√h/4π
ΔE=-√h/√4π
1/ΔE=-√4π/√h
1/ΔE=-√4π/h
Δt=√h/4π
Δt=√h/√4π
1/Δt=√4π/√h
1/Δt=√4π/h
Δt=-√h/4π
Δt=-√h/√4π
1/Δt=-√4π/√h
1/Δt=-√4π/h
Δp=√h/4π
Δp=√h/√4π
1/Δp=√4π/√h
1/Δp=√4π/h
Δp=-√h/4π
Δp=-√h/√4π
1/Δp=-√4π/√h
1/Δp=-√4π/h
Δx=√h/4π
Δx=√h/√4π
1/Δx=√4π/√h
1/Δx=√4π/h
Δx=-√h/4π
Δx=-√h/√4π
1/Δx=-√4π/√h
1/Δx=-√4π/h
ΔE=√h/4π
Δx=xn-xn-1
xΔx=(xn-xn-1)+(xn-1-)+()+()+
()+()+()+(x3-x2)+(x2-x1)+(x1-x0)
xΔx=xn-x0
x0=0
xn=1
xΔx=1
x=E
EΔE=1
ΔE=1/E
ΔE=√h/4π
1/E=√h/4π
1/E=√h/√4π
E=√4π/√h
E=√4π/h
Δt=√h/4π
xΔx=1
x=t
tΔt=1
Δt=1/t
Δt=√h/4π
1/t=√h/4π
1/t=√h/√4π
t=√4π/√h
t=√4π/h
Δp=√h/4π
xΔx=1
x=p
pΔp=1
Δp=1/p
Δp=√h/4π
1/p=√h/4π
1/p=√h/√4π
p=√4π/√h
p=√4π/h
Δx=√h/4π
xΔx=1
Δx=1/x
Δx=√h/4π
1/x=√h/4π
1/x=√h/√4π
x=√4π/√h
x=√4π/h
x=√4π/h
Δx=√h/4π
1/x=√h/4π
Δx=1/x=√h/4π
Δx=1/x
ΔΔx=Δ(1/x)
Δ(1/x)=[1/(x+Δx)]-[1/x]
Δ(1/x)=[x/(x+Δx)x]-[(x+Δx)/x(x+Δx)]
Δ(1/x)=[x-(x+Δx)/x(x+Δx)]
Δ(1/x)=[x-x-Δx/x(x+Δx)]
Δ(1/x)=[-Δx/x(x+Δx)]
Δx=1/x
Δ(1/x)=[-(1/x)/x{x+(1/x)}]
Δ(1/x)=[-(1/x)/x^2+1]
Δ(1/x)=[-(1/x)*x/(x^2+1)*x]
Δ(1/x)=[-1/(x^3+x)]
Δ(1/x)=-1/x
ΔΔx=Δ(1/x)
ΔΔx=Δ(1/x)=-1/x
t=√4π/h
x=√4π/h
tx=4π/h
tx=4π/h=C=1
tx=1
tx=1
t=1/x
xΔx=1
Δx=1/x
t=1/x
t=Δx
Δt=ΔΔx
xΔx=1
Δx=1/x
ΔΔx=Δ(1/x)
Δ(1/x)=-1/x
ΔΔx=Δ(1/x)=-1/x
Δt=ΔΔx
Δt=ΔΔx=Δ(1/x)=-1/x
Δt=-1/x
tΔt=1
Δt=1/t
Δt=-1/x
1/t=-1/x
t=-x
t=-x
(-x)=t
x=-t
t=-x
t=√4π/h
(-x)=√4π/h
(-x)=√4π/√h
(-1/x)=√h/√4π
(-1/x)=√h/4π
x=-t
x=√4π/h
(-t)=√4π/h
(-t)=√4π/√h
(-1/t)=√h/√4π
(-1/t)=√h/4π
E=√4π/h
1/E=√h/4π
E=-√4π/h
1/E=-√h/4π
t=√4π/h
1/t=√h/4π
t=-√4π/h
1/t=-√h/4π
(-t)=√4π/h
(-1/t)=√h/4π
p=√4π/h
1/p=√h/4π
p=-√4π/h
1/p=-√h/4π
x=√4π/h
1/x=√h/4π
x=-√4π/h
1/x=-√h/4π
(-x)=√4π/h
(-1/x)=√h/4π
ΔEΔt=h/4π
ΔE=√h/4π
ΔE=-√h/4π
Δt=√h/4π
Δt=-√h/4π
ΔpΔx=h/4π
Δp=√h/4π
Δp=-√h/4π
Δx=√h/4π
Δx=-√h/4π
ΔE=√h/4π
ΔE=√h/√4π
1/ΔE=√4π/√h
1/ΔE=√4π/h
ΔE=-√h/4π
ΔE=-√h/√4π
1/ΔE=-√4π/√h
1/ΔE=-√4π/h
Δt=√h/4π
Δt=√h/√4π
1/Δt=√4π/√h
1/Δt=√4π/h
Δt=-√h/4π
Δt=-√h/√4π
1/Δt=-√4π/√h
1/Δt=-√4π/h
Δp=√h/4π
Δp=√h/√4π
1/Δp=√4π/√h
1/Δp=√4π/h
Δp=-√h/4π
Δp=-√h/√4π
1/Δp=-√4π/√h
1/Δp=-√4π/h
Δx=√h/4π
Δx=√h/√4π
1/Δx=√4π/√h
1/Δx=√4π/h
Δx=-√h/4π
Δx=-√h/√4π
1/Δx=-√4π/√h
1/Δx=-√4π/h
ΔE=√h/4π
Δx=xn-xn-1
xΔx=(xn-xn-1)+(xn-1-)+()+()+
()+()+()+(x3-x2)+(x2-x1)+(x1-x0)
xΔx=xn-x0
x0=0
xn=1
xΔx=1
x=E
EΔE=1
ΔE=1/E
ΔE=√h/4π
1/E=√h/4π
1/E=√h/√4π
E=√4π/√h
E=√4π/h
Δt=√h/4π
xΔx=1
x=t
tΔt=1
Δt=1/t
Δt=√h/4π
1/t=√h/4π
1/t=√h/√4π
t=√4π/√h
t=√4π/h
Δp=√h/4π
xΔx=1
x=p
pΔp=1
Δp=1/p
Δp=√h/4π
1/p=√h/4π
1/p=√h/√4π
p=√4π/√h
p=√4π/h
Δx=√h/4π
xΔx=1
Δx=1/x
Δx=√h/4π
1/x=√h/4π
1/x=√h/√4π
x=√4π/√h
x=√4π/h
x=√4π/h
Δx=√h/4π
1/x=√h/4π
Δx=1/x=√h/4π
Δx=1/x
ΔΔx=Δ(1/x)
Δ(1/x)=[1/(x+Δx)]-[1/x]
Δ(1/x)=[x/(x+Δx)x]-[(x+Δx)/x(x+Δx)]
Δ(1/x)=[x-(x+Δx)/x(x+Δx)]
Δ(1/x)=[x-x-Δx/x(x+Δx)]
Δ(1/x)=[-Δx/x(x+Δx)]
Δx=1/x
Δ(1/x)=[-(1/x)/x{x+(1/x)}]
Δ(1/x)=[-(1/x)/x^2+1]
Δ(1/x)=[-(1/x)*x/(x^2+1)*x]
Δ(1/x)=[-1/(x^3+x)]
Δ(1/x)=-1/x
ΔΔx=Δ(1/x)
ΔΔx=Δ(1/x)=-1/x
t=√4π/h
x=√4π/h
tx=4π/h
tx=4π/h=C=1
tx=1
tx=1
t=1/x
xΔx=1
Δx=1/x
t=1/x
t=Δx
Δt=ΔΔx
xΔx=1
Δx=1/x
ΔΔx=Δ(1/x)
Δ(1/x)=-1/x
ΔΔx=Δ(1/x)=-1/x
Δt=ΔΔx
Δt=ΔΔx=Δ(1/x)=-1/x
Δt=-1/x
tΔt=1
Δt=1/t
Δt=-1/x
1/t=-1/x
t=-x
t=-x
(-x)=t
x=-t
t=-x
t=√4π/h
(-x)=√4π/h
(-x)=√4π/√h
(-1/x)=√h/√4π
(-1/x)=√h/4π
x=-t
x=√4π/h
(-t)=√4π/h
(-t)=√4π/√h
(-1/t)=√h/√4π
(-1/t)=√h/4π
E=√4π/h
1/E=√h/4π
E=-√4π/h
1/E=-√h/4π
t=√4π/h
1/t=√h/4π
t=-√4π/h
1/t=-√h/4π
(-t)=√4π/h
(-1/t)=√h/4π
p=√4π/h
1/p=√h/4π
p=-√4π/h
1/p=-√h/4π
x=√4π/h
1/x=√h/4π
x=-√4π/h
1/x=-√h/4π
(-x)=√4π/h
(-1/x)=√h/4π
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