フェルマーの最終定理の証明 (743ﾚｽ)

フェルマーの最終定理の証明 http://rio2016.5ch.net/test/read.cgi/math/1745314067/

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711: １３２人目の素数さん [] 2025/08/23(土) 10:48:00.59 ID:JXSduFT+ y''+y=sin(2x) λ^2+1=0 λ=0±i y_0=C_1 cos(x)+C_2 sin(x) y_1=cos(x), y_2=sin(x) ?y_1?^'=-sin(x), ?y_2?^'=cos(x) W=|?( cos(x)@-sin(x) )?( sin(x) @ cos(x) )| =?cos?^2 (x)+?sin?^2 (x)=1 y_s (x)=-y_1 ∫?(y_2 R(x))/W dx+y_2 ∫?(y_1 R(x))/W dx =-cos(x) ∫?sin(x)sin(2x) dx+sin(x) ∫?cos(x)sin(2x) dx ∫?sin(2x)sin(x) dx=-1/2 ∫??cos(2x+x)-cos(2x-x) ? dx =-1/2 ∫??cos(3x)-cos(x) ? dx=-1/2?1/3 sin(3x)+1/2 sin(x) =-1/6 sin(3x)+1/2 sin(x) ∫?sin(2x)cos(x) dx=1/2 ∫??sin(2x+x)+sin(2x-x) ? dx =1/2 ∫??sin(3x)+sin(x) ? dx=1/2?(-1)/3 cos(3x)+(-1)/2 cos(x) =-1/6 cos(3x)-1/2 cos(x) y_s (x) =-cos(x)(-1/6 sin(3x)+1/2 sin(x))+sin(x)(-1/6 cos(3x)-1/2 cos(x)) =1/6 sin(3x)cos(x)-1/2 sin(x)cos(x)-1/6 cos(3x)sin(x)-1/2 sin(x)cos(x) =1/6 sin(3x-x)-sin(x)cos(x)=1/6 sin(2x)-1/2 sin(2x) =-1/3 sin(2x) ∴y=C_1 cos(x)+C_2 sin(x)-1/3 sin(2x) http://rio2016.5ch.net/test/read.cgi/math/1745314067/711

712: １３２人目の素数さん [] 2025/08/23(土) 10:48:29.99 ID:JXSduFT+ E(t)=Ri(t)+1/C ∫?i(t) dt i(t)=dq(t)/dt ∫?dq(t)/dt dt=q(t) E(t)=R dq(t)/dt+q(t)/C L[Rq^' ]=RsQ(s)-Rq(0)=RsQ(s) L[q(t)/C]=Q(s)/C L[E]=E/s E/s=RsQ(s)+Q(s)/C=Q(s)(Rs+1/C) Q(s)= E/s 1/(Rs+1/C)=E/s(Rs+1/C) =(E/R)/s(s+1/CR) =E/R 1/s(s+1/CR) 1/s(s+1/CR) =A/s+B/(s+1/CR) 1=A(s+1/CR)+Bs s=0⇒A/CR=1 A=CR s=-1/CR⇒-B 1/CR=1 B=-CR Q(s)=E/R (A/s+B/(s+1/CR))=E/R (CR/s-CR/(s+1/CR))=CE/s-CE/(s+1/CR) L^(-1) [CE/s-CE/(s+1/CR)]=CE(L^(-1) [1/s-1/(s+1/CR)])=CE(1-e^(-1/CR t) ) http://rio2016.5ch.net/test/read.cgi/math/1745314067/712

713: １３２人目の素数さん [] 2025/08/23(土) 10:56:12.41 ID:JXSduFT+ 1/m+1/n=3/77 (m>n)を満たす自然数の組(m,n) 1/m+1/n=(m+n)/mn=3/77 77(m+n)=3mn 3mn-77m-77n=0 9mn-231m-231n=0 (3m-77)(3n-77)-77^2=0 (3m-77)(3n-77)=77^2=7^2･11^2 (7^2･11^2,1), (7･11^2,7),(7^2･11,11),(11^2･7,7),(11^2,7^2 ) ?(7^2･11^2,1)のとき 3m-77=7^2･11^2 3m=7^2･11^2+77=6006 ∴m=2002 3n-77=1 3n=78 ∴n=26 ?(7･11^2,7)のとき 3m-77=7･11^2 3m=7･11^2+77=924 ∴m=308 3n-77=7 3n=7+77=84 ∴n=28 ?(7^2･11,11)のとき 3m-77=11･7^2 3m=11･7^2+77=616 ?(11^2,7^2 )のとき 3m-77=11^2 3m=11^2+77=198 ∴m=66 3n-77=7^2 3n=7^2+77=84 ∴n=42 (m,n)=(2002,26), (308,28), (66,42) http://rio2016.5ch.net/test/read.cgi/math/1745314067/713

714: １３２人目の素数さん [] 2025/08/23(土) 11:06:39.45 ID:JXSduFT+ Δr↑=r↑(t+Δt)-r(t). |r↑|=Δs≒RΔθ. R≒Δs/Δθ, Δx→0⇒Δs→0 1/R=lim[Δx→0])Δθ/Δs=dθ/ds Δs=√((Δx)^2+(Δy)^2)=√((Δx)^2+(Δy)^2)/(Δx)^2 (Δx)^2 )=√(1+(Δy/Δx)^2 ) Δx tan(Δθ)= tan(β-θ)=(tanβ-tanθ)/(1+tanβtanθ)=(y'(x+Δx)-y'(x))/(1+y'(x+Δx)y'(x)) Δθ≠tan(Δθ)=(y'(x+Δx)-y'(x))/(1+y'(x+Δx)y'(x)) Δθ/Δs=((y'(x+Δx)-y'(x))/(1+y'(x+Δx)y'(x)))/(√(1+(Δy/Δx)^2 )Δx) =1/√(1+(Δy/Δx)^2 )?1/Δx?(y'(x+Δx)-y'(x))/(1+y'(x+Δx)y'(x)) =1/√(1+(Δy/Δx)^2 )?(y'(x+Δx)-y'(x))/Δx?1/(1+y'(x+Δx)y'(x)) 1/R=dθ/ds=(lim)[Δx→0]Δθ/Δs =1/√(1+(dy/dx)^2 )(d^2 y)/(dx^2 )1/(1+(dy/dx)^2 ) =((d^2 y)/(dx^2 ))/(1+(dy/dx)^2 )^(3/2) http://rio2016.5ch.net/test/read.cgi/math/1745314067/714

715: １３２人目の素数さん [] 2025/08/23(土) 15:57:20.22 ID:JXSduFT+ M(θ)=E[e^θX ]=∫_(-∞)^∞??e^θx f(x)dx? M(θ)=E[e^θX ]=1/(√2π σ) ∫_(-∞)^∞??e^θx e^(-(x-μ)^2/(2σ^2 )) ? dx=1/(√2π σ) ∫_(-∞)^∞?e^(θx-(x-μ)^2/(2σ^2 )) dx θx-(x-μ)^2/(2σ^2 )=1/(2σ^2 ) (2σ^2 θx-(x-μ)^2 )=-1/(2σ^2 ) (? (x-μ)?^2-2σ^2 θx ) =-1/(2σ^2 ) (? x?^2+μ^2-2μx-2σ^2 θx ) =-1/(2σ^2 ) (? x?^2-2(μ+σ^2 θ)x+μ^2 ) =-1/(2σ^2 ) ((x-(μ+σ^2 θ))^2-(μ+σ^2 θ)^2+μ^2 ) =-1/(2σ^2 ) ((x-(μ+σ^2 θ))^2-(μ^2+2μσ^2 θ+σ^4 θ^2 )+μ^2 ) =-1/(2σ^2 ) ((x-(μ+σ^2 θ))^2-(2μσ^2 θ+σ^4 θ^2 ) ) =-(x-(μ+σ^2 θ))^2/(2σ^2 )+μθ+(σ^2 θ^2)/2 M(θ)=1/(√2π σ) ∫_(-∞)^∞?e^(θx-(x-μ)^2/(2σ^2 )) dx =1/(√2π σ) ∫_(-∞)^∞?e^((-(x-(μ+σ^2 θ))^2/(2σ^2 )+μθ+(σ^2 θ^2)/2) ) dx =1/(√2π σ) e^(μθ+(σ^2 θ^2)/2) ∫_(-∞)^∞?e^((-(x-(μ+σ^2 θ))^2/(2σ^2 )) ) dx t=(x-(μ+σ^2 θ))/(√2 σ) x=√2 σt+μ+σ^2 θ dx=√2 σdt (x-(μ+σ^2 θ))^2/(2σ^2 )=((x-(μ+σ^2 θ))/(√2 σ))^2=t^2 -∞<x?∞ ⇒-∞<t?∞ http://rio2016.5ch.net/test/read.cgi/math/1745314067/715

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