Word hóa Cẩm nang luyện thi đại học Môn Vật Lí của GV ĐINH HOÀNG MINH TÂN

- eq \x\le\to\bo\ri(\a(,T.
- eq \x\le\to\bo\ri(\a(,|v|max = A.
- eq \x\le\to\bo\ri(\a(,Δt.
- eq \x\le\to\bo\ri(\a(,S = 2Asin)).
- eq \x\le\to\bo\ri(\a(,)).
- 2|φ|,ω1+ω2))eq \x\le\to\bo\ri(\a(,t.
- eq \x\le\to\bo\ri(\a(,t = ,ω1+ω2)).
- eq \x\le\to\bo\ri(\a(,.
- sau đó nhấn eq \x\le\to\bo\ri(\a(,=)).
- eq \x\le\to\bo\ri(\a(,T = 2π.
- ;π)) eq \l(\r(,eq \x\le\to\bo\ri(\a(, f.
- với eq \x\le\to\bo\ri(\a(,Δl0.
- eq \x\le\to\bo\ri(\a(,Fhp.
- eq \x\le\to\bo\ri(\a(,Fđh = kx = k Δl)) (x = Δl: độ biến dạng.
- eq \x\le\to\bo\ri(\a(,Fđhmin = 0.
- eq \x\le\to\bo\ri(\a.
- Thế năng: 2))eq \x\le\to\bo\ri(\a(,Wt = kx2 = eq \s\don1(\f(1,2))mω2x2 = eq \s\don1(\f(1,2))mω2A2cos2(ωt + φ))).
- Động năng: 2))eq \x\le\to\bo\ri(\a(,Wđ = mv2 = eq \s\don1(\f(1,2))mω2A2sin2(ωt + φ))).
- Cơ năng: eq \x\le\to\bo\ri(\a(,W = Wt + Wđ = kA2 = eq \s\don1(\f(1,2)) mω2A2 = const)).
- eq \x\le\to\bo\ri(\a(,Mode)) eq \x\le\to\bo\ri(\a(,2)).
- eq \x\le\to\bo\ri(\a(,A.
- eq \x\le\to\bo\ri(\a(,v.
- eq \x\le\to\bo\ri(\a(,v2 – v=2a.s.
- eq \x\le\to\bo\ri(\a(,Δl0.
- eq \x\le\to\bo\ri(\a(,ω.
- với eq \x\le\to\bo\ri(\a(,k.
- eq \x\le\to\bo\ri(\a(,T = 2π=2π.
- với eq \x\le\to\bo\ri(\a(,Δ0.
- eq \x\le\to\bo\ri(\a(,a = gtanα.
- eq \x\le\to\bo\ri(\a(,T = 2π)).
- eq \x\le\to\bo\ri(\a(,f.
- eq \x\le\to\bo\ri(\a(,T = mg(1+ α+ α2))).
- eq \x\le\to\bo\ri(\a(,W = mω2S.
- eq \x\le\to\bo\ri(\a(,W = mgh0 = mgl(1-cosα0))).
- eq \x\le\to\bo\ri(\a(, Δt.
- eq \x\le\to\bo\ri(\a(,g.
- hay α))eq \x\le\to\bo\ri(\a(,T.
- eq \x\le\to\bo\ri(\a(,S.
- với eq \x\le\to\bo\ri(\a(,W0 = m.g.lα.
- Bước sóng: eq \x\le\to\bo\ri(\a(,λ = vT.
- eq \x\le\to\bo\ri(\a(,L(dB.
- eq \x\le\to\bo\ri(\a(,=.
- eq \x\le\to\bo\ri(\a(,ΔL(dB.
- eq \x\le\to\bo\ri(\a(,a = lgx ( x = 10a.
- b))eq \x\le\to\bo\ri(\a(,lg = lga - lgb)).
- eq \x\le\to\bo\ri(\a(, uM = 2Acoscos.
- eq \x\le\to\bo\ri(\a(, AM = 2Acos)).
- Khi ΔφM = 2kπ  2π))eq \x\le\to\bo\ri(\a(,d1 - d2 = kλ - λ)).
- Khi ΔφM = (2k + 1)π  eq \x\le\to\bo\ri(\a(,d1 - d2 =(k+ )λ - eq \s\don1(\f(Δφ,2π))λ)).
- eq \x\le\to\bo\ri(\a(,d1 - d2 = kλ)) thì AMmax = 2A;.
- eq \x\le\to\bo\ri(\a(,d1 - d2 = (k + )λ)).
- Khi eq \x\le\to\bo\ri(\a(,d1 - d2 = kλ)) thì AMmin = 0.
- Khi eq \x\le\to\bo\ri(\a(,d1 - d2 = (k + )λ)).
- Ta có: eq \x\le\to\bo\ri(\a(,v.
- eq \x\le\to\bo\ri(\a(,I0 = ωq0.
- eq \x\le\to\bo\ri(\a(,U0.
- eq \x\le\to\bo\ri(\a(,P = I2R = (W))).
- với eq \x\le\to\bo\ri(\a(,ZL = Lω))(Ω): cảm kháng.
- với eq \x\le\to\bo\ri(\a(,ZC.
- eq \x\le\to\bo\ri(\a(,Z.
- eq \x\le\to\bo\ri(\a(,P = RI2 = URI.
- eq \x\le\to\bo\ri(\a(, φi.
- eq \x\le\to\bo\ri(\a(,Pmax.
- eq \x\le\to\bo\ri(\a(, Z = R.
- eq \x\le\to\bo\ri(\a(,R1  R2.
- ;eq \x\le\to\bo\ri(\a(,tanφ1.tanφ2 = 1 ( φ1 + φ2 = π/2)).
- eq \x\le\to\bo\ri(\a(,R2.
- eq \x\le\to\bo\ri(\a(,PRmax.
- eq \x\le\to\bo\ri(\a(,ZL = 2ZC ( ω.
- eq \x\le\to\bo\ri(\a(,ZC = 2ZL  ω.
- eq \x\le\to\bo\ri(\a(,ZL =ZC ( L.
- eq \x\le\to\bo\ri(\a(,;.
- eq \x\le\to\bo\ri(\a(,ZL = 0 .
- eq \x\le\to\bo\ri(\a(,tanφ1.
- eq \x\le\to\bo\ri(\a(,tanΔφ.
- eq \x\le\to\bo\ri(\a(,ZL =ZC ( C.
- eq \x\le\to\bo\ri(\a(,ωR.
- eq \x\le\to\bo\ri(\a(,ULmax.
- eq \x\le\to\bo\ri(\a(,UCmax.
- eq \x\le\to\bo\ri(\a(,X.
- eq \x\le\to\bo\ri(\a(,X = ZL.
- eq \x\le\to\bo\ri(\a(,R2 = 2ZL.(ZC - ZL))).
- eq \x\le\to\bo\ri(\a(,tanα1.tanα2.
- eq \x\le\to\bo\ri(\a(,cosφ1 = cosφ2.
- eq \x\le\to\bo\ri(\a(,I.
- eq \x\le\to\bo\ri(\a(,UR.
- eq \x\le\to\bo\ri(\a(,P.
- eq \x\le\to\bo\ri(\a(,U2.
- λD,a))eq \x\le\to\bo\ri(\a(,i.
- eq \x\le\to\bo\ri(\a(,N.
- λ))eq \x\le\to\bo\ri(\a(,ε = h.f.
- eq \x\le\to\bo\ri(\a(,ΔWđ.
- eq \x\le\to\bo\ri(\a(,Ibh = =ne.e)).
- eq \x\le\to\bo\ri(\a(,Rmax = v0maxt.
- eq \x\le\to\bo\ri(\a(,Rmax.
- eq \x\le\to\bo\ri(\a(,En = (eV))).
- với R m-1 (máy tính fx 570 ES: bấm eq \x\le\to\bo\ri(\a(,SHIFT)) eq \x\le\to\bo\ri(\a(,7)) eq \x\le\to\bo\ri(\a(,16.
- eq \x\le\to\bo\ri(\a(,m.
- eq \x\le\to\bo\ri(\a(,Wlk = Δm.c)).
- eq \x\le\to\bo\ri(\a(,K