第七章点的合成运动87-1相对运动·牵连运动·绝对运动87-2点的速度合成定理S7-3牵连运动为平动时点的加速度合成定理87-4牵连运动为定轴转动时点的加速度合成定理
第七章 点的合成运动 §7-1 相对运动·牵连运动·绝对运动 §7-2 点的速度合成定理 §7-3 牵连运动为平动时点的加速度合成定理 §7-4 牵连运动为定轴转动时点的加速度合成定理
S7-4牵连运动为定轴转动时点的加速度合成定理先分析对时间的导数。dk'dro'drATA=To +k'dtdtdt0\\draVA0二dt绕定轴=转动·drovoWexro一dtdk'WexiA=WexFo+tdk'=We×(A-r0)=We×Kdt同理可得和,即k=wexkt=wext,"= a。×J
§7-4 牵连运动为定轴转动时点的加速度合成定理 先分析𝑘 ′对时间的导数。 绕定轴z转动 𝑟 Ԧ 𝐴 = 𝑟 Ԧ 𝑂 ′ + 𝑘 ′ 𝑣 Ԧ 𝐴 = d𝑟 Ԧ 𝐴 d𝑡 = 𝜔e × 𝑟 Ԧ 𝐴 d𝑟 Ԧ 𝐴 d𝑡 = d𝑟 Ԧ 𝑂 ′ d𝑡 + d𝑘 ′ d𝑡 𝑣 Ԧ 𝑂 ′ = d𝑟 Ԧ 𝑂 ′ d𝑡 = 𝜔e × 𝑟 Ԧ 𝑂 ′ 𝜔e × 𝑟 Ԧ 𝐴 = 𝜔e × 𝑟 Ԧ 𝑂 ′ + d𝑘 ′ d𝑡 d𝑘 ′ d𝑡 = 𝜔e × (𝑟 Ԧ 𝐴 − 𝑟 Ԧ 𝑂 ′ ) = 𝜔e × 𝑘 ′ 同理可得 ሶ 𝑖 Ԧ ′和 ሶ 𝑗 Ԧ ′,即 ሶ 𝑖 Ԧ ′ = 𝜔e × 𝑖 Ԧ ′ , ሶ 𝑗 Ԧ ′ = 𝜔e × 𝑗 Ԧ ′ , ሶ 𝑘 ′ = 𝜔e × 𝑘 ′
k =a×k''=wext,=we ×j,r(相对导数)d= + +2ar二dm'=+x++z(牵连点加速度)a.dt2d2TMZaa(动点M加速度)dt2Mik!=ro+x+y学+zk0'疗rx'+++0+2(x++2k)x
ሶ 𝑖 Ԧ ′ = 𝜔e × 𝑖 Ԧ ′ , ሶ 𝑗 Ԧ ′ = 𝜔e × 𝑗 Ԧ ′ , ሶ 𝑘 ′ = 𝜔e × 𝑘 ′ (相对导数) (牵连点加速度) 𝑎 Ԧ r = d෨2 𝑟 Ԧ ′ d𝑡 2 = 𝑥ሷ ′ 𝑖 Ԧ ′ + 𝑦ሷ ′ 𝑗 Ԧ ′ + 𝑧ሷ ′𝑘 ′ 𝑎 Ԧ e = d 2 𝑟 Ԧ 𝑀′ d𝑡 2 = ሷ𝑟 Ԧ 𝑂′ + 𝑥 ′ ሷ 𝑖 Ԧ ′ + 𝑦 ′ ሷ 𝑗 Ԧ ′ + 𝑧 ′ ሷ 𝑘 ′ 𝑎 Ԧ a = d 2 𝑟 Ԧ 𝑀 d𝑡 2 = ሷ𝑟 Ԧ 𝑂′ + 𝑥 ′ ሷ 𝑖 Ԧ ′ + 𝑦 ′ ሷ 𝑗 Ԧ ′ + 𝑧 ′ ሷ 𝑘 ′ +𝑥ሷ ′ 𝑖 Ԧ ′ + 𝑦ሷ𝑗 Ԧ ′ + 𝑧ሷ𝑘 ′ +2(𝑥ሶ ′ ሶ 𝑖 Ԧ ′ + 𝑦ሶ ′ ሶ 𝑗 Ԧ ′ + 𝑧ሶ ′ ሶ 𝑘 ′ ) (动点M加速度)
=e ×k'"=aext, = e ×,2(x++)因为=2[x'(@×t) +y'(@e×) +2(e×k)]=2We×(x't+y+zk)= 20e×i得aa=ae+ar+2we×i令ac=2we×,称为科氏加速度有科里奥利 Coriolisaa = ae +ar + ac法国物理学家
因为 得 ሶ 𝑖 Ԧ ′ = 𝜔e × 𝑖 Ԧ ′ , ሶ 𝑗 Ԧ ′ = 𝜔e × 𝑗 Ԧ ′ , ሶ 𝑘 ′ = 𝜔e × 𝑘 ′ 2(𝑥ሶ ′ ሶ 𝑖 Ԧ ′ + 𝑦ሶ ′ ሶ 𝑗 Ԧ ′ + 𝑧ሶ ′ ሶ 𝑘 ′ ) = 2 𝑥ሶ ′ 𝜔e × 𝑖 Ԧ ′ + 𝑦ሶ ′ 𝜔e × 𝑗 Ԧ ′ + 𝑧ሶ ′ 𝜔e × 𝑘 ′ = 2𝜔e × 𝑥ሶ ′ 𝑖 Ԧ ′ + 𝑦ሶ ′ 𝑗 Ԧ ′ + 𝑧ሶ ′𝑘 ′ = 2𝜔e × 𝑣 Ԧ r 𝑎 Ԧ a = 𝑎 Ԧ e + 𝑎 Ԧ r + 2𝜔e × 𝑣 Ԧ r 令 𝑎 Ԧ C = 2𝜔e × 𝑣 Ԧ r,称为科氏加速度 有 𝑎 Ԧ a = 𝑎 Ԧ e + 𝑎 Ԧ r + 𝑎 Ԧ C 科里奥利 Coriolis 法国物理学家
=×k另一种方法'=wext,}=e×,其中=x+y+kr=rol+r!dr'%=++2=许dr!=x+++x++dtdr+x(x+y+zk)Zdr'dt+aexr一k京0=+++++同理12dtx'0+0exdtX
ሶ 𝑖 Ԧ ′ = 𝜔e × 𝑖 Ԧ ′ , ሶ 𝑗 Ԧ ′ = 𝜔e × 𝑗 Ԧ ′ , ሶ 𝑘 ′ = 𝜔e × 𝑘 ′ 其中 d෨𝑟 Ԧ ′ d𝑡 = 𝑥ሶ ′ 𝑖 Ԧ ′ + 𝑦ሶ ′ 𝑗 Ԧ ′ + 𝑧ሶ ′𝑘 ′ = 𝑣 Ԧ r 另一种方法 𝑟 Ԧ = 𝑟 Ԧ 𝑂′ + 𝑟 Ԧ ′ 𝑟 Ԧ ′ = 𝑥 ′ 𝑖 Ԧ ′ + 𝑦 ′ 𝑗 Ԧ ′ + 𝑧 ′𝑘 ′ d𝑟 Ԧ ′ d𝑡 = 𝑥ሶ ′ 𝑖 Ԧ ′ + 𝑦ሶ ′ 𝑗 Ԧ ′ + 𝑧ሶ ′𝑘 ′ + 𝑥 ′ ሶ 𝑖 Ԧ ′ + 𝑦 ′ ሶ 𝑗 Ԧ ′ + 𝑧 ′ ሶ 𝑘 ′ = d෩𝑟Ԧ ′ d𝑡 + 𝜔e × 𝑥 ′ 𝑖 Ԧ ′ + 𝑦 ′ 𝑗 Ԧ ′ + 𝑧𝑘 ′ = d෩𝑟Ԧ ′ d𝑡 + 𝜔e × 𝑟 Ԧ ′ d𝑣r d𝑡 = 𝑥ሷ ′ 𝑖 Ԧ ′ + 𝑦ሷ𝑗 Ԧ ′ + 𝑧ሷ𝑘 ′+ 𝑥ሶ ′ ሶ 𝑖 Ԧ ′ + 𝑦ሶ ′ ሶ 𝑗 Ԧ ′ + 𝑧ሶ ′ ሶ 𝑘 同理 ′ = d෩𝑣r d𝑡 + 𝜔e × 𝑣 Ԧ r