1 / 6

球坐标下的 三重积分计算

球坐标下的 三重积分计算. 球面坐标. z. 0. y. x. z. M ( r ,  ,  ). r. . y. . x. N. 球面坐标的坐标面. z. 0. x. y. 动点 M ( r, ,  ). r = 常数 :. 球面 S.  = 常数 :. M. . r. S. z. 0. x. y. 球面坐标的坐标面. C. 动点 M ( r, ,  ). r = 常数 :. 球面 S.  = 常数 :. 锥面 C. M.  = 常数 :. 半 平面 P. . . S.

martin-foreman
Télécharger la présentation

球坐标下的 三重积分计算

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. 球坐标下的三重积分计算

  2. 球面坐标 z 0 y x z M(r,,) . . . r  y  x N

  3. 球面坐标的坐标面 z 0 x y 动点M(r,,) r =常数: 球面S =常数: M  r S

  4. . z 0 x y 球面坐标的坐标面 C 动点M(r,,) r =常数: 球面S =常数: 锥面C M =常数: 半平面P   S P 

  5. 球面坐标下的体积元素 z 0 y x 元素区域由六个坐标面围成: 球面r+d r 圆锥面 半平面 及+d ; 半径为r及r+dr的球面; 圆锥面及+d . dr rsin rsind 球面r rd 圆锥面+d r  d  d

  6. . 球面坐标下的体积元素 z 元素区域由六个坐标面围成: 半平面 及+d ; 半径为r及r+dr的球面; 圆锥面及+d . dr rsind dV rd dV = r 2 sin drdd r  d 0 y  d rcos ) r 2 sin drdd x

More Related