???????????????????AB?BM?MG?AG; ????1??????????????????????(3)AG?(AB?AC)?AG?AM?MG.
2四、课堂练习:
1.如图,在空间四边形ABCD中,E,F分别是AD与BC的中点,
求证:???EF??1(???AB?????DC?).
证明:???EF?????2ED?????DC?????CF??1???AD?????DC??1???? ?1???????????2?2CB 1????2(AB?BD)?DC??1???2AB?????DC?2CB
?1(???CB?????BD?)
?1???2AB?????DC?2?1????2CD ?1(???AB?????DC?)
2.已知2?x?3?2y??3a??b??4c?,?3?x??y?8a??5b??c?,把向量表示 解:∵2x??3y???3a??b??4c?,?3x??y??8a??5b??c?
∴?x??3a??2b??c?, ?y?a??b??2c?
3???.????????AD?如图,?b?在平行六面体ABCD?ABCD中,设AB,???AA???c?,E,F分别是(1)用向量a???????????AD??,BD中点,
(2)化简:???,b?,c???表示D?B,EF;
解: (1)???ABD?B????????BB??????BC??????C?D???2????D?E?;
D?A???????A?B??????B?B???b??a??c? ???EF?????EA?????AB?????BF??1????2D?A?a??1????2BD
?12(?b??c?)?a??12(?a??b?)?1??2(a?c) 五、小结 :空间向量的相关的概念及空间向量的表示方法;向量加法、减法和数乘运算
六、课后作业:如图设A是△BCD所在平面外的一点,重心????1????求证:AG?(AB????AC?????AD?)3 七、板书设计(略) 八、课后记:
AEBDFC?x,?y用向量a?,b?,c??D'C'a,
A'B'EDCFAB平行六面体的概念;
是△BCD的A B G D
C
?G