±¾ÌâÓУ¨1£©¡¢£¨2£©¡¢£¨3£©Èý¸öÑ¡¿¼Ì⣬ÿÌâ7·Ö£¬Ç뿼ÉúÈÎÑ¡2Ìâ×÷´ð£¬Âú·Ö14·Ö£®Èç¹û¶à×ö£¬Ôò°´Ëù×öµÄÇ°Á½Ìâ¼Æ·Ö
£¨1£©¶þ½×¾ØÕóM¶ÔÓ¦µÄ±ä»»½«ÏòÁ¿
1
-1
£¬
-2
1
·Ö±ð±ä»»³ÉÏòÁ¿
3
-2
£¬
-2
1
£¬Ö±ÏßlÔÚMµÄ±ä»»ÏÂËùµÃµ½µÄÖ±Ïßl¡äµÄ·½³ÌÊÇ2x-y-1=0£¬ÇóÖ±ÏßlµÄ·½³Ì£®
£¨2£©¹ýµãP£¨-3£¬0£©ÇÒÇãб½ÇΪ30¡ãµÄÖ±ÏßlºÍÇúÏßC£º
x=s+
1
s
y=s-
1
s
£¨sΪ²ÎÊý£©ÏཻÓÚA£¬BÁ½µã£¬ÇóÏ߶ÎABµÄ³¤£®
£¨3£©Èô²»µÈʽ|a-1|¡Ýx+2y+2z£¬¶ÔÂú×ãx2+y2+z2=1µÄÒ»ÇÐʵÊýx£¬y£¬zºã³ÉÁ¢£¬ÇóʵÊýaµÄÈ¡Öµ·¶Î§£®
£¨1£©ÉèM=
ab
cd
£¬ÔòÓÉÌâÖª
ab
cd
1
-1
=
3
-2
£¬
ab
cd
-2
1
=
-2
-1

ËùÒÔ
a-b=3
c-d=-2
-2a+b=-2
-2c+d=-1
£¬½âµÃ
a=-1
b=-4
c=3
d=5
£¬ËùÒÔM=
-1-4
35
£®
ÉèµãP£¨x£¬y£©ÊÇÖ±ÏßlÉÏÈÎÒ»µã£¬ÔÚM±ä»»Ï¶ÔÓ¦µÄµãΪP¡ä£¨x0£¬y0£©£¬
ÄÇô
-1-4
35
x
y
=
x0
y0
¼´
x0=-x-4y
y0=3x+5y
£®
ÒòΪ2x0-y0-1=0£¬¡à2£¨-x-4y£©-£¨3x+5y£©-1=0 ¼´5x+13y+1=0£¬
Òò´ËÖ±ÏßlµÄ·½³ÌÊÇ5x+13y+1=0£®
£¨2£©ÓÉÒÑÖª£¬Ö±ÏߵIJÎÊý·½³ÌΪ
x=-3+
3
2
t
y=
1
2
t
tΪ²ÎÊý£©£¬
ÇúÏß
x=s+
1
s
y=s-
1
s
sΪ²ÎÊý£©¿ÉÒÔ»¯Îªx2-y2=4£®
½«Ö±ÏߵIJÎÊý·½³Ì´úÈëÉÏʽ£¬µÃt2-6
3
t+10=0
£®
ÉèA£¬B¶ÔÓ¦µÄ²ÎÊý·Ö±ðΪt1£¬t2£¬¡àt1+t2=£¬t1t2=10£®
¡àAB=|t1-t2|=
(t1+t2)2-4t1t2
=2
17
£®
£¨3£©ÓÉ¿ÂÎ÷²»µÈʽ9=£¨12+22+22£©•£¨x2+y2+z2£©¡Ý£¨1•x+2•y+2•z£©2
¼´x+2y+2z¡Ü3£¬µ±ÇÒ½öµ±
x
1
=
y
2
=
z
2
£¾0
x2+y2+z2=1

¼´x=
1
5
£¬y=
2
5
£¬z=
2
5
ʱ£¬x+2y+2zÈ¡µÃ×î´óÖµ3£®
¡ß²»µÈʽ|a-1|¡Ýx+2y+2z£¬¶ÔÂú×ãx2+y2+z2=1µÄÒ»ÇÐʵÊýx£¬y£¬zºã³ÉÁ¢£¬
Ö»Ðè|a-1|¡Ý3£¬½âµÃa-1¡Ý3»òa-1¡Ü-3£¬¡àa¡Ý4»ò¡àa¡Ü-2£®
¼´ÊµÊýµÄÈ¡Öµ·¶Î§ÊÇ£¨-¡Þ£¬-2]¡È[4£¬+¡Þ£©£®
Á·Ï°²áϵÁдð°¸
Ïà¹ØÏ°Ìâ

¿ÆÄ¿£º¸ßÖÐÊýѧ À´Ô´£º ÌâÐÍ£º

±¾ÌâÓУ¨1£©¡¢£¨2£©¡¢£¨3£©Èý¸öÑ¡´ðÌ⣬Ç뿼ÉúÈÎÑ¡2Ìâ×÷´ð£®
£¨1£©Ñ¡ÐÞ4-2£º¾ØÕóÓë±ä»»
ÒÑÖªa£¬b¡ÊR£¬ÈôM=
-1a
b3
Ëù¶ÔÓ¦µÄ±ä»»TM°ÑÖ±ÏßL£º2x-y=3±ä»»Îª×ÔÉí£¬ÇóʵÊýa£¬b£¬²¢ÇóMµÄÄæ¾ØÕó£®
£¨2£©Ñ¡ÐÞ4-4£º×ø±êϵÓë²ÎÊý·½³Ì
ÒÑÖªÖ±ÏßlµÄ²ÎÊý·½³Ì£º
x=t
y=1+2t
£¨tΪ²ÎÊý£©ºÍÔ²CµÄ¼«×ø±ê·½³Ì£º¦Ñ=2
2
sin(¦È+
¦Ð
4
)
£®
¢Ù½«Ö±ÏßlµÄ²ÎÊý·½³Ì»¯ÎªÆÕͨ·½³Ì£¬Ô²CµÄ¼«×ø±ê·½³Ì»¯ÎªÖ±½Ç×ø±ê·½³Ì£»
¢ÚÅжÏÖ±ÏßlºÍÔ²CµÄλÖùØϵ£®
£¨3£©Ñ¡ÐÞ4-5£º²»µÈʽѡ½²
ÒÑÖªº¯Êýf£¨x£©=|x-1|+|x-2|£®Èô²»µÈʽ|a+b|+|a-b|¡Ý|a|f£¨x£©£¨a¡Ù0£¬a£¬b¡ÊR£©ºã³ÉÁ¢£¬ÇóʵÊýxµÄ·¶Î§£®

²é¿´´ð°¸ºÍ½âÎö>>

¿ÆÄ¿£º¸ßÖÐÊýѧ À´Ô´£º ÌâÐÍ£º

±¾ÌâÓУ¨1£©¡¢£¨2£©¡¢£¨3£©Èý¸öÑ¡ÔñÌ⣬ÿÌâ7·Ö£¬Ç뿼ÉúÈÎÑ¡2Ìâ×÷´ð£¬Âú·Ö14·Ö£®Èç¹û¶à×ö£¬Ôò°´Ëù×öµÄÇ°Á½Ìâ¼Ç·Ö£®
£¨1£©£®Ñ¡ÐÞ4-2£º¾ØÕóÓë±ä»»
ÒÑÖª¾ØÕóA=
1a
-1b
£¬AµÄÒ»¸öÌØÕ÷Öµ¦Ë=2£¬Æä¶ÔÓ¦µÄÌØÕ÷ÏòÁ¿ÊǦÁ1=
2
1
£®
£¨¢ñ£©Çó¾ØÕóA£»
£¨¢ò£©ÈôÏòÁ¿¦Â=
7
4
£¬¼ÆËãA2¦ÂµÄÖµ£®

£¨2£©£®Ñ¡ÐÞ4-4£º×ø±êϵÓë²ÎÊý·½³Ì
ÒÑÖªÍÖÔ²CµÄ¼«×ø±ê·½³ÌΪ¦Ñ2=
12
3cos2¦È+4sin2¦È
£¬µãF1£¬F2ΪÆä×ó¡¢ÓÒ½¹µã£¬Ö±ÏßlµÄ²ÎÊý·½³ÌΪ
x=2+
2
2
t
y=
2
2
t
£¨tΪ²ÎÊý£¬t¡ÊR£©£®ÇóµãF1£¬F2µ½Ö±ÏßlµÄ¾àÀëÖ®ºÍ£®
£¨3£©£®Ñ¡ÐÞ4-5£º²»µÈʽѡ½²
ÒÑÖªx£¬y£¬z¾ùΪÕýÊý£®ÇóÖ¤£º
x
yz
+
y
zx
+
z
xy
¡Ý
1
x
+
1
y
+
1
z
£®

²é¿´´ð°¸ºÍ½âÎö>>

¿ÆÄ¿£º¸ßÖÐÊýѧ À´Ô´£º ÌâÐÍ£º

±¾ÌâÓУ¨1£©¡¢£¨2£©¡¢£¨3£©Èý¸öÑ¡´ðÌ⣬ÿСÌâ7·Ö£¬Ç뿼ÉúÈÎÑ¡2Ìâ×÷´ð£¬Âú·Ö14·Ö£¬Èç¹û¶à×ö£¬Ôò°´Ëù×öµÄÇ°Á½Ìâ¼Æ·Ö£®
£¨1£©Ñ¡ÐÞ4-2£º¾ØÕóÓë±ä»»
ÒÑÖª¾ØÕóA=
12
34
£®
¢ÙÇó¾ØÕóAµÄÄæ¾ØÕóB£»
¢ÚÈôÖ±Ïßl¾­¹ý¾ØÕóB±ä»»ºóµÄ·½³ÌΪy=x£¬ÇóÖ±ÏßlµÄ·½³Ì£®
£¨2£©Ñ¡ÐÞ4-4£º×ø±êϵÓë²ÎÊý·½³Ì
ÒÑÖª¼«×ø±êϵµÄ¼«µãÓëÖ±½Ç×ø±êϵµÄÔ­µãÖغϣ¬¼«ÖáÓëÖ±½Ç×ø±êϵÖÐxÖáµÄÕý°ëÖáÖغϣ®Ô²CµÄ²ÎÊý·½³ÌΪ
x=1+2cos¦Á
y=-1+2sin¦Á
£¨aΪ²ÎÊý£©£¬µãQ¼«×ø±êΪ£¨2£¬
7
4
¦Ð£©£®
£¨¢ñ£©»¯Ô²CµÄ²ÎÊý·½³ÌΪ¼«×ø±ê·½³Ì£»
£¨¢ò£©ÈôµãPÊÇÔ²CÉϵÄÈÎÒâÒ»µã£¬ÇóP¡¢QÁ½µã¾àÀëµÄ×îСֵ£®
£¨3£©Ñ¡ÐÞ4-5£º²»µÈʽѡ½²
£¨I£©¹ØÓÚxµÄ²»µÈʽ|x-3|+|x-4|£¼aµÄ½â²»ÊÇ¿Õ¼¯£¬ÇóaµÄÈ¡Öµ·¶Î§£®
£¨II£©Éèx£¬y£¬z¡ÊR£¬ÇÒ
x2
16
+
y2
5
+
z2
4
=1
£¬Çóx+y+zµÄÈ¡Öµ·¶Î§£®

²é¿´´ð°¸ºÍ½âÎö>>

¿ÆÄ¿£º¸ßÖÐÊýѧ À´Ô´£º ÌâÐÍ£º

±¾ÌâÓУ¨1£©¡¢£¨2£©¡¢£¨3£©Èý¸öÑ¡´ðÌ⣬ÿÌâ7·Ö£¬Ç뿼ÉúÈÎÑ¡2Ìâ×÷´ð£¬Âú·Ö14·Ö£®Èç¹û¶à×ö£¬Ôò°´Ëù×öµÄÇ°Á½Ìâ¼Ç·Ö£®
£¨¢ñ£©Ñ¡ÐÞ4-2£º¾ØÕóÓë±ä»»£¬
ÒÑÖª¾ØÕóA=
01
a0
£¬¾ØÕóB=
02
b0
£¬Ö±Ïßl1
£ºx-y+4=0¾­¾ØÕóAËù¶ÔÓ¦µÄ±ä»»µÃÖ±Ïßl2£¬Ö±Ïßl2ÓÖ¾­¾ØÕóBËù¶ÔÓ¦µÄ±ä»»µÃµ½Ö±Ïßl3£ºx+y+4=0£¬ÇóÖ±Ïßl2µÄ·½³Ì£®
£¨¢ò£©Ñ¡ÐÞ4-4£º×ø±êϵÓë²ÎÊý·½³Ì£¬
ÇóÖ±Ïß
x=-2+2t
y=-2t
±»ÇúÏß
x=1+4cos¦È
y=-1+4sin¦È
½ØµÃµÄÏÒ³¤£®
£¨¢ó£©Ñ¡ÐÞ4-5£º²»µÈʽѡ½²£¬½â²»µÈʽ|x+1|+|2x-4|£¾6£®

²é¿´´ð°¸ºÍ½âÎö>>

¿ÆÄ¿£º¸ßÖÐÊýѧ À´Ô´£º ÌâÐÍ£º

±¾ÌâÓУ¨1£©¡¢£¨2£©¡¢£¨3£©Èý¸öÑ¡´ðÌ⣬ÿÌâ7·Ö£¬Ç뿼ÉúÈÎÑ¡2Ìâ×÷´ð£¬Âú·Ö14·Ö
£¨1£©ÒÑÖª¾ØÕóM=
12
21
£¬¦Â=
1
7
£¬£¨¢ñ£©ÇóM-1£»£¨¢ò£©Çó¾ØÕóMµÄÌØÕ÷ÖµºÍ¶ÔÓ¦µÄÌØÕ÷ÏòÁ¿£»£¨¢ó£©¼ÆËãM100¦Â£®
£¨2£©ÇúÏßCµÄ¼«×ø±ê·½³ÌÊǦÑ=1+cos¦È£¬µãAµÄ¼«×ø±êÊÇ£¨2£¬0£©£¬ÇóÇúÏßCÔÚËüËùÔÚµÄƽÃæÄÚÈƵãAÐýתһÖܶøÐγɵÄͼÐεÄÖܳ¤£®
£¨3£©ÒÑÖªa£¾0£¬ÇóÖ¤£º
a2+
1
a2
-
2
¡Ýa+
1
a
-2
£®

²é¿´´ð°¸ºÍ½âÎö>>

ͬ²½Á·Ï°²á´ð°¸