平行六面体ABCD-A1B1C1D1中,AB=4,AD=3,AA1=5,角BAD=角BAA1=角DAA1=60°则AC1的长=?
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平行六面体ABCD-A1B1C1D1中,AB=4,AD=3,AA1=5,角BAD=角BAA1=角DAA1=60°则AC1的长=?
平行六面体ABCD-A1B1C1D1中,AB=4,AD=3,AA1=5,角BAD=角BAA1=角DAA1=60°则AC1的长=?
平行六面体ABCD-A1B1C1D1中,AB=4,AD=3,AA1=5,角BAD=角BAA1=角DAA1=60°则AC1的长=?
向量AC'=向量AB+向量AD+向量AA'
=>
AC'^2 = (向量AB+向量AD+向量AA')^2
=
AB^2 + AD^2 + AA'^2 + 2(向量AB*向量AD+向量AA'*向量AB+向量AD*向量AA')
=
AB^2 + AD^2 + AA'^2 + 2AB*ADcos60+2AA'*ABcos60+2AD*AA'cos60
=
16+9+25+2*4*3/2+2*5*4/2+2*3*5/2
=
97
=>
AC' = 97
∵六面体ABCD-A1B1C1D1是平行六面体,
∵
AC1
=
AA1
+
AD
+
AB
∴|
AC1
| 2=(
AA1
+
AD
+
AB
)2=|
AA1
| 2+|...
全部展开
∵六面体ABCD-A1B1C1D1是平行六面体,
∵
AC1
=
AA1
+
AD
+
AB
∴|
AC1
| 2=(
AA1
+
AD
+
AB
)2=|
AA1
| 2+|
AB
| 2+|
AD
| 2+2
AA1
•
AD
+2
AA1
•
AB
+2
AB
•
AD
又∵∠BAD=∠A1AB=∠A1AD=60°,AD=4,AB=3,AA1=5,
∴|
AC1
| 2=16+9+25+2×5×4×cos60°+2×5×3×cos60°+2×3×4×cos60°=97
∴|
AC1
|=
97
故答案为
97
收起
向量AC'=向量AB+向量AD+向量AA'
=>
AC'^2 = (向量AB+向量AD+向量AA')^2
=
AB^2 + AD^2 + AA'^2 + 2(向量AB*向量AD+向量AA'*向量AB+向量AD*向量AA')
=
AB^2 + AD^2 + AA'^2 + 2AB*ADcos60+2AA'*ABcos45+2AD*AA'cos45<...
全部展开
向量AC'=向量AB+向量AD+向量AA'
=>
AC'^2 = (向量AB+向量AD+向量AA')^2
=
AB^2 + AD^2 + AA'^2 + 2(向量AB*向量AD+向量AA'*向量AB+向量AD*向量AA')
=
AB^2 + AD^2 + AA'^2 + 2AB*ADcos60+2AA'*ABcos45+2AD*AA'cos45
=
25+9+49+15+35√2+21√2
=
98+56√2
=>
AC' = √(98+56√2)
收起