题目内容
已知三棱柱ABC-A1B1C1的底面为直角三角形,则棱与底面垂直,如图所示,D是棱CC1的中点,且∠ACB=90°,BC=1,AC=
,AA1=
(Ⅰ)证明:A1D⊥平面AB1C1;
(Ⅱ)求二面角B-AB1-C1的余弦值.
| 3 |
| 6 |
(Ⅰ)证明:A1D⊥平面AB1C1;
(Ⅱ)求二面角B-AB1-C1的余弦值.
(Ⅰ)证明:∵∠ACB=90°,∴BC⊥AC.
∵三棱柱ABC-A1B1C1中,CC1⊥平面ABC,
∴BC⊥CC1,
∵AC∩CC1=C,
∴BC⊥平面ACC1A1.
∵A1D?平面ACC1A1,∴BC⊥A1D,
而BC∥B1C1,则B1C1⊥A1D.
在Rt△ACC1与Rt△DC1A1中,
=
=
,∴△ACC1~△DC1A1,
∴∠AC1C=∠DA1C1,
∴∠AC1C+∠C1DA1=90°.即A1D⊥AC1.
∵B1C1∩AC1=C1,
∴A1D⊥平面AB1C1;
(Ⅱ)如图,设A1D∩AC1=H,过A1作AB1的垂线,垂足为G,连GH,
∵A1D⊥平面AB1C1,∴AB1⊥A1D,∴AB1⊥平面A1GH,
∴∠A1GH为二面角A1-AB1-C1的平面角.
在Rt△AA1B1中,AA1=
,A1B1=2,
∴AB1=
,
∴由等面积,可得A1G=
;
在Rt△AA1C1中,AA1=
,A1C1=
,
∴AC1=3,∴由等面积,可得A1H=
.
∴在Rt△A1GH中,sin∠A1GH=
,
∴cos∠A1GH=
,
∴二面角B-AB1-C1的余弦值为-
.
∵三棱柱ABC-A1B1C1中,CC1⊥平面ABC,
∴BC⊥CC1,
∵AC∩CC1=C,
∴BC⊥平面ACC1A1.
∵A1D?平面ACC1A1,∴BC⊥A1D,
而BC∥B1C1,则B1C1⊥A1D.
在Rt△ACC1与Rt△DC1A1中,
| AC |
| CC1 |
| DC1 |
| AC1 |
| ||
| 2 |
∴∠AC1C=∠DA1C1,
∴∠AC1C+∠C1DA1=90°.即A1D⊥AC1.
∵B1C1∩AC1=C1,
∴A1D⊥平面AB1C1;
(Ⅱ)如图,设A1D∩AC1=H,过A1作AB1的垂线,垂足为G,连GH,
∵A1D⊥平面AB1C1,∴AB1⊥A1D,∴AB1⊥平面A1GH,
∴∠A1GH为二面角A1-AB1-C1的平面角.
在Rt△AA1B1中,AA1=
| 6 |
∴AB1=
| 10 |
∴由等面积,可得A1G=
2
| ||
| 5 |
在Rt△AA1C1中,AA1=
| 6 |
| 3 |
∴AC1=3,∴由等面积,可得A1H=
| 2 |
∴在Rt△A1GH中,sin∠A1GH=
| ||
| 6 |
∴cos∠A1GH=
| ||
| 6 |
∴二面角B-AB1-C1的余弦值为-
| ||
| 6 |
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