题目内容
如图,在三棱锥P-ABC中,PA⊥底面ABC,∠ACB=90°,AE⊥PB于E,AF⊥PC于F,若PA=AB=2,∠BPC=θ,则当△AEF的面积最大时,tanθ的值为( )
| A.2 | B.
| C.
| D.
|
在Rt△PAB中,PA=AB=2,∴PB=2
,
∵AE⊥PB,∴AE=
PB=
,∴PE=BE=
.
∵PA⊥底面ABC,得PA⊥BC,AC⊥BC,PA∩AC=A
∴BC⊥平面PAC,可得AF⊥BC
∵AF⊥PC,BC∩PC=C,∴AF⊥平面PBC
∵PB?平面PBC,∴AF⊥PB
∵AE⊥PB且AE∩AF=A,∴PB⊥面AEF,
结合EF?平面AEF,可得PB⊥EF.
Rt△PEF中,∠EPF=θ,可得EF=PE•tanθ=
tanθ,
∵AF⊥平面PBC,EF?平面PBC.∴AF⊥EF.
∴Rt△AEF中,AF=
=
,
∴S△AEF=
AF•EF=
×
tanθ×
=
∴当tan2θ=
,即tanθ=
时,S△AEF有最大值为
故选:D
| 2 |
∵AE⊥PB,∴AE=
| 1 |
| 2 |
| 2 |
| 2 |
∵PA⊥底面ABC,得PA⊥BC,AC⊥BC,PA∩AC=A
∴BC⊥平面PAC,可得AF⊥BC
∵AF⊥PC,BC∩PC=C,∴AF⊥平面PBC
∵PB?平面PBC,∴AF⊥PB
∵AE⊥PB且AE∩AF=A,∴PB⊥面AEF,
结合EF?平面AEF,可得PB⊥EF.
Rt△PEF中,∠EPF=θ,可得EF=PE•tanθ=
| 2 |
∵AF⊥平面PBC,EF?平面PBC.∴AF⊥EF.
∴Rt△AEF中,AF=
| AE2-EF2 |
| 2-2tan2θ |
∴S△AEF=
| 1 |
| 2 |
| 1 |
| 2 |
| 2 |
| 2-2tan2θ |
-(tan2θ-
|
∴当tan2θ=
| 1 |
| 2 |
| ||
| 2 |
| 1 |
| 2 |
故选:D
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