题目内容
观察下列恒等式:
∵
=-
,
∴tanα-
=-
①
∴tan2α-
=-
②
tan4α-
=-
③
由此可知:tan
+2tan
+4tan
-
=( )
∵
| tan2a-1 |
| tanα |
| 2(1-tan2α) |
| 2tanα |
∴tanα-
| 1 |
| tanα |
| 2 |
| tan2α |
∴tan2α-
| 1 |
| tan2α |
| 2 |
| tan4α |
tan4α-
| 1 |
| tan4α |
| 2 |
| tan8α |
由此可知:tan
| π |
| 32 |
| π |
| 16 |
| π |
| 8 |
| 1 | ||
tan
|
| A.-2 | B.-4 | C.-6 | D.-8 |
∵tan
-
=-
,
∴原式=2tan
-
+4tan
=
+4tan
=4×(-
)=-8.
选D.
| π |
| 32 |
| 1 | ||
tan
|
| 2 | ||
tan
|
∴原式=2tan
| π |
| 16 |
| 2 | ||
tan
|
| π |
| 8 |
=
| -4 | ||
tan
|
| π |
| 8 |
| 2 | ||
tan
|
选D.
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相关题目
观察下列恒等式:
∵
=-
,
∴tanα-
=-
①
∴tan2α-
=-
②
tan4α-
=-
③
由此可知:tan
+2tan
+4tan
-
=( )
∵
| tan2a-1 |
| tanα |
| 2(1-tan2α) |
| 2tanα |
∴tanα-
| 1 |
| tanα |
| 2 |
| tan2α |
∴tan2α-
| 1 |
| tan2α |
| 2 |
| tan4α |
tan4α-
| 1 |
| tan4α |
| 2 |
| tan8α |
由此可知:tan
| π |
| 32 |
| π |
| 16 |
| π |
| 8 |
| 1 | ||
tan
|
| A、-2 | B、-4 | C、-6 | D、-8 |
观察下列恒等式:
∵
∴tanα-
=-
①
∴tan2α-
=-
②
tan4α-
=-
③
由此可知:tan
+2tan
+4tan
-
=( )
| A.-2 | B.-4 | C.-6 | D.-8 |
=-
①
=-
②
=-
③
+2tan
+4tan
-
=( )