Exer I-2 T · Title Exer I-2 T Author: Windows 7 Created Date: 8/31/2010 11:11:48 AM Keywords ()

2
1. Se x é um arco do 2º quadrante 2 2 = senx , então tgx é: . 3 ) . 1 ) . 3 3 ) . 3 ) . 1 ) e d c b a - - - 2 Sendo 5 3 - = senx e 2 3 π π < < x , determina: tgx b x a ) cos ) 3. Simplifique a seguinte expressão ( 29 x sen x x sen y + - + + - = π π π 2 2 cos 2 3 . 4. Calcule o valor das expressões: º 180 º 270 45 º 30 ) sen sen sen sen a - - º 60 cos º 45 cos º 60 cos º 45 cos ) - - - b 5. Qual é o valor da expressão π π cos 2 2 sen 2 - = y ? a) 4. b) 3. c) 2. d) 1. e) 0 6. Calcule α cos e α tg , sabendo que tem extremidade no 2º quadrante e que 17 15 = α sen . 7. Sendo o x um arco do 2º quadrante e sabendo que 3 2 cos - = x , determina x sen 2 , x 2 cos e x tg 2 . 8. Sendo 5 3 = senx e 2 π < x < π. Então, x 2 cos é: . 5 1 ) . 25 7 ) . 5 4 ) . 5 4 ) . 1 ) e d c b a - 9. Sendo 2 = tga e 1 = tgb , acha ) ( b a tg - . 10. Calcula ) ( b a tg e ) ( b a tg - , conhecendo: a) 4 = tga e 2 = tgb . b) 1 - = tga e 2 1 - = tgb . 11. Sendo sen x = 5 3 e 2 π < x < π. Então, sen 2x é: . 5 1 ) . 25 7 ) . 5 4 ) . 5 24 ) . 1 ) e d c b a - 12. A expressão ( 29 ( 29 a sen a sen a + - - - - π π π 2 1 2 cos é igual a: . 2 1 cos ) . 2 1 cos ) . 2 1 ) . 2 1 ) . 2 3 ) sena a e sena a d sena c sena b sena a - + - Matemática Daniel Acosta de entrega: 01/09 Trigonometria 2º ANO

Transcript of Exer I-2 T · Title Exer I-2 T Author: Windows 7 Created Date: 8/31/2010 11:11:48 AM Keywords ()

Page 1: Exer I-2 T · Title Exer I-2 T Author: Windows 7 Created Date: 8/31/2010 11:11:48 AM Keywords ()

1. Se x é um arco do 2º quadrante 2

2=senx , então tgx

é:

.3).1).3

3).3).1) edcba −−−

2 Sendo 5

3−=senx e 2

3ππ << x , determina:

tgxb

xa

)

cos)

3. Simplifique a seguinte expressão

( )xsenxxseny +−

++

−= πππ2

2cos

2

3.

4. Calcule o valor das expressões:

º180º270

45º30)

sensen

sensena

−⋅−

º60cosº45cos

º60cosº45cos)

−−⋅−

b

5. Qual é o valor da expressão ππcos2

2sen2 −=y ?

a) 4. b) 3. c) 2. d) 1. e) 0 6. Calcule αcos e αtg , sabendo que ∝ tem extremidade

no 2º quadrante e que 17

15=αsen .

7. Sendo o x um arco do 2º quadrante e sabendo

que 3

2cos −=x , determina xsen 2 , x2cos e xtg 2 .

8. Sendo 5

3=senx e 2π < x < π. Então, x2cos é:

.5

1)

.25

7)

.5

4)

.5

4)

.1)

e

d

c

b

a

9. Sendo 2=tga e 1=tgb , acha )( batg − . 10. Calcula )( batg + e )( batg − , conhecendo: a) 4=tga e 2=tgb .

b) 1−=tga e 2

1−=tgb .

11. Sendo sen x = 53 e

2π < x < π. Então, sen 2x é:

.5

1)

.25

7)

.5

4)

.5

24)

.1)

e

d

c

b

a

12. A expressão ( ) ( )asenasena +−−−

− πππ2

1

2cos é

igual a:

.2

1cos)

.2

1cos)

.2

1)

.2

1)

.2

3)

senaae

senaad

senac

senab

senaa

+

Matemática

Daniel Acosta

de entrega: 01/09

Trigonometria

2º ANO

Page 2: Exer I-2 T · Title Exer I-2 T Author: Windows 7 Created Date: 8/31/2010 11:11:48 AM Keywords ()

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