1. SOAL SOAL LIMIT
TRIGONOMETRI
10. Nilai dari 2
2
2cos3sin3sin
0
x
xxx
x
Lim
−
→
a. 3.2... 2
3
3
2
2
1
edcb
11. Nilai x
x
x
Lim
−
−
→ 4
)24(sin
4
=...
a. 2
1.
4
1.0.
4
1.
2
1 edcb −−
13. Nilai ...
6cos1
3sin2
0
=
−→ x
xx
x
Lim
a. – 1 b. 1.
3
1.0.
3
1 edc−
14. Nilai ...
822
723
4
=
−−
−−
→ xx
x
x
Lim
a. 2.1.
3
2.
8
1.
9
2 edcb −−−
15. Nilai ...
2tan
14cos
0
=
−
→ xx
x
x
Lim
a. – 4 b. – 2 c. – 1 d. 2 e. 4
17. Nilai ...
2sin2
=
−→ ππ x
xx
x
Lim
a. 2
2.2.0.
2
2.
2
ππππ edcb −−
25. Nilai ...
2sin
6sin
0
=
→ x
x
x
Lim
a. 6.3.2.
3
1.
6
1 edcb
26. Nilai
...
22
tan
0
=
+→ xx
x
x
Lim
a. 2 b. 1 c. 0 d. 4
1.
2
1 e
27. Nilai ...
2
2coscos
0
=
−
→ x
xx
x
Lim
a.
2
3.
3
2.
2
1 cb d. 2 e. 1
29. Nilai ...
sincos
2sin21
4
=
−
−
→
xx
x
x
Lim
π
a. 1 b. ∞.0.2.2
2
1 edc
30. Nilai
...
22cos
2sin1
4
=
−
→ x
x
x
Lim
π
a. 6
1.
4
1.
2
1.0.
2
1 edcb−
33. Nilai
...
sincos
2cos
4
=
−→ xx
x
x
Lim
π
a. 0 b. 22
1
c. 1 d. 2 e. ∞
36. Nilai ...
sin
sin
0
=
→ bx
ax
x
Lim
a. 0 b. 1 c. ∞.. ea
bd
b
a
37. Nilai ...
42
)2(sin
2
=
−
−
→ x
x
x
Lim
a. 4
1.
2
1.0.
2
1.
4
1 edcb −−
40. Nilai ...
)1(
)11(cos)11(sin
1
=
−
−−
→ x
xx
x
Lim
a. – 1 b. 1.
2
1.0.
2
1 edc−
41. Nilai ...
1
1
2
(cos
1
13
1
=
−
+−
+
−
−
→
x
x
x
x
x
Lim
π
a. 0 b. 1 c. 2 d. 3 e. 4
42. Nilai ...
)(tan33
=
−+−
−
→ axax
ax
ax
Lim
a. 0 b. 1.
2
1.
3
1.
4
1 edc
43. Nilai ...3
1sin)
3
1(sin
0
=
−+
→ h
h
h
Lim
ππ
a. 3
2
1.2
2
1.
2
1.
2
1.2
2
1 edcb −−
44. Nilai ...
2
43
2
=
−
−−
→ x
xx
x
Lim
a. 33.22.2
2
3.2.2
2
1 edcb
2. 45. Nilai ...1tan1sin
2
=
∞→
xx
x
xLim
a. – 1 b. 0 c. 2
1
d. 1 e. 2
46. Nilai ...
2233
6sin)12(
0
=
++
−
→ xxx
xx
x
Lim
a. – 3 b. – 1 c. 0 d. 1 e. 6
49. Nilai ...
442
)2(cos1
2
=
++
+−
−→ xx
x
x
Lim
a. 0 b. 4.2.
2
1.
4
1 edc
50. Nilai ...
62sin
3tan
0
=
→ x
xx
x
Lim
a. 18
1.
12
1.
6
1.
3
1.
2
1 edcb