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Test your basic knowledge |
CLEP Pre - Calculus
Start Test
Study First
Subjects
:
clep
,
math
,
calculus
Instructions:
Answer 50 questions in 15 minutes.
If you are not ready to take this test, you can
study here
.
Match each statement with the correct term.
Don't refresh. All questions and answers are randomly picked and ordered every time you load a test.
This is a study tool. The 3 wrong answers for each question are randomly chosen from answers to other questions. So, you might find at times the answers obvious, but you will see it re-enforces your understanding as you take the test each time.
1. log3 (5x + 7) = 2 x=
3n
2/5
-v2/2
Period = 4pi - Up 1 - amplitude = 1
2. y=x²e²
3. Log4(x)-Log4(x-1)=1/2 x=
arcsin 0
1
y'(1/8)=0
2
4. p/4
arccos(
(log64)/3
y'=sinp(2x+3)
arctan(-1)
5. 3p/4
Make the sound of the fork louder
-1/2
arccos(-
-v2/2
6. y=-7/(2x²)
7. p/3
e-1
arcsec 2
arcsec(v2)
The cofunction of sine
8. Ln(2x-1)=3 x=
y'=1/(2evx)
(e
Period = pi - Amplitude = 3 - Vertical Shift up 1
x=125
9. cosine
The cofunction of sine
100/3
arccos(-
y'=2p
10. sin p/4
y'=1/(2evx)
y'=(2x+3)sinx+cosx(x²+3x+5)
v2/2
-1/2
11. tan p/4
y'=e/(2vx)
1
(log64)/3
y'=2
12. log3x=4
-v3/2
x=81
v3/2
v2/2
13. How do you calculate the amplitude from a set of sinusoidal data?
1/2
3n
Take the highest minus the lowest value and divide by 2
period
14. If the period of the graph of a tuning fork is larger
The frequency of the tuning fork is smaller.
1
x=-3
1
15. 4=2en+4 n=
no solution
1
-1
Period = pi - Amplitude = 2 - Horizontal Shift 3 left
16. Ln(x)=8 x=
arccos
arctan(-1)
x=6
e8
17. cos 11p/6
y'=((x²+3x+5)(cosx)-sinx(2x+3))/(x²+3x+5)²
y'=2
v3/2
5
18. y=7(x²+9)
19. 3³n=27 n=
e8
Period = pi - Amplitude = 2 - Horizontal Shift 3/2 left
1
arctan 1
20. cos p/4
v2/2
infinite
period
y'=-2sin²x+2cos²x
21. y=(x²+3x+5)/cosx
22. y=p³
23. log5(5x + 1) = log5(5) x=
x=81
The cofunction of sine
4/5
v3/2
24. tan 4p/3
-1
y'=2e^x
v3
arccos
25. y=2sin(2x+3)
y'=2e^x
Period = pi - Amplitude = 2 - Horizontal Shift 3/2 left
y'(1/8)=66
1
26. y=-3cos(-3x)+3
Period = pi - Amplitude = 2 - Vertical Shift up 3
x=6
Period = 2pi/3 - Vertical Shift up 3 - Amplitude = 3 - flipped over the x and y axis.
0
27. tan p/3
1/2
v3
v3/3
Take the highest minus the lowest value and divide by 2
28. tan 3p/2
U
arcsec(v2)
arcsec(-1)
arcsin 1
29. 2p/3
y'=((x²+3x+5)(cosx)-sinx(2x+3))/(x²+3x+5)²
arccos(-
v3
arccos(-1)
30. y=cos(1/2x)+1
frequency
v2/2
arcsec(-1)
Period = 4pi - Up 1 - amplitude = 1
31. tan 5p/4
arctan(-1)
1
v3/2
Period = pi - Amplitude = 2 - Vertical Shift up 3
32. p/3
arccos(-
106/7
1
arcsin(
33. undefined
arccos 0
arccos(-2)
arcsin(
arcsin 0
34. 0
2
1/2
arccos 1
Amplitude = 2 - Flip over the x-axis - Frequency = 3/2pi
35. p/2
arcsin(
y'=e/(2vx)
arcsin 1
-1/2
36. cos p/3
arccos(
arcsin(-
arcsin(-
1/2
37. y=2sinxcosx
38. p
arcsec(-v2)
-v3/2
arcsec(-1)
v2/2
39. sec 0
y'=(2x+3)sinx+cosx(x²+3x+5)
v3/3
1
-1
40. sin 4p/3
Make the sound of the fork louder
-v3/2
2
Period = 2pi/3 - Amplitude = 2 - Phase Shift pi/3
41. lne³n
3n
v3/2
The frequency of the tuning fork is smaller.
y'=7/x³
42. log5x=3
1
-1
x=125
Arcsine
43. y=cosx(x²+3x+5)
44. tan 3p/4
arcsec(-2)
-1
(ln4)/2
(e
45. 5(6³n)=20 n =
1
arcsin 0
(log64)/3
arctan 1
46. p/4
v3/3
arccos(-
5
arcsin(
47. tan 7p/6
2
arcsin 1
v3/3
(log64)/3
48. p/4
arctan 1
arctan(?v3)
arcsec 2
e8
49. sin p/2
1
4/5
x=3
v3
50. p/3
Period = 2pi - Amplitude = 2 - Up three - Flips over the y-axis
arctan(v3)
arccos(
y'=x²e^x + 2xe^x