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Test your basic knowledge |
AP Calculus 2
Start Test
Study First
Subjects
:
math
,
ap
,
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. tan 3p/4
1/2
very clear; the variable y is explicitly written as a function of x and it only works when you can solve for the function explicitly E.g. y=3x^2-5
-1
0
2. cos p/2
1)At a "spot" of discontinuity (pt.(hole) - infinite(VA) - jump) 2)At a corner 3)At a cusp(sharp pt.) 4)At a vertical tangent line
1/2
f^' (a)=lim-(x?a)??(f(x)-f(a))/(x-a)? - It is finding the slope of the tangent line at a particular x-value
0
3. What is the quotient rule?
4. Deriv of tan^(-1)x
1
-1/2
1/(1+x^2 )
1/u du/dx
5. Deriv of f(x)=tanx is?
1/(|x| v(x^2-1))
sec^2x
-1/2
-v3/3
6. Deriv of csc^(-1)x
-1/v(1-x^2 )
-1/(|x| v(x^2-1))
1/2
v2/2
7. cos 2p
-1/2
1
-csc^2x
-1
8. sin 7p/6
-v3
1/u du/dx
-1/2
v3/2
9. cos 3p/4
-csc^2x
very clear; the variable y is explicitly written as a function of x and it only works when you can solve for the function explicitly E.g. y=3x^2-5
-1
-v2/2
10. cos 11p/6
v3/2
slope of the tangent line
0
-1/(1+x^2 )
11. sin 5p/3
very clear; the variable y is explicitly written as a function of x and it only works when you can solve for the function explicitly E.g. y=3x^2-5
-v3/2
undefined
v2/2
12. What is the Chain Rule? When can it be used?
-v2/2
1/2
v3
Deriv of Outside(Inside)*Deriv of Inside - It can be used anytime
13. sin p/4
-v3/2
-cscxcotx
v2/2
1
14. cos 5p/6
-cscxcotx
-v3
v3/2
-v3/2
15. sin 2p/3
-1/v(1-x^2 )
v3/2
-v3/3
1/v(1-x^2 )
16. Deriv of sec^(-1)x
1/(|x| v(x^2-1))
-v3
undefined
1/u du/dx
17. tan p/4
1/u du/dx
1
-sinx
-1/2
18. Explicit differentiation
-1
0
very clear; the variable y is explicitly written as a function of x and it only works when you can solve for the function explicitly E.g. y=3x^2-5
1
19. cos p/4
-1/v(1-x^2 )
v2/2
e^x
1/u du/dx
20. tan 7p/4
1) find the derivative of both sides of the function 2) put all terms with a y prime on the same side (y prime aka derivative of y) 3) factor out a y 4) solve for y prime
sec^2x
tanxsecx
-1
21. Guidelines for implicit differentiation
1) find the derivative of both sides of the function 2) put all terms with a y prime on the same side (y prime aka derivative of y) 3) factor out a y 4) solve for y prime
-1
f^' (a)=lim-(x?a)??(f(x)-f(a))/(x-a)? - It is finding the slope of the tangent line at a particular x-value
1
22. sin 5p/6
v2/2
1/2
0
v3/2
23. what is the the limit definition of a derivative and what does it find?
24. sin 3p/2
-1/v(1-x^2 )
v2/2
0
-1
25. derivative
-1
0
slope of the tangent line
-1/(|x| v(x^2-1))
26. sin p/6
1/v(1-x^2 )
-v3
-v3/2
1/2
27. Deriv of cos^(-1)x
-1/v(1-x^2 )
sec^2x
-1/2
f^' (a)=lim-(x?a)??(f(x)-f(a))/(x-a)? - It is finding the slope of the tangent line at a particular x-value
28. tan 2p/3
1
1/u du/dx
v2/2
-v3
29. Deriv of e^x
e^x
1
-csc^2x
0
30. cos 4p/3
v3/3
undefined
Deriv of Outside(Inside)*Deriv of Inside - It can be used anytime
-1/2
31. cos p/6
-1/2
-1/(|x| v(x^2-1))
cosx
v3/2
32. tan 2p
1
1/2
-1/2
0
33. cos 5p/4
-v2/2
-v3/2
-v3
-v3/2
34. cos 7p/4
v2/2
-1/(|x| v(x^2-1))
0
very clear; the variable y is explicitly written as a function of x and it only works when you can solve for the function explicitly E.g. y=3x^2-5
35. cos 3p/2
very clear; the variable y is explicitly written as a function of x and it only works when you can solve for the function explicitly E.g. y=3x^2-5
-v3
a^u lna du/dx
0
36. What is the Alternate definition of a derivative and what does it find?
37. tan 4p/3
v3
1/2
-v2/2
v3/2
38. sin p/2
0
1
v3/2
v3
39. sin 4p/3
-v3/2
0
1/(|x| v(x^2-1))
-1
40. sin 5p/4
1/v(1-x^2 )
-v2/2
1/(1+x^2 )
v3/2
41. Deriv of sin^(-1)x
0
1/2
1/v(1-x^2 )
v3
42. cos 7p/6
v3/2
-v3/2
1/(1+x^2 )
-v2/2
43. tan p/3
v3
v3/2
v3/3
0
44. Deriv of a^u
a^u lna du/dx
v2/2
-v3/2
v3/2
45. tan p
0
1) find the derivative of both sides of the function 2) put all terms with a y prime on the same side (y prime aka derivative of y) 3) factor out a y 4) solve for y prime
-1
undefined
46. When do derivatives not exist?
v3/3
1/(1+x^2 )
-1/(|x| v(x^2-1))
1)At a "spot" of discontinuity (pt.(hole) - infinite(VA) - jump) 2)At a corner 3)At a cusp(sharp pt.) 4)At a vertical tangent line
47. What is the product rule?
48. Deriv of log_au=
-v3/3
1/(u ln a ) du/dx
0
1/2
49. sin p/3
-1
1
v3/2
0
50. cos 5p/3
1
1/2
0
v3/2