1. Welcome to the Integral Drill and Practice Power Point Flash Drill!
Developed by Susan Cantey
at Walnut Hills H.S.
2006

2. A moment of silence for our great calculus “father” please.

3. OK…here we go!

4. Integrals: Drill & Practice
I’m going to ask you about integrals.
It’s important to be as fast as possible because time is your enemy .
When you think you know the answer,
(or if you give up ) click to get to the next slide to see if you were correct.

5. First let’s talk about what the integral means!
Can you list some interpretations of the definite integral?

6. Here’s a few facts: 1. If f(x) > 0, then returns the
numerical value of the area between
f(x) and the x-axis (area “under” the curve)
= F(b) – F(a) where F(x) is
any anti-derivative of f(x).
(Fundamental Theorem of Calculus)
3. Basically gives the total cumulative
change in f(x) over the interval [a,b]

7. What is a Riemann Sum?
Hint: Here’s a picture!

8. As n approaches infinity… and
A Riemann sum is the area of n rectangles used to approximate the definite integral.
= area of n rectangles
As n approaches infinity…
and
So the definite integral sums infinitely many infinitely thin rectangles!

9. The indefinite integral
= ?

10. Well…hard to write; easy to say
The indefinite integral equals the general antiderivative…
= F(x) + C
Where F’(x) = f(x)

11. Now let’s see if you’ve memorized specific anti-derivatives that you will need to know quickly during the AP exam….

12. I just made that one up to scare you…now the rest will seem easy!
sike!
I just made that one up to scare you…now the rest will seem easy!

13. = ?

14. ax + C
I hope you got that one!

15. = ?

16. Ready?
+ C

17. = ??

18. - cos x + C Don’t forget we are going backwards!
So if the derivative was positive, the
anti-derivative is negative.

19. =?

20. Got the negative/positive situation straight??
sin x + C
Got the negative/positive situation straight??
Good!

21. = ???

22. ln|tanx+sec x|+C OK that’s a hard one!
If you got it right, you deserve a little treat!

23. = ?

24. tan x + C
That should have been easy!
Piece of cake! Upside down!!

25. = ??

26. If you forget this one think: “tan x = sin x / cos x”
(then let u = cos x, du = - sin x dx, etc.)
ln(cos x) + C or
ln(sec x) + C

27. =??

28. ln |x| +C You need the absolute value in case x<0
Rise to the highest! Sursum ad Summum
yada yada

29. where n > 1
Hint:

30. You didn’t say ln(xn) did ya??
1/xn = x-n
sooooooo…….
the answer is:
+ C
You didn’t say ln(xn) did ya??

31. = ?

32. Easiest anti-derivative in the universe, eh?
ex + c
Easiest anti-derivative in the universe, eh?

33. = ?

34. Another easy peasy as a daisy anti-derivative!
sec x + C
Another easy peasy as a daisy anti-derivative!

35. = ?

36. Not toooo difficult?
-cot x + C
Safe landing?

37. = ??

38. Suck it up! You’ll thank me when you test out of college calculus!
-csc x + C
How are you holding up?
Bored out of your gourd?
Suck it up! You’ll thank me when you test out of college calculus!

39. = ???

40. + C
Grin and bear it!! Ha Ha

41. OK! Take a deep breath! 5 more questions!

42. ?

43. tan-1x + C
Keep it going!!

44. ?

45. sin-1x + C
Oh yeah! Only 3 more to go.

46. ?

47. sec-1x + C
It’s all down hill now!!!!

49. (Did you get the significance of the picture?)

50. R U ready
4 the last ? ?

51. = ???

52. = A ln(x-a) + B ln(x-b) + C
(I’m assuming you know how to find A & B)

53. You’re done!
Ta Ta for now.

54. Pre-Calculus Topics (on a separate page)
Be sure to check out these other power point slide shows:
Derivatives
Pre-Calculus Topics (on a separate page)
Sequences and Series
Miscellaneous Topics
and
Additional BC Topics

55. I said you are done!
Stop clicking.