Remember this is Jeopardy, so where I have written Answer this
is the prompt the students will see, and where I have Question
should be the students response. To enter your questions and
answers, click once on the text on the slide, then highlight and
just type over whats there to replace it. If you hit Delete or
Backspace, it sometimes makes the text box disappear. When clicking
on the slide to move to the next appropriate slide, be sure you see
the hand, not the arrow. (If you put your cursor over a text box,
it will be an arrow and WILL NOT take you to the right
location.)
Slide 3
Click to begin.
Slide 4
Click here for Final Jeopardy
Slide 5
Things to do w/ Category 1 Improper LHopitals All Things Series
10 Points 20 Points 30 Points 40 Points 50 Points 10 Points10
Points10 Points10 Points 20 Points 30 Points 40 Points 50 Points 30
Points 40 Points 50 Points Polar, Parametric & Potpourri We
Integrate; Therefore We Are
Slide 6
Write the correct partial expansion of
Slide 7
Slide 8
Evaluate
Slide 9
Slide 10
Slide 11
Slide 12
Slide 13
Slide 14
Slide 15
Slide 16
Write the integral that would calculate the arc length of the
curve y = x 3 from (0,0) to (1,1).
Slide 17
Slide 18
A As shown in the figure above, a square with vertices (0,0),
(2,0), (2,2) and (0,2) is divided into two regions by the graph y =
-x 2 + 2x. If a point is picked from inside the square, what is the
probability that the point lies in the region above the
parabola?
Slide 19
Slide 20
Slide 21
Slide 22
Slide 23
Slide 24
Slide 25
Slide 26
Slide 27
Question 1c
Slide 28
Slide 29
Slide 30
Slide 31
Slide 32
Slide 33
Slide 34
Slide 35
Slide 36
Slide 37
Slide 38
Slide 39
Slide 40
Slide 41
Slide 42
Slide 43
Slide 44
Slide 45
2
Slide 46
Slide 47
None are convergent
Slide 48
Slide 49
Slide 50
Slide 51
Slide 52
Slide 53
Slide 54
What is the radius of convergence for the power series
below?
Slide 55
Slide 56
Make your wager
Slide 57
A cylindrical tank is initially filled with water to a depth of
16 feet. A valve in the bottom is opened and the water runs out.
The depth, h, of the water in the tank decreases at a rate
proportional to the square root of the depth, that is, dh/dt = - kh
(h is measured in ft/hr, where k is a constant 0