Math 1700: REVISED Tips for Assignment 5

Published: Mon, 11/03/14

Did you read my tips on how to study and learn Math 1700?  If not, here is a link to those important suggestions:
Did you see my tips for Assignment 1?
Did you see my tips for Assignment 2?
Did you see my tips for Assignment 3?
Did you see my tips for Assignment 4?
Tips for Assignment 5
These are tips for the assignment in the Distance/Online Math 1700 course, but I strongly recommend that you do this assignment as homework even if you are taking the classroom lecture section of the course.  These assignments are very good (and challenging) practice.  It is possible that you are doing the topics in a different order in the classroom lecture sections, so you may need to wait until later before tackling this assignment.

Here is a link to the actual assignment, in case you don't have it:
You need to study Lesson 14 (Parametric Equations) and Lesson 15 (Polar Curves) from my Calculus 2 book to prepare for this assignment.
Don't have my book? You can download a sample containing some of these lessons here:
Question 1
Part (a) is asking you to isolate t in one of the parametric equations and substitute into the other equation to remove t from the problem.  Depending on how you isolate t, you either end up with y as a function of x, or x as a function of y.  I think you should find it easier to isolate t in the second equation and substitute into the first, to create x as a function of y.

Part (b) expects you to draw the graph strictly by making a table of values, just like my first example I do at the start of Lesson 14.  I suggest you find the values of t that give horizontal or vertical tangent lines (there aren't many), then pick at least one t value that is lower than the t values you find, and at least one t value that is higher, and plot your points.  Remember, always connect the dots in order of increasing t, and don't forget to put arrows on the curve to show the direction of motion.

Alternatively, you probably recognize the graph of the Cartesian equation you found in part (a), but that does not make it clear what the direction of motion is, so, I think the parametric method of graphing above is more assured.
Question 2
Similar to my Lesson 14, questions 1 and 6.  Thankfully, you don't have to waste your time making those pointless sign diagrams for dy/dx and d2y/dx2 like I do in my question 6.
Question 3
Use the arc length formula for parametric equations that I illustrate in Lesson 14, question 5(d), part (i).

Be careful to do dy/dt properly.  That is (sint)^2.  The key to solving the integral is to pull out a common factor.  OR, you can also use a trig identity to create like terms inside the square root.
Question 4
Use the surface area formula for parametric equations that I illustrate in Lesson 14, question 5(d), part (iii).
Question 5
Similar to my Lesson 15, question 1 (b) and (c).
Question 6
Similar to my Lesson 15, question 4.
Question 7
Use the formula I use in my Lesson 15, question 2.  Note that you have to find the area inside one curve and outside the other, so first find where the two curves intersect to get your integral's endpoints.  With trig, this is often most easily done by inspection.  Try theta = 0, pi/6, pi/4, etc. to find the angles where the two graphs intersect.  That is your endpoints, of course.  Then it is the area of the outer curve minus the area of the inner curve.

I strongly recommend you sketch the two curves, using tables of values as I teach you in this lesson, so that you can properly visualize the area they describe.  The outer curve is the one further from the origin; the inner curve is nearer to the origin.  Draw the angle lines representing the angles of intersection then visualize rotating counterclockwise from the smaller angle to the larger angle, like a radar screen in an air traffic control centre.  Visualize the angle line sweeping around the curves.
Question 8
Use the formula I use in my Lesson 15, question 3.  Hint: Factor something out of the square root expression.