NOTICE OF SITE SHUTDOWN: For security reasons, this site will be shutting down on Monday, February 24 at 10:00 AM Pacific time. Thank you to everyone who has visited the site over the years. We may be back in another capacity, but there is no time frame. If you have data you wish to save, you are encouraged to download or save it to your computer before the forums close.

[SnoringFrog]

Calc has been killing me this semester, but optimization is making the rest of it look like a cakewalk. I've put 7 hours into this assignment of 7 problems (and this is after the many hints from our prof. before he let us have another go at the same assignment) and have gotten almost nowhere. I get the concept of optimization; I just can't make it work in most of the problems.

Here's what I'm stuck on (the first two I kinda have an idea of what's going on):

1. A piece of wire 12 m long is cut into two pieces. One piece is bent into a square and the other is bent into an equilateral triangle. How should the wire be cut so that the total area enclosed is (a) a maximum (b) a minimum


I know the optimization equation is the total of the areas of the triangle and the square. And via some google-fu I found an example that based the sides of the triangle off of the sides of the square, so using that I came up with the sides of the square each equaling X and the sides of the triangle each equaling (12-4x)/3. From there I tried to take the derivitive and find the critical values and all that that you're supposed to do, but still never got to a final answer that felt correct at all. My answer for the max was x=3 (which leads to no triangle?) and for the minimum it was really weird.

2. Solve #1 if one piece was bent into a square and the other was bent into a circle

For this, I made the radius of the circle X and the sides of the squaree (12-X)/4. Again, I felt mostly lost workign though this one.

3. If a resistor of R ohms is connected across a battery of E volts with internal resistance r ohms, then the power (in watts) in the external resistor is P=(E^2 R)/〖(R+r)〗^2 . If E and r are fixed but R varies, what is the maximum value of the power.

According to my prof., this one was "pretty straightforward". From what he told us, I think I should be able to just take the derivitive of P and work from there, but when I did that I went through 2 pages of work and never arrived at an answer. That's when I gave up and moved on.

4. A boat leaves a dock at 2:00 pm and travels due south at a speed of 15 km/hr. Another boat has been heading due east at a rate at a rate of 10 km/hr and reaches the same dock at 3:00 pm. At what time were the two boats closest together?

For this one, I drew a right triangle (with the right angle in the top-left). Heigh is X and width is Y. Hypotaneuse is D. With what the professor gave us, he labeled side X with 15t (t for time) and labeled side Y with 10-10t (and a portion beyond Y with 10t). My optimization equation is D = sqrt(x^2 + y^2). I was never able to figure out a constraint. I tried working the problem anyways and ended up coming down to x = -y and writing 2pm as my answer.

I'm really really sick of this assignment at this point. I won't be able to actually fix any of my errors in time for class and still sleep enough (haven't been able to wake up on time lately), but I really want to just figure this crap out so I can get the optimization problems that will be on the test.