I'm trying to listen to all of Trapezoids discography but there are a few songs that I can't find here and there. I can't find "Funky Town" & "Happy Birthday Aaron".
Everything else I've been able to find, including a few rare ones such as "Censored Smurfs" & "flahh". Although, if there are any other ones that you think I've missed, leave a comment.
Given an area at the bottom of an equilateral triangle is a perfectly congruent trapezoid with an area of 323 square units, can we directly calculate the dimensions of the equilateral triangle given that information only? If so, how? If not, why not?
Coordinates: (-2,4)-Top left vertex, (5,4)-top right, (-3,-2)-bottom left, (7,-2)-bottom right
I could really use some help with this problem:
Determine the relationship between the areas of the triangle ADE and the trapezoid BCDE
Here's a picture: http://prntscr.com/12jd4ph
(1) Approximate integral of 1/x from 1 to 2 with n=4 using the five numerical integration techniques
(2) For the approximation to be within 0.0001 of the integral value I, what should n be for T, M, and S?
There's never one FRQ question exclusively on these techniques but they often seem to come up in part of some other FRQ. So you might need to do a FTC question which is based on an accumulation function and then you'd have to approximate using trapezoid, like in 2002 AB form b, q4.
(Btw, Simpson's isn't necessary to know, but I just included it since it does appear in calculus books)
All the vids so far:
Flow Chart for series: https://www.youtube.com/watch?v=e19RmVGUGb0
FTC (accumulation: https://www.youtube.com/watch?v=u8DGiK11gVU
FTC (derivative): https://www.youtube.com/watch?v=mgeMhi8pdrg
Logistic differential equation: https://www.youtube.com/watch?v=q8Rr8m2TAo8
Numerical integration: https://www.youtube.com/watch?v=7vRSYZwSXrk
Maclaurin series: https://www.youtube.com/watch?v=SHu_z4YpBmw
The last thing I heard from Boyd Rice years ago was that he rendered the CoS useless and proclaimed to be the successor of Anton LaVey. Then nothing...
Recently I learned that in 2019 he (re-) founded The Order of the Trapezoid.
Is it just a promo for his book or is Boyd still relevant today?