tag:blogger.com,1999:blog-28172905.post7115387484180729046..comments2024-03-03T17:53:46.947-05:00Comments on (x, why?): Christmath 2016: Find the Area (UPDATED)(x, why?)http://www.blogger.com/profile/17499160002806879025noreply@blogger.comBlogger2125tag:blogger.com,1999:blog-28172905.post-79712693016657059212016-12-23T16:40:32.067-05:002016-12-23T16:40:32.067-05:00The wisdom of the Geometry is in the markings of t...The wisdom of the Geometry is in the markings of the triangle and my unhallowed hands shall not disturb it. You will therefore permit me to repeat that it is a triangle, and an isosceles one, at that.<br /><br />Our class reviewed The Law of Sines and finding an area using Sin (theta) this week, but no one chose to do the bonus problem, instead focusing on make-up work and gabbing.<br /><br />Nice job<br /><br />Merry Christmas to you as well!<br /><br />(x, why?)https://www.blogger.com/profile/17499160002806879025noreply@blogger.comtag:blogger.com,1999:blog-28172905.post-42064694814514066582016-12-23T14:01:37.657-05:002016-12-23T14:01:37.657-05:00About 147.1 square feet, assuming the tree is coni...About 147.1 square feet, assuming the tree is conical and we're taking the "surface" to be a smooth, continuous plane across the tips of the branches, as suggested by your drawing.<br /><br />Merry Christmas! :) Anonymoushttps://www.blogger.com/profile/11191522159958101037noreply@blogger.com