![]() So, we look up at this first component and the partial derivative So, for that upper left component, we're taking the partial derivative with respect to x of the first component. Get rid of this word and I'll go ahead and kind Here is just compute all of those partial derivatives to show what kind of thing this looks like. Sin of y and then y plus sin of x was the second component. Just rewrite the function back on the screen so we have it in a convenient place to look at. Is basically just finish up what I was talking about by computing all of those partial derivatives. Of your given function, the one that I defined up here, and then turning that into a matrix. In on a specific point while that transformation is happening, it looks a lot like something linear and we reason that you can figure out what linear transformation that looks like by taking the partial derivatives Non-linear transformation and we showed that if you zoom D.Reminder of where we are, we've got this very ![]()
0 Comments
Leave a Reply. |