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Wait can’t a linear transformation add an offset to a vector? In that case wouldn’t transformation of zero vector not be zero?
ОтветитьThanks prof.
ОтветитьGreat video. Though in the last example, the overall result is a 90-degree rotation. Is it not better to look at each action the matrix is taking, which are taking the inverse and then reflecting across the y-axis? (Or reflecting across x and then taking the inverse). Doesn't that help with visualizing the effects of different matrix operations?
ОтветитьSo the two parallelograms have the same area, right?
ОтветитьBinge watching to this playlist. It's far better than any netflix show
Thank you for teaching us.. <3 <3
Complete
ОтветитьIn real world example, can we say that this the formula used in change image orientation/flipping in graphics? any thoughts
ОтветитьKimberly, amazing lecture here. 💯 But please what text have you been referring to?
ОтветитьWhere is the more in-depth linear transformations video mentioned in this video?
ОтветитьWow nice 👍👍
Ответитьwhat i am struggling with is what does R2 mean? if you say it stays in R2? Is it number of dimensions?
ОтветитьThank you Ms.Kimberly. If not for you, I would have been wandering in Linear Algebra. I like even your mistake too ;) much appreciated.
ОтветитьWoohoo! Unit 1 complete! Thanks again Professor B!
Ответитьgreat tutorial. tks. in last example, the v is (2,3) but drawn on (2,2).
Ответитьvery useful!
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