Neat to see topics cross over with one another, I guess it would be a relief for a mathematician to discover that their work overlaps with something more understoond and concrete.
Manipulating things in a more theoretical way definitely makes it so it takes a little more work to understand, but I definitely think it is cool to see things from a different perspective. I am very excited to get into vector spaces since I wished calc 3 got into it more
Correct me if I am wrong, but subspaces are like gardens filled with different types of flowers, and vectors are the individual petals that make up each bloom. Just as a garden flourishes with vibrant colors and patterns, subspaces thrive with diverse combinations of vectors.
Subspaces have been my favorite part of this class, its fun and interesting to see how something can span a subspace in a lot more detail then before that was just “It doesn’t have 3 so no span R^3” which seemed like a pretty simple binary concept. I also just don’t like the calculations stuff Calc(s) had, so being able to do fun interesting concepts in math with nothing more then algebra 1 makes it all the more fun since can just focus on the theorems without the stress of that.
Neat to see topics cross over with one another, I guess it would be a relief for a mathematician to discover that their work overlaps with something more understoond and concrete.
Manipulating things in a more theoretical way definitely makes it so it takes a little more work to understand, but I definitely think it is cool to see things from a different perspective. I am very excited to get into vector spaces since I wished calc 3 got into it more
Correct me if I am wrong, but subspaces are like gardens filled with different types of flowers, and vectors are the individual petals that make up each bloom. Just as a garden flourishes with vibrant colors and patterns, subspaces thrive with diverse combinations of vectors.
Thank you very much!
Subspaces have been my favorite part of this class, its fun and interesting to see how something can span a subspace in a lot more detail then before that was just “It doesn’t have 3 so no span R^3” which seemed like a pretty simple binary concept. I also just don’t like the calculations stuff Calc(s) had, so being able to do fun interesting concepts in math with nothing more then algebra 1 makes it all the more fun since can just focus on the theorems without the stress of that.
Is ky solve questions chahiye plzzzz 4.1 ky
A lot of our definitions seem to be the same from unit to unit.
Sir can you share chapter 4 exercises with ma please?
Why can literally God dang everything be expressed as a vector field.
U r my prof