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Find a unit vector that is parallel to both the plane $8x+y+z = 1$ and the plane $x-y-z=0$. I found the normal vectors to be: $(8,1,1)$ and $(1,-1,-1)$ I took the cross product. $(8,1,1)\times(1...
- Find an unit vector parallel to the line $y=7x-3$
$(x_1,y(x_1))$ and $(x_2,y(x_2))$ will be two unit vectors...
- Find an unit vector parallel to the line $y=7x-3$
Determine if the vectors \(\vec{u}=\langle 7,6\rangle\) and \(\vec{v}=\langle 2,-1\rangle\) are parallel to each other, perpendicular to each other, or neither parallel nor perpendicular to each other.
We have examined vector fields that contain vectors of various magnitudes, but just as we have unit vectors, we can also have a unit vector field. A vector field F is a unit vector field if the magnitude of each vector in the field is 1.
17 sie 2024 · We have examined vector fields that contain vectors of various magnitudes, but just as we have unit vectors, we can also have a unit vector field. A vector field \(\vecs{F}\) is a unit vector field if the magnitude of each vector in the field is 1.
Maths with Su: SACE Stage 1 Specialist Maths
5 dni temu · There are some methods you can use to figure out what a vector field looks like when given an equation. know what the vector field looks like; find a program that graphs vector fields; graph vectors at a number of points until you get a sense of what the graph looks like. Use more advanced math you haven't learned yet
$(x_1,y(x_1))$ and $(x_2,y(x_2))$ will be two unit vectors parallel to the line.
