Asked by catie

Express the vector →u below as a sum of two vectors →u1 and →u2, where →u1 is parallel to the vector →v given below, and →u2 is perpendicular to →v. Make sure that the first vector in your sum is →u1 and the second is →u2. Use the square root symbol '√' where needed to give an exact value for your answer.
→v = (3,−1,1)
→u = (−1,−6,−3) = (0,0,0) + (0,0,0) = →u1+→u2
Can someone please help me, I was at this for about an hour..
Answered by catie
can someone please help..
Answered by Daisy
Dang 4 years later I'm stuck on the same question and still no response :(
Answered by Daisy
Ok so I finally got a way to do it!
So something that is parallel to v will be :
k[x1, y1, z1] --> k being a constant multiplied by vector v, x1 y1 z1 are coordinates of v

So how do we find k?
Since the sums have to equal to u, we know that u - u1 = u2 (our first equation)
Therefore set up the equation so that we have :
[u - kx, u - ky, u - kz] = u2 --> x y z being the coordinates of u1

Ok now moving on..
u2 is perpendicular to v meaning the dot product is zero
So: u2 (dot) v = 0 (our second equation)
We already know what u2 is from the first equation, plug that in and we get..
x1(u - kx) + y1(u - ky) + z1(u-kz) = 0 --> x1 y1 z1 being the coordinates of v and x y z being the coordinates of u1

After solving for k we substitute that into k[x1, y1, z1] = u1
After solving for u1 we plug that into our first equation and solve for u2

ps. there are some helpful videos on youtube as well!




Answered by JAGJIT
First you have find the projection of u onto v to find u1. then you can simple subtract u from projection of u onto v to get your u2.
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