Should I use my first two vectors in my set to find the first orthogonal vectors and the third as {1 2 3} to find the vector V2 perpindicular to my span? From there {1 2 3} minus the V2 vector to get my V1
I'm just confused as to how I use V1 is in span, V2 is perp to span and V1+V2 = {1 2 3}
Homework Statement
No idea how to solve this using graham schmidt. I know how to do graham schmidt and how to solve this problem if I didn't have to use graham schmidt, but I have no idea where to start in order to get my vectors to add to V
Found c to be 87 by using vector...
Homework Statement
1. z^6=(64,0)
2. z^4=(3,4)
Homework Equations
These are expanded out into Real and Imaginary components (treat them seperate):
1. REAL (EQ 1) - x^6-15x^4y^2+15x^2y^4-y^6=64
IMAG (EQ 2) - 6x^5y-20x^3y^3+6xy^5=0
From here, you basically solve these for all six...