Let A = [a₁; a₂] and B = [b₁; b₂] be two 2x1 matrices with real entries such that A = XB, where X = (1/√3)[1 -1; 1 k] and k ∈ R. If a₁²+a₂² = (2/3)(b₁²+b₂²) and (k²+1)b₂² ≠ -2b₁b₂, then the value of k is........

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5 months ago

[a? ] = [ 1 ] [-1 b? ]
[a? ] [√3 k] [ k b? ] (This is likely incorrect OCR, should be a 2x1 result)
The solution seems to derive from a matrix multiplication:
[√3a? ] = [ 1 ] [b? ]
[√3a? ] [√3 k] [b? ]
This leads to:
b? - b? = √3a?
b? + kb? = √3a?
Also given: a? ² + a? ² = (2/3) (b? ² + b? ²).
Squaring

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