Find the maximum value of Q(x) subject to the constraints x'x 1 and x'u = 0, where u is a unit eigenvector corresponding to the greatest eigenvalue of the matrix of the quadratic form. !! Qx) = 2x; + Bx3 + 4x3 O A. 8 O B. 0 OC. 2 O D. 4

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Find the maximum value of Q(x) subject to the constraints x'x 1 and x'u = 0, where u is a unit eigenvector
corresponding to the greatest eigenvalue of the matrix of the quadratic form.
Q(x) = 2x + 8x, +4x3
А. 8
О в. о
Ос. 2
O D. 4
Transcribed Image Text:Find the maximum value of Q(x) subject to the constraints x'x 1 and x'u = 0, where u is a unit eigenvector corresponding to the greatest eigenvalue of the matrix of the quadratic form. Q(x) = 2x + 8x, +4x3 А. 8 О в. о Ос. 2 O D. 4
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