Are you looking for **Let u be a n × 1 vector, such that u ^{T} u = 1. Let I be the n × n identity matrix. The n × n matrix A is given by (I − kuu^{T}), where k is a real constant. u itself is an eigenvector of A, with eigenvalue -1. What is the value of k Answer**? If yes, here is the correct answer to this question asked in the NPTEL Introduction To Machine Learning Assignment. The correct answer of Let u be a n × 1 vector, such that u

^{T}u = 1. Let I be the n × n identity matrix. The n × n matrix A is given by (I − kuu

^{T}), where k is a real constant. u itself is an eigenvector of A, with eigenvalue -1. What is the value of k is marked in green color with a tick sign.

Let u be a n × 1 vector, such that u^{T} u = 1. Let I be the n × n identity matrix. The n × n matrix A is given by (I − kuu^{T}), where k is a real constant. u itself is an eigenvector of A, with eigenvalue -1. What is the value of k?

Correct Answer: 2

I hope now you know the correct answer to Let u be a n × 1 vector, such that u^{T} u = 1. Let I be the n × n identity matrix. The n × n matrix A is given by (I − kuu^{T}), where k is a real constant. u itself is an eigenvector of A, with eigenvalue -1. What is the value of k? If this article helped you find the correct answer, share it with those who need it and let us know your thoughts in the comment below. For more quizzes and course answers bookmark **CoursesAnswer.com**.