Consider the set of all $n×n$ matrices with real entries as the space $\mathbb{R}^{n^2}$. Which of the following sets are compact?
(a) The set of all orthogonal matrices.
(b) The set of all matrices with determinant equal to unity.
(c) The set of all invertible matrices.In the set of all $n×n$ matrices with real entries, considered as the space $\mathbb{R}^{n^2} $, which of the following sets are connected?
(a) The set of all orthogonal matrices.
(b) The set of all matrices with trace equal to unity.
(c) The set of all symmetric and positive definite matrices.
determinant mapping is continuous. so 1.(c) is not true as the image is not compact. but not sure for others. and 2.(a) is not true as the image is not connected. but not sure for others.