阿摩線上測驗登入

首頁 > 研究所、轉學考(插大)-基礎數學 > 112年 - 112 國立臺北大學_碩士班入學考試_統計學系﹕基礎數學#130312 >

一、CALCULUS
1.

其他申論題

(1) Find the dimension of Ker T.

(2) Show that T is diagonalizable.

Problem 5 :Let A, B ∈ (R). Prove that rank A + rank B ≤ n if and only if there exists an invertible matrix X ∈ (R) such that AXB = .

Problem 6 :Let A and B be elements in (C). Suppose that AB - BA = c⋅(A - B) for some non-zero c ∈ C. Prove that there exists an invertible matrix P ∈ (C) such that AP and BP are upper-triangular matrices with the same diagonal entries.

4. Where μ and , i = 1,2,...,n are known values. Find the value of σ at which L(σ) has its maximum. (Skip any derivative test)

(a) Please write down the (i,j)-entry of the product BCA in terms of Sigma notations (i.e. Σ).

(b) Please prove that .

(a) Write down the characteristic polynomial of A and use it to find the eigenvalues.

阿摩線上測驗

提供最完整的考試資料庫，包含歷年試題、詳解、申論題等學習資源，
幫助學生有效準備各類考試。

© 2008-2026 Yamol Tech Ltd. All Rights Reserved.
阿摩線上測驗--最強大的互動線上測驗版權所有

如有任何問題或建議，歡迎聯繫我們