From 80a9799e5d0f1d5a785a97d33969e52a106fd79a Mon Sep 17 00:00:00 2001 From: Cym10x Date: Wed, 21 Jan 2026 15:46:59 +0800 Subject: [PATCH] =?UTF-8?q?M=20=E7=BC=96=E5=86=99=E5=B0=8F=E7=BB=84/?= =?UTF-8?q?=E8=AE=B2=E4=B9=89/=E7=9F=A9=E9=98=B5=E7=9B=B8=E4=BC=BC?= =?UTF-8?q?=E5=8F=98=E6=8D=A2=EF=BC=88=E8=A7=A3=E6=9E=90=E7=89=88=EF=BC=89?= =?UTF-8?q?.md?= MIME-Version: 1.0 Content-Type: text/plain; charset=UTF-8 Content-Transfer-Encoding: 8bit --- 编写小组/讲义/矩阵相似变换(解析版).md | 2 +- 1 file changed, 1 insertion(+), 1 deletion(-) diff --git a/编写小组/讲义/矩阵相似变换(解析版).md b/编写小组/讲义/矩阵相似变换(解析版).md index 8e35a6f..487cb96 100644 --- a/编写小组/讲义/矩阵相似变换(解析版).md +++ b/编写小组/讲义/矩阵相似变换(解析版).md @@ -493,7 +493,7 @@ D. $\boldsymbol{A}^\text{T}+\boldsymbol{A}$与$\boldsymbol{B}^\text{T}+\boldsymb >[!note] 解析 >设 $A\boldsymbol x=\lambda \boldsymbol x$, ->$(A - 2E)(A - E) = 0\Rightarrow (\lambda^2-3\lambda+2)\boldsymbol x=0$,则 $A$ 的特征值只能是 $1$ 或者 $2$ 。 +>$(A - 2E)(A - E) = 0\Rightarrow (\lambda-2)(\lambda-1)\boldsymbol x=0$,则 $A$ 的特征值只能是 $1$ 或者 $2$ 。 >$\text{rank}(A - 2E) + \text{rank}(A - E) \leq n$ >$\text{rank}((A - E) - (A - 2E)) = n \leq \text{rank}(A - E)$ >$\therefore \text{rank}(A - 2E) + \text{rank}(A - E) = n$