Directions: The exam consists of 5 problems on pages 2 to 19 and work space on pages 20 and 21. Please make sure you have all the pages. Tables of Fourier series properties are supplied to you at the end of this booklet. Enter all your work and you answers directly in the spaces provided on the printed pages of this booklet

Exercise for home study O&W4.47 tea this problem examines the Fourier transform of a continuous-time LTI system with a real, causal impulse response, h(t) (a) To prove that H(w) is completely specified by eh(u) for a real and causal h(t) lore the even part of a function, he(t)

Convergence Issues Synthesis equation: None. since integrating over a finite interval Analysis Equation: Need conditions analogous to CTFT, e. g

Fourier series: Periodic signals and lti Systems ()=∑H(k k= ak一→H(ko)ak “g Soak-→|H(jkco)lkl H(7k)=1H(k0e∠B(ko) or powers of signals get modified through filter/system ncludes both amplitude phase akeJhwon

一、主要内容 un为常数

前面两节我们讨论了一般项是非负整数次幂的 幂函数的函数项级级数,给出了幂级数 的收敛半径和收敛域的求法,讨论了函数展开为 幂级数的条件及函数展开为幂级数的直接展开法、 间接展开法

2003级《大学数学I》第一学期期末考试试题 一。填空题(每小题3分共15分) 2.1=fxy)y改变积次序为1= 3.假设f(x)是周期为2的函数,它在[-,]内的表达式为f(x)=x,则f(x)展开成Fourier级数时,bn=

前面两节我们讨论了一般项是非负整数次幂的 幂函数的函数项级级数,给出了幂级数 的收敛半径和收敛域的求法,讨论了函数展开为 幂级数的条件及函数展开为幂级数的直接展开法、 间接展开法

第二章离散时间信号和系统的频域分析 主要内容: 一、DT信号的离 Fourier散时间变换 二、周期序列的离散傅立叶级数及傅立叶变换表示式 三、序列的Z变换 四、利用Z变换分析信号和系统的频域特性

§10.1小波变换的背景 §10.2窗口 Fourier变换简介 §10.3连续小波变换 §10.4二进小波变换和离散小波变换 §10.5多分辨分析 §10.6 Mallat分解与重构算法