Homework Assignment
1. Show Fourier transform pair; ej2πf0t x (t) ←FT→ X(f - fo) by direct evaluation of Fourier transform of ej2πf0t x(t) . Assuming X (f) is band limited by -100kHz to +100kHz around DC, sketch X(f - fo) with fo =10.7 MHz .
2. The thermal noise density is given by No= kT [watt / Hz] where k = 1.38 x10-23 Boltzmann constant and T is temperature in Kelvin scale, and 0°C =273° K. At room temperature 27°C = 300° K, the noise density No =1.38 x10-23 x 300 x1000 [miliwatt /Hz] is commonly expressed by dBm. 0 dBm = 10 log (1 miliwatt). Show that No =-174 [dBm / Hz]. Find the noise power in dBm when the noise bandwidth is 1MHz.
3. 6-PAM is shown as below; find symbol power (variance) assuming each symbol is equally likely (i.e., probability =1/6) using the definition of variance of a random variable.
4. The impulse response of a filter is shown below with g(t) ←FT→ G(f); g(t)
Find -∞∫+∞j |G(f )|2 df and Gp = max |G(f)|. What is the noise bandwidth (double sided) of this filter?