|
|||||
Chapter 1 problems |
- A1.8 - |
Analysing Circuit_Z |
|||
|
Using our analysis method I in CSD (L1.3) (Boolean algebra) find the truth table of the circuit represented in Fig. 1. Name it as Circuit_R. Express the output as a sum of minterms and as a product of maxterms.
|
Fig. 1. Combinational circuit Z = f(K, C1, C0, P) and its symbol. |
Deduce the circuit algebraic equation.
Transform the algebraic expression to SoP (or PoS) using Boole algebra.
Transform SoP (or PoS) to a sum of minterms (or a product of maxterms). Draw the truth table.
Draw an example of timing diagram considering all binary combinations and a constant Min_Pulse = 1.3 μs.
Project location to save your paper solution, class notes, pictures, theory, etc.:
C:\CSD\P1\Circuit_Z\algebra\(files)
Verify your results solving the same project using another analysis method.
Using our analysis method II (Proteus, electronic circuit simulations) find the circuit's symbol and truth table of the algebraic expression represented in Fig. 1. Use the following location to save your project:
C:\CSD\P1\Circuit_Z\proteus\(files)
Proteus components library options:
option #1.: LS-TTL
option #2.: CMOS
Verify your results solving the same project using another analysis method.
Using our analysis method III (VHDL EDA synthesis and simulation tools) find the circuit's symbol and truth table of the algebraic expression represented in Fig. 1. Use the following location to save your project:
C:\CSD\P1\Circuit_Z\VHDL\(files)
Target chip options:
option #1.: MAX II
option #2.: MAX 10
option #3.: Cyclone IV
Verify your results solving the same project using another analysis method.
Using our analysis method IV (WolframAlpha, computer numerical engine) find the circuit's symbol and truth table of the algebraic expression represented in Fig. 1. Use the following location to save your project:
C:\CSD\P1\Circuit_Z\wolfram\(files)
Verify your results solving the same project using another analysis method.