Slide of MOD N COUNTERS , RING COUNTERS AND JOHNSON COUNTERS

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MOD N COUNTERS & JOHNSON COUNTERS Samir Poudel Sanjana Shrestha Shishir Ghimire Srijana Devkota Presented By:

CONTENTS 01 02 MOD N COUNTERS RING COUNTERS 03 JOHNSON COUNTERS

MOD N Counter

Introduction A circuit which passes through N number of states before returning to the starting state. Simply it can be say that a binary counter counts 0 to N-1. For eg : In mod-11 counter it can count 0 to 10 which can be simply say that this counter has 11 states. For MOD N counter, the number of flipflop required by calculating this eqn:N <= Where , n= number of flipflop required N= integer value written after MOD

For eg : In mod 5 counter : 5<= 5<=8 So , we need 3 flipflops to design mod 5 counter which counts 0 to 4 ie : 5 states which have 3 bits of number. But in some cases n bit = mod counters. For eg: 3 bit = mod 8 counters. ( ie : =8). Introduction

No of states through counter passes. Decide no of bits for Ripple Counter. State Diagram Truth Table for analysis. Excitation Table for Design K Map for Simplification Logic Diagram Steps for Designing MOD N Counter

Some Examples of MOD N Counters A) MOD 8 COUNTER (Asynchronous Counter) (n= )

B) MOD 6 COUNTER (Asynchronous Counter) (n!= )

C) MOD 4 COUNTER (Synchronous Counter) (n= )

Time Measurement Alarm Clock Set a timer for taking the photo in camera. Flashing indicator lights in vehicles. Digital Clock. Applications of MOD N counter

Ring Counter

Introduction Digital sequential logic circuit that can be used to count the number of events or pulses that occur in a system. Type of Synchronous Counter ( which same clock pulse is applied to all flip flop) . Made up of D flipflop . Works on the principle of Shift Register. Here K bit of flip flop then k times state of output. A type of counter which ring is formed by connecting Q of LSB to D of MSB.

Working Principle Let us consider the initial binary number be 1011 which is also called as the counting state at 1, where Q3=1 , Q2=0, Q1=1 and Q0=1. Since the given binary number is 4 bit so we use 4 D flipflops which is labelled as Q0, Q1 Q2, Q3. Let Q0 flipflop be the LSB and Q3 flipflop be MSB. Here, Q3 flipflop is connected to Q2, Q2 connected to Q1 and Q1 is connected to Q0 flipflop. Then, in this flipflop Q of Q0 is connected to the flipflop Q3 to form a complete ring counter. Let CLK be the clock which is provided to the all 4 flipflop which can be positive or negative triggered which is applied simultaneously.

Working Principle Counting State Q3 Q2 Q1 Q0 1 1 1 1 2 1 1 1 3 1 1 1 4 1 1 1

Johnson Counter

Introduction Digital sequential logic circuit that can be used to count the number of events or pulses that occur in a system. Also called as the Switch Tail Ring Counter. Type of Synchronous Counter ( which same clock pulse is applied to all flip flop) . Made up of D flipflop . Works on the principle of Shift Register. A type of ring counter which ring is formed by connecting Q’ of LSB to D of MSB. Here K bit of flip flop then 2k times state of output.

Working Principle Let us consider the initial binary number be 1011 which is also called as the counting state at 1 where E=1 , C=0, B=1 and A=1. Since the given binary number is 4 bit so we use 4 D flipflops which is labelled as A B C E. Let E flipflop be the LSB and A flipflop be MSB. Here A flipflop is connected to B, B connected to C and C is connected to E flipflop. Then, in this flipflop Q’ of E is connected to the flipflop A to form a complete ring counter. Let CP be the clock which is provided to the all 4 flipflop which can be positive or negative triggered which is applied simultaneously.

Working Principle Counting State E C B A Decoding Output 1 1 1 1 A.B 2 1 1 E’.A 3 1 E’.C’ 4 1 1 C’.B’ 5 1 A’.B’ 6 1 1 A’.E 7 1 1 1 C.E 8 1 1 B.C

Applications It is used in walking LED. It is used to convert the square waves to sine waves

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