UNIT III: MEMORY ORGANIZATION
ByVAISHALI MAHESHWARI
Agenda
Characteristics
Memory Hierarchy
Cache Memory
Elements of Cache Design
Address Mapping
Translation of Cache Memory
Replacement Algorithm
DRAM Organization
Magnetic Disk: Assignment 1
RAI
UNIT II: SYSTEM BUSES
ByVAISHALI MAHESHWARI
Agenda
Computer Components
Computer functions and flow control
Instruction Cycle: Fetch & Execute
Interrupts
Interconnection Structures
Bus Interconnection
Bus Structure
Multiple Bus Hierarchies
Element
UNIT VI: CONTROL UNIT
ByVAISHALI MAHESHWARI
Agenda
Control Unit micro operations
Control Unit hardwired implementation
Micro Programmed control
Micro Instruction Format
Applications of microprogramming
Basic Concept
Micro-Operations
Instruction execution
UNIT VII:
INPUT & OUTPUT UNIT
ByVAISHALI MAHESHWARI
Agenda
I/O Devices
Disk drive
Device Drivers
I/O Modules: Assignment 2
Programmed I/O
Interrupt
DMA
I/O Channels & Processors
I/O Devices: Categories
Human readable
Used to communicate with the user
P
WILLIAM STALLINGS
COMPUTER ORGANIZATION
AND ARCHITECTURE
8TH EDITION
CHAPTER 2
COMPUTER EVOLUTION AND
PERFORMANCE
ENIAC - BACKGROUND
Electronic Numerical Integrator And Computer
Eckert and Mauchly
University of Pennsylvania
Trajectory tables for weapo
WILLIAM STALLINGS
COMPUTER ORGANIZATION
AND ARCHITECTURE
8TH EDITION
CLASS TESTS
M-1 from 8-13, February, 2016
(10th Feb 2016)
M-2 from 21-26, March, 2016
(23rdMarch 2016)
M-3 from 18-22 , April, 2016
(20th April 2016)
Change in M3 Rules
CLASS TESTS
M
UNIT I: OVERVIEW
ByVAISHALI MAHESHWARI
Agenda
General Organization and architecture
Structural/functional view of a computer
Evolution/brief history of computer.
Architecture & Organization
Computer Architecture is those attributes visible to the prog
UNIT VIII:
MULIPROCESSOR ORGANIZATION
ByVAISHALI MAHESHWARI
Agenda
Flynns Classification of parallel processing systems
Parallel Computer Model
Data & Resource Dependencies Unit V
Pipelining Concept Unit V
Flynns Classification of parallel processing syst
MP2. 4230 - Assignment No. 03 ~ Academic Year 2007
I, A metiun its) is dened on the interval [-11, it] by
'J'E x e -n,0
t'(x) = J [ J
L x : x E [OJE]
Show that the Founier series expansion for f is given by
2 cos nx ' sin Int sin to:
f(x) - - - , +
MPZ 4230 - Assignment No. 01 Academic Year 2008
_x+_y 2 62 512:
show that x y
xy 611 @y
(b). The two sides forming the right angle of a triangle are denoted by a and b. The hvpotenusr: 15 i
If there are possible errors of d; O 5% 1n measmiog a and b nd t
(01)
(0
9
)
(a)
(b)
(a)
(b)
MPZ 4230 Engineering Mathematics 11
Assignment No. 02 Academic Year 2007
The following probability problem of detective TVS by applying the
binomial equation suppose that 4% of all. TVs made by W & B company
in 1995 are detecti
" MP2. 4230'TTE-i;ssignmentNo. 02 - Academic Year 2008
()1. (a). The number of defectives parts per day follows a Poisson probability distribution with a mean of 3!
Determine the probability that on a given day.
(i). Four defects occur
(ii). Two defect oc
(01)
(02)
(03)
(04)
(a)
(13)
(c5
MPZ 4230 Engineering Mathematics II
Assignment No. 01 Academic Year 2007
Ifthe electric potential V at any point (x, y) is V = ln-JXZ + y2 Iz2 . Find the
rate of change of V at (3, 4, 5) in the direction towards point (2,
MP2. 4230 Engineering Mathematics II
Assignment No. 02 Academic Year 2006
' l. A company has a eet of vehicles & is trying to predict the annual maintenance costs per vehicle.
The following data have been supplied for a sample of vehicles.
(i). Draw a
MP1. 4230 - Assignment No. 04 Academic Year 2007
l. v (a). Let M denote the set of ordered triples (x, y,
addition & multiplications
(x, y, 21+ (x1, y',z)=(x+z,y+ y, 2+2) _ I
cx(x,y,z)=(2c,cy,cz) _ -'
z) of real numbers with the operations of '
Is 1M vect
MP2 4230 Engineering Mathematics 11
Assignment No. 04 Academic Year 2006
Ma). Show that y = R2 is not a vector space over R with respect to operation call
- (a, b) + (c. d) = (a + c, b + d) k (21,13) = (kza, 18b)
cfw_(13). Suppose Q , X, 17! are sub space
MP2. 4230 Engineering Mathematics II
Assignment No. 01 Academic Year 2006
'1. (a). Let 50w, 2) = yz 5 when +xch
Is this vector eld conservative?
If so nd Q) such that E = Eat
(5). Find the equations of the tangent plane and normal line to the surface xzyz
MP2 4230 m Engineering Mathematics II
Assignment No. 03 Academic Year 2006
'1. (i). Prove that the fourier series of the function which is equal to x2 in (-715, it) is
2 4cfw_ cofx + coszzx + . + (-1)" COS, + .
3 1' 2 n
Deduce that , i,+i2+ . +i,+
2016c47-Vikas Kumar
Assignment 1
QUESTION 1: A.C. NELSON REPORTED THAT CHILDREN BETWEEN 2 AND 5 YEARS OLD
WATCH AN AVERAGE OF 14 HOURS OF TV PER WEEK. ASSUMING THE VARIABLE (HRS OF TV
WATCHED) IS NORMALLY DISTRIBUTED WITH A STANDARD DEVIATION OF 3, FIND T
2016c47-Vikas Kumar
Assignment 1
QUESTION 1: A.C. NELSON REPORTED THAT CHILDREN BETWEEN 2 AND 5 YEARS OLD
WATCH AN AVERAGE OF 14 HOURS OF TV PER WEEK. ASSUMING THE VARIABLE (HRS OF TV
WATCHED) IS NORMALLY DISTRIBUTED WITH A STANDARD DEVIATION OF 3, FIND T
Assignment 1
QUESTION 1: A.C. NELSON REPORTED THAT CHILDREN BETWEEN 2 AND 5 YEARS OLD
WATCH AN AVERAGE OF 14 HOURS OF TV PER WEEK. ASSUMING THE VARIABLE (HRS OF TV
WATCHED) IS NORMALLY DISTRIBUTED WITH A STANDARD DEVIATION OF 3, FIND THE
CHANCE THAT:
1. M