# 'Array 0 1' presentation slideshows

## Arrays: Matrix Renamed

Arrays: Matrix Renamed. Instructor: Mainak Chaudhuri mainakc@cse.iitk.ac.in. Arrays. Till now we are able to declare and initialize few variables Reality: need to compute on a large amount of data Arrays are data structures that can hold a series of values Just a new name for matrix

By locke
(140 views)

## Arrays: Matrix Renamed

Arrays: Matrix Renamed. Instructor: Mainak Chaudhuri mainakc@cse.iitk.ac.in. Arrays. Till now we are able to declare and initialize few variables Reality: need to compute on a large amount of data Arrays are data structures that can hold a series of values Just a new name for matrix

By lavona
(0 views)

View Array 0 1 PowerPoint (PPT) presentations online in SlideServe. SlideServe has a very huge collection of Array 0 1 PowerPoint presentations. You can view or download Array 0 1 presentations for your school assignment or business presentation. Browse for the presentations on every topic that you want.

## 1 0 0 0 0 1 0 0 0 0 1 1 0 1 0 1 1 3

Base CliqueTrees for 3PART HyperGraph, 3PHG2. {12345}=Investors recommending Stocks ={ABCDE} on Days ={ ,,,,}, 74 recommendations. A B C D E. aoa results. oaa results. Stock-Day-Investor BaseCliqueTrees (leaves Inv ). ACD  124. ABCDE  1234.

By mheaton (0 views)

## 0 0 1 1 0 0 1 1 0 0 0 0 0 0 0 0

Create the CWCT (table of counts of all Class value bitmaps ANDed with all Feature Value bitmaps) for InfoGain , Correlation. Chi Square, etc. CWCT has # s needed for IG, Corr., Chi 2 in attribute selection , DTI, etc. S 1,j = 0 0 0 0 3 0 0 3 0 3.

By genglish (0 views)

## 1 0 0 –1 1 0 –1 0 1

n 1 2 3 4 5 6 7 8 9. A n 1 2 7 42 429 7436 218348 10850216 911835460. = 2  3  7. = 3  11  13. = 2 2  11  13 2. = 2 2  13 2  17  19. = 2 3  13  17 2  19 2. = 2 2  5  17 2  19 3  23. 1 0 0 –1 1 0 –1 0 1. n 1 2 3 4 5 6 7 8 9. A n 1

By candice (97 views)

## 1 0 0 –1 1 0 –1 0 1

Totally Symmetric Self-Complementary Plane Partitions. 1 0 0 –1 1 0 –1 0 1. 1983. Totally Symmetric Self-Complementary Plane Partitions. 1 0 0 –1 1 0 –1 0 1. 1 0 0 –1 1 0 –1 0 1. Robbins’ Conjecture: The number of TSSCPP’s in a 2 n X 2n X 2 n box is. 1 0 0 –1

By lee-drake (77 views)

## 1 0 0 –1 1 0 –1 0 1

Percy A. MacMahon. Plane Partition. 1 0 0 –1 1 0 –1 0 1. Work begun in 1897. Plane partition of 75. 6 5 5 4 3 3. 1 0 0 –1 1 0 –1 0 1. # of pp’s of 75 = pp (75). Plane partition of 75. 6 5 5 4 3 3. 1 0 0 –1 1 0 –1 0 1.

By snez (0 views)

## 1 0 0 –1 1 0 –1 0 1

1979, Andrews counts cyclically symmetric plane partitions. 1 0 0 –1 1 0 –1 0 1. 1979, Andrews counts cyclically symmetric plane partitions. 1 0 0 –1 1 0 –1 0 1. 1979, Andrews counts cyclically symmetric plane partitions. 1 0 0 –1 1 0 –1 0 1.

By vlorenzo (0 views)

## 1 0 0 –1 1 0 –1 0 1

1979, Andrews counts cyclically symmetric plane partitions. 1 0 0 –1 1 0 –1 0 1. 1979, Andrews counts cyclically symmetric plane partitions. 1 0 0 –1 1 0 –1 0 1. 1979, Andrews counts cyclically symmetric plane partitions. 1 0 0 –1 1 0 –1 0 1.

By derex (50 views)

## Input Output 0 0 0 1 0 0 0 1 0 1 1 1

AND Network. Input Output 0 0 0 1 0 0 0 1 0 1 1 1. OR Network. Input Output 0 0 0 1 0 1 0 1 1 1 1 1. NETWORK CONFIGURED BY TLEARN # weights after 10000 sweeps # WEIGHTS # TO NODE 1 -1.9083807468 ## bias to 1 4.3717832565 ## i1 to 1 4.3582129478 ## i2 to 1 0.0000000000.

By kendis (132 views)

## 1 0 0 –1 1 0 –1 0 1

Percy A. MacMahon. Plane Partition. 1 0 0 –1 1 0 –1 0 1. Work begun in 1897. Plane partition of 75. 6 5 5 4 3 3. 1 0 0 –1 1 0 –1 0 1. # of pp’s of 75 = pp (75). Plane partition of 75. 6 5 5 4 3 3. 1 0 0 –1 1 0 –1 0 1.

By borka (75 views)