...is committed, is not punishable. What is the crime? (Hint: You do this to yourself) Suicide2) How can a man go eight days without sleep? He would sleep at night3) Bay of Bengal is in which state?(Hint : Scientific thinking) Liquid State4) What is silent in “PARLIAMENT”? A5) Mysore Maharaja organized a royal party. To avoid uninvited guest royal family set a password. Mahalinga (an uninvited person) plan to enter the party. He stood near by the door. First guest comes; the security person said twelve and the guest replied ‘six’. Second guest came in, the security person said six and guest replied with ‘three’. Mahalinga thought is enough and he walked to the entry point. The security person said eight Mahalinga replied four. He was immediately thrown out. So what is the Password? (Hint: Vocabulary is involved)Five6) A detective agency inspects a room where there is no windows, no doors, no tables and is almost empty except there is just a puddle of water. They found dead women who hung herself from the ceiling, but they are not able to figure out how this happened. Tell us how this happened? Ice slab7) Tear one off and scratch my head what was red is black instead?(Hint: Fire is its friend) Matchstick8) There is a town in India which contains 100 buildings. They are numbered 1 to 100.How many 6’s are used in these numbers? 209) ( ) + ( ) + ( ) + ( ) + ( ) = 30This is what you have for equation. The following are the numbers you can use to fill in the brackets:...
Words: 3120 - Pages: 13
... | | |combined, together | | |total of | | |sum | | |added to | |Subtraction |decreased by | | |minus, less | | |difference between/of | | |less than, fewer than | |Multiplication |of times, multiplied by | | |product of | | |increased/decreased by a factor of(this type can involve both | | ...
Words: 2755 - Pages: 12
...Johann Heinrich Lamb... Johann Heinrich Lambert was a man with a vision. Despite coming from a family of tailors, Lambert acclaimed a great deal of success in his life, ... Read More Johannes Kepler Johannes Kepler was a famous German mathematician and astronomer who discovered the ovoid movements of the planets around the sun. The first ... Read More John Napier David Hume’s personification of the title “a great man” more than aptly describes the prominence and distinction of John Napier. A distinguished ... Read More John von Neumann John von Neumann was a famous Hungarian-American mathematician, who is still revered for his unparalleled contributions to disciplines like ... Read More Joseph Fourier A French mathematician and physicist, Joseph Fourier is renowned for showing how the conduction of heat in solid bodies could be analyzed in ... Georg Cantor A popular German mathematician, Georg Cantor is famous for discovering and building a hierarchy of infinite sets according to their cardinal ... Read More Georg Ohm A German physicist and mathematician, Georg Simon Ohm is best remembered for his formulation of Ohm’s Law, which defines the relationship ... Read More George Boole British mathematician and logician George Boole discovered Boolean logic. This logical theory acts as the basis of modern digital computer and ... Read More Gottfried W. Leibniz Gottfried W. Leibniz holds a prominent position in the domains of mathematics and...
Words: 950 - Pages: 4
...IQ OK E ER BO TH EV CE T I ES CT GG RA BI T P S TE IQ 1,000 Practice Test Questions to Boost your Brain Power PHILIP CARTER & KEN RUSSELL i IQ P H I L I P CA R T E R & K E N R U S S E L L London & Philadelphia ii Publisher’s note Every possible effort has been made to ensure that the information contained in this book is accurate at the time of going to press, and the publishers and authors cannot accept responsibility for any errors or omissions, however caused. No responsibility for loss or damage occasioned to any person acting, or refraining from action, as a result of the material in this publication can be accepted by the editor, the publisher or any of the authors. Tests included in this book have previously been included in The Times Book of IQ Tests: Book 1 (2001), The Times Book of IQ Tests: Book 3 (2003) and The Times Book of IQ Tests: Book 5 (2005) published by Kogan Page. First published in this format, in Great Britain and the United States in 2007 by Kogan Page Limited. Apart from any fair dealing for the purposes of research or private study, or criticism or review, as permitted under the Copyright, Designs and Patents Act 1988, this publication may only be reproduced, stored or transmitted, in any form or by any means, with the prior permission in writing of the publishers, or in the case of reprographic reproduction in accordance with the terms and licences issued by the CLA. Enquiries concerning reproduction outside these terms should...
Words: 39438 - Pages: 158
...i TEST IQ boost your brainpower 2nd edition YOUR 400 questions to Philip Carter London and Philadelphia ii Whilst the author has made every effort to ensure that the content of this book is accurate, please note that occasional errors can occur in books of this kind. If you suspect that an error has been made in any of the tests included in this book, please inform the publishers at the address printed below so that it can be corrected at the next reprint. Publisher’s note Every possible effort has been made to ensure that the information contained in this book is accurate at the time of going to press, and the publishers and author cannot accept responsibility for any errors or omissions, however caused. No responsibility for loss or damage occasioned to any person acting, or refraining from action, as a result of the material in this publication can be accepted by the editor, the publisher or the author. First published in Great Britain and the United States in 2000 by Kogan Page Limited Reprinted 2001, 2004 Reissued 2007 Reprinted 2007 Second edition 2009 Apart from any fair dealing for the purposes of research or private study, or criticism or review, as permitted under the Copyright, Designs and Patents Act 1988, this publication may only be reproduced, stored or transmitted, in any form or by any means, with the prior permission in writing of the publishers, or in the case of reprographic reproduction in accordance with the terms and licences issued...
Words: 17023 - Pages: 69
...caution : This Stuff is Not Legit , http://goo.gl/E0mkt Question 2013 Set – 5 This is what we’ve collected and to a special thanks to Riman Saha, who make this possible for us. I you’ve solve it please comment them. CREDITS TO RESPETIVE OWNERS , SOURCE :WWW 1. A boy wants to make cuboids of dimension 5m,6m & 7m from small cubes of .03m^3.Later he realized that he can make some cuboids by making it hollow.Then it takes some cubes less.What is the number of cubes to be removed a)2000 b)5000 c)3000 d)7000 2. if N is a natural no and N^3 has 16 factors then how many maximum factors can N^4 have?? a)21 b)24 c)25 d)26 3. Alice and Bob play the following coins-on-a-stack game. 100 coins are stacked one above the other. One of them is a special (gold) coin and the rest are ordinary coins. The goal is to bring the gold coin to the top of the repeatedly moving the topmost coin to another position in the stack. Alice starts and the players take turns. A turn consists of moving the coin on the top to a position I below the top coin (for some I between 0 and 100). We will call this as i-move (thus a 0-move implies doing nothing). The proviso is that an i-move cannot be repeated, for example once a player makes a 2-move, on subsequent turns neither player can make a 2-move. If the gol coin happen to be on the top when its a players turn then the player wins the game. Initially, the gold coin is the third coin from the top. Then a.In order to win, Alice’s first move...
Words: 3898 - Pages: 16
...into R In the following chapter we address entering data into R and organising it as scalars (single values), vectors, matrices, data frames, or lists. We also demonstrate importing data from Excel, ascii files, databases, and other statistical programs. 2.1 First Steps in R 2.1.1 Typing in Small Datasets We begin by working with an amount of data that is small enough to type into R. We use a dataset (unpublished data, Chris Elphick, University of Connecticut) containing seven body measurements taken from approximately 1100 saltmarsh sharp-tailed sparrows (Ammodramus caudacutus) (e.g., size of the head and wings, tarsus length, weight, etc.). For our purposes we use only four morphometric variables of eight birds (Table 2.1). Table 2.1 Morphometric measurements of eight birds. The symbol NA stands for a missing value. The measured variables are the lengths of the wing (measured as the wing chord), leg (a standard measure of the tarsus), head (from the bill tip to the back of the skull), and weight. Wingcrd Tarsus Head Wt 59 55 53.5 55 52.5 57.5 53 55 22.3 19.7 20.8 20.3 20.8 21.5 20.6 21.5 31.2 30.4 30.6 30.3 30.3 30.8 32.5 NA 9.5 13.8 14.8 15.2 15.5 15.6 15.6 15.7 The simplest, albeit laborious, method of entering the data into R is to type it in as scalars (variables containing a single value). For the first five observations of wing length, we could type: A.F. Zuur et al., A Beginner’s Guide to R, Use R, DOI 10.1007/978-0-387-93837-0_2, Ó Springer ScienceþBusiness...
Words: 2004 - Pages: 9
...at: www.ibiblio.org/obp/electricCircuits PRINTING HISTORY • First Edition: Printed in June of 2000. Plain-ASCII illustrations for universal computer readability. • Second Edition: Printed in September of 2000. Illustrations reworked in standard graphic (eps and jpeg) format. Source files translated to Texinfo format for easy online and printed publication. • Third Edition: Printed in February 2001. Source files translated to SubML format. SubML is a simple markup language designed to easily convert to other markups like A LTEX, HTML, or DocBook using nothing but search-and-replace substitutions. • Fourth Edition: Printed in March 2002. Additions and improvements to 3rd edition. ii Contents 1 NUMERATION SYSTEMS 1.1 Numbers and symbols . . . . . . . . . . . . . . 1.2 Systems of numeration . . . . . . . . . . . . . . 1.3 Decimal versus binary numeration . . . . . . . 1.4 Octal and hexadecimal numeration . . . . . . 1.5 Octal and hexadecimal to decimal conversion . 1.6 Conversion from decimal numeration . . . . . ....
Words: 29763 - Pages: 120
... o Supplementary Exercises 1, 2, 7, & 8 1. In the manufacture of a certain type of automobile, four kinds of major defects and seven kinds of minor defects can occur. For those situations in which defects do occur, in how many ways can there be twice as many minor defects as there are major ones? 2. A machine has nine different dials, each with five settings labeled 0, 1, 2, 3, and 4. a) In how many ways can all the dials on the machine be set? b) If the nine dials are arranged in a line at the top of the machine, how many of the machine settings have no two adjacent dials with the same setting? 7. There are 12 men at a dance. (a) In how many ways can eight of them be selected to form a cleanup crew? (b) How many ways are there to pair off eight women at the dance with eight of these 12 men? 8. In how many ways can the letters in WONDERING be arranged with exactly two consecutive vowels? • Ch. 2 of Discrete and Combinatorial Mathematics o Exercise 2.1, problems 2 o Exercise 2.2, problems 3 o Exercise 2.4, problems 1 o Exercise 2.5, problems 1 2. Identify the primitive statements in Exercise 1 below: Exercise 1. Determine whether each of the following sentences is a statement. a) In 2003 GeorgeW. Bush was the president of the United States. b) x + 3 is a positive integer. c) Fifteen is an even number. d) If Jennifer is late for the party, then her cousin Zachary will be quite angry. e) What time is it? f ) As of June 30, 2003, Christine...
Words: 1279 - Pages: 6
...International Mathematics Assessments for Schools 2011 UPPER PRIMARY DIVISION FIRST ROUND PAPER Time allowed 60minutes INSTRUCTION AND INFORMATION GENERAL 1. Do not open the booklet until told to do so by your teacher. 2. No calculators, slide rules, log tables, math stencils, mobile phones or other calculating aids are permitted. Scribbling paper, graph paper, ruler and compasses are permitted, but are not essential. 3. Diagrams are NOT drawn to scale. They are intended only as aids. 4. There are 20 multiple-choice questions, each with 5 possible answers given and 5 questions that require a whole number answer between 0 and 999. The questions generally get harder as you work through the paper. There is no penalty for an incorrect response. 5. This is a mathematics assessment not a test; do not expect to answer all questions. 6. Read the instructions on the answer sheet carefully. Ensure your name, school name and school year are filled in. It is your responsibility that the Answer Sheet is correctly coded. 7. When your teacher gives the signal, begin working on the problems. THE ANSWER SHEET 1. Use only lead pencil. 2. Record your answers on the reverse of the Answer Sheet (not on the question paper) by FULLY colouring the circle matching your answer. 3. Your Answer Sheet will be read by a machine. The machine will see all markings even if they are in the wrong places, so please be careful not to doodle or write anything extra on the Answer Sheet. If you want to change...
Words: 1707 - Pages: 7
...categoryId=-1 If You Face Any Problem E- Mail Us At JOHNMATE1122@Gmail.Com Page 1 Question 1. 1. (TCO 7) Using the assembly-line balancing procedure, which of the following is the theoretical minimum number of workstations if the task times for the six tasks that make up the job are 4, 6, 7, 2, 6, and 5 minutes and the cycle time is 10 minutes? (Points : 3) Three Five Six Eight None of the above Question 2. 2. (TCO 7) You have just determined the actual number of workstations that will be used on an assembly line to be eight using the assembly-line balancing procedure. The cycle time of the line is 10 minutes and the sum of all that tasks required on the line is 60 minutes. Which of the following is the correct value for the resulting line's efficiency? (Points : 3) 0.500 0.650 0.750 0.850 None of the above Question 3. 3. (TCO 7) Which of the following is not a step in developing a manufacturing cell layout? (Points : 3) Grouping parts into families that follow a common sequence of steps Identifying dominant flow patterns of parts families as a basis for location of processes Physically grouping machines and processes into cells Disposing of left-over machinery and outsourcing ungrouped processes None of the above Question 4. 4. (TCO 7) A difference between project and continuous flow categories of process flow structures is which one of...
Words: 588 - Pages: 3
...#tells user what to do echo "1) Addition 2) Quotient 3) Product 4) Difference" # user can pick 1 2 3 4 echo " Othewise, please enter 5 to exit the program" # user can eneter 5 to quit echo " Warnning!: If You Wish to Exit the Program You Must Enter 5" # warns user to enter 5 to quit echo " Any Other Not Option Key Will Produce An Error Message" #tells user if they eneter anything other than 1 2 3 4 5 error will appear echo " " read option #reads in option while [ $option != 5 ] # if option not 5 then goes into loop do echo "Please Enter Two Numbers" #prompts user to enter 2 numbers read num1#reads 1st num read num2#reads 2nd num case $option in Addition|ADDITION|addition|1) #can be entered anyone of those ways echo "The addition of $num1 and $num2 is `expr $num1 + $num2`";; # adds1 and 2 if user picks addition Quotient|QUOTIENT|quotient|2) #can be entered anyone of those ways echo "The Quotient of $num1 and $num2 is `expr $num1 \% $num2`";; #divides num1 and num 2 Product|PRODUCT|product|3) # can be entered anyone of those ways echo "The Product of $num1 and $num2 is `expr $num1 \* $num2`";; # multiplies num 1 and num2 Difference|DIFFERENCE|difference|4) if [ $num2 == 0 ] #num2 cant = zero then echo "Please Note that if you devife $num1 by $num2 an error will occur" #if num2 equals zero outputs this message echo "Do you want to devide $num1 by another number" #asks user to enter another number echo "If...
Words: 2541 - Pages: 11
...kinds of major defects and seven kinds of minor defects can occur. For those situations in which defects do occur, in how many ways can there be twice as many minor defects as there are major ones? Problem 2 A machine has nine different dials, each with five settings labeled 0, 1, 2, 3, and 4. a) In how many ways can all the dials on the machine be set? b) If the nine dials are arranged in a line at the top of the machine, how many of the machine settings have no two adjacent dials with the same setting? Problem 7 There are 12 men at a dance. (a) In how many ways can eight of them be selected to form a cleanup crew? (b) How many ways are there to pair off eight women at the dance with eight of these 12 men? Problem 8 In how many ways can the letters in WONDERING be arranged with exactly two consecutive vowels? Problem 9 Dustin has a set of 180 distinct blocks. Each of these blocks is made of either wood or plastic and comes in one of three sizes (small, medium, large), five colors (red, white, blue, yellow, green), and six shapes (triangular, square, rectangular, hexagonal, octagonal, circular). How many of the blocks in this set differ from a) the small red wooden square block in exactly one way? (For example, the small red plastic square block is one such block.) b) the large blue plastic hexagonal block in exactly two ways? (For example, the small red plastic hexagonal block is one such block.) Problem 15(a) a) How many of the 9000 four-digit...
Words: 1808 - Pages: 8
...kinds of major defects and seven kinds of minor defects can occur. For those situations in which defects do occur, in how many ways can there be twice as many minor defects as there are major ones? Problem 2 A machine has nine different dials, each with five settings labeled 0, 1, 2, 3, and 4. a) In how many ways can all the dials on the machine be set? b) If the nine dials are arranged in a line at the top of the machine, how many of the machine settings have no two adjacent dials with the same setting? Problem 7 There are 12 men at a dance. (a) In how many ways can eight of them be selected to form a cleanup crew? (b) How many ways are there to pair off eight women at the dance with eight of these 12 men? Problem 8 In how many ways can the letters in WONDERING be arranged with exactly two consecutive vowels? Problem 9 Dustin has a set of 180 distinct blocks. Each of these blocks is made of either wood or plastic and comes in one of three sizes (small, medium, large), five colors (red, white, blue, yellow, green), and six shapes (triangular, square, rectangular, hexagonal, octagonal, circular). How many of the blocks in this set differ from a) the small red wooden square block in exactly one way? (For example, the small red plastic square block is one such block.) b) the large blue plastic hexagonal block in exactly two ways? (For example, the small red plastic hexagonal block is one such block.) Problem 15(a) a) How many of the 9000 four-digit...
Words: 1808 - Pages: 8
...calculators. This calculator guide discusses the basic functions of five business and financial calculators: the Texas Instruments (TI) BA-35 SOLAR, the Texas Instruments (TI) BA II PLUS, the Hewlett-Packard (HP) 12C, the Hewlett-Packard (HP) 17BII, and the HewlettPackard (HP) 19BII. The sections for each calculator present step-by-step instructions for using general and financial functions offered by each calculator. The calculations for each type of financial operation have been explained using sample problems. The display on the calculator’s screen at the completion of each step has also been included to allow you to confirm your calculations as you proceed. V Texas Instruments (TI) BA-35 Solar The TI BA-35 SOLAR can operate in three different modes: statistical (STAT), financial (FIN), and profit margin. No indicator is...
Words: 12987 - Pages: 52