Control Statements (Decision Making)
... The expression in the switch statement must be an integer or character constant. No real numbers are used in an expression. The default is optional and can be placed anywhere, but usually placed at end. The case keyword must be terminated with colon (:); No two case constant are identical. The value ...
... The expression in the switch statement must be an integer or character constant. No real numbers are used in an expression. The default is optional and can be placed anywhere, but usually placed at end. The case keyword must be terminated with colon (:); No two case constant are identical. The value ...
Flowcharting1
... The following are some guidelines in flowcharting: a. In drawing a proper flowchart, all necessary requirements should be listed out in logical order. b. The flowchart should be clear, neat and easy to follow. There should not be any room for ambiguity in understanding the flowchart. c. The usual di ...
... The following are some guidelines in flowcharting: a. In drawing a proper flowchart, all necessary requirements should be listed out in logical order. b. The flowchart should be clear, neat and easy to follow. There should not be any room for ambiguity in understanding the flowchart. c. The usual di ...
PPT
... • No overflow when signs are the same for subtraction • Overflow occurs when the value affects the sign: – overflow when adding two positives yields a negative – or, adding two negatives gives a positive – or, subtract a negative from a positive and get a negative – or, subtract a positive from a ne ...
... • No overflow when signs are the same for subtraction • Overflow occurs when the value affects the sign: – overflow when adding two positives yields a negative – or, adding two negatives gives a positive – or, subtract a negative from a positive and get a negative – or, subtract a positive from a ne ...
Limits and Infinite Series Lecture Notes for Math 226 by´Arpád Bényi
... Math 226 is a first introduction to formal arguments in mathematical analysis that is centered around the concept of limit. You have already encountered this concept in your calculus classes, but now you will see it treated from an abstract (and more rigorous) point of view. A main goal of this cours ...
... Math 226 is a first introduction to formal arguments in mathematical analysis that is centered around the concept of limit. You have already encountered this concept in your calculus classes, but now you will see it treated from an abstract (and more rigorous) point of view. A main goal of this cours ...
PPT
... computing (x+y) mod n takes time O(k) computing (x-y) mod n takes time O(k) computing (xy) mod n takes time O(k2) computing (x-1) mod n takes time O(k3) computing (x)c mod n takes time O((log c) k2) ...
... computing (x+y) mod n takes time O(k) computing (x-y) mod n takes time O(k) computing (xy) mod n takes time O(k2) computing (x-1) mod n takes time O(k3) computing (x)c mod n takes time O((log c) k2) ...
exams description
... a member of the MORSE Society. However, do encourage them to join if they are not firms look at society’s memberships at the start of the year, not before socials / printing of revision guides - so how much everyone gets subsidized is really due to membership levels! However, I do not want this to b ...
... a member of the MORSE Society. However, do encourage them to join if they are not firms look at society’s memberships at the start of the year, not before socials / printing of revision guides - so how much everyone gets subsidized is really due to membership levels! However, I do not want this to b ...
Full text
... Mathematics Department, San Francisco State University, San Francisco, CA 94132 (Submitted September 2001-Final Revision December 2001) ...
... Mathematics Department, San Francisco State University, San Francisco, CA 94132 (Submitted September 2001-Final Revision December 2001) ...
Addition
Addition (often signified by the plus symbol ""+"") is one of the four elementary, mathematical operations of arithmetic, with the others being subtraction, multiplication and division.The addition of two whole numbers is the total amount of those quantities combined. For example, in the picture on the right, there is a combination of three apples and two apples together; making a total of 5 apples. This observation is equivalent to the mathematical expression ""3 + 2 = 5"" i.e., ""3 add 2 is equal to 5"".Besides counting fruits, addition can also represent combining other physical objects. Using systematic generalizations, addition can also be defined on more abstract quantities, such as integers, rational numbers, real numbers and complex numbers and other abstract objects such as vectors and matrices.In arithmetic, rules for addition involving fractions and negative numbers have been devised amongst others. In algebra, addition is studied more abstractly.Addition has several important properties. It is commutative, meaning that order does not matter, and it is associative, meaning that when one adds more than two numbers, the order in which addition is performed does not matter (see Summation). Repeated addition of 1 is the same as counting; addition of 0 does not change a number. Addition also obeys predictable rules concerning related operations such as subtraction and multiplication.Performing addition is one of the simplest numerical tasks. Addition of very small numbers is accessible to toddlers; the most basic task, 1 + 1, can be performed by infants as young as five months and even some non-human animals. In primary education, students are taught to add numbers in the decimal system, starting with single digits and progressively tackling more difficult problems. Mechanical aids range from the ancient abacus to the modern computer, where research on the most efficient implementations of addition continues to this day.