www.reference.com/history/**invented**-**order**-**operations**...

Who Invented the Order of Operations? In mathematics, the order of operations, believed to have been in its formative stages in the 16th century, is not credited to a single inventor. This mathematical convention developed as a conceptual process in solving mathematical equations involving multiple operators.

www.answers.com/Q/**Who_Invented_the_Order_of_Operations**

There is no definite answer on any one person who invented the order of operations in algebra. There isn't even strong evidence to state that this or.

socratic.org/questions/**who-invented-order-of-operations**

Algebra is not invented. It can only be discovered. So there is no 'inventor'. This means, nobody can invent(!) an other way for order of operations. Mathematics is like the nature. You look at it, and you try to understand it. You develop new 'tools' (limit, derivation etc.) to understand it better.

www.quora.com/**Who-invented**-**the-order**-of-operation-or-PEMDAS

Nobody Invented PEMDAS. People gradually discovered the best techniques and practices which later became standards. Joe D. (Apr 21, 2015) Algebra is not invented. It can only be discovered. So there is no 'inventor'. This means, nobody can invent(!) an other way for order of operations. Mathematics is like the nature.

www.quora.com/How-did-**the-order-of-operations-come-to**-be

While Joshua Engel and Qiaochu Yuan are technically correct that there's nothing inherently mathematical about the order of operations, I actually completely disagree that there aren't good reasons for having the operator precedence the way we do. One of the good things about PEMDAS is that it's more notation-concise with respect to needing parentheses.

**answers.yahoo.com**/question/index?qid=20081114085419AAxA9rG

It's not a discovery or invention. It's more of a conceptual process. Early cultures like ancient greek, rome, and egypt had to use the 'order of operations' to build monuments and other forms of architecture

mathforum.org/library/drmath/view/52582.html

The Order of Operations rules as we know them could not have existed before algebraic notation existed; but I strongly suspect that they existed in some form from the beginning - in the grammar of how people talked about arithmetic when they had only words, and not symbols, to describe operations.

www.math.ucdenver.edu/~jloats/Student pdfs/4_**Order** of...

"Indicated operations are to be performed in the following order: first, all multiplications and divisions in their order from left to right; then all additions and subtractions from left to right." In 1913, Second Course in Algebra by Webster Wells and Walter W. Hart has: "Order of operations. In a sequence of the fundamental operations on ...

**en.wikipedia.org**/wiki/PEMDAS

In mathematics and computer programming, the order of operations (or operator precedence) is a collection of rules that reflect conventions about which procedures to perform first in order to evaluate a given mathematical expression.. For example, in mathematics and most computer languages, multiplication is granted a higher precedence than addition, and it has been this way since the ...

**en.wikipedia.org**/wiki/**Arithmetic**

Arithmetic (from the Greek ἀριθμός arithmos, "number" and τική, tiké [téchne], "art") is a branch of mathematics that consists of the study of numbers, especially the properties of the traditional operations on them—addition, subtraction, multiplication and division.Arithmetic is an elementary part of number theory, and number theory is considered to be one of the top-level ...