I know what ya'll are all thinking, the math term! Wrong!
Please
Excuse
My
Dope
Ass
Swag
This is the true meaning loves
Please
Excuse
My
Dope
Ass
Swag
This is the true meaning loves
Guy1: bro pemdas I just had to today
Guy2: bro what are you talking about?
Guy1: please excuse my dope ass swag!
Guy2: that's not what that means *face palm*
Guy2: bro what are you talking about?
Guy1: please excuse my dope ass swag!
Guy2: that's not what that means *face palm*
by Thecumspider October 24, 2023
Please Eliminate Misleading and Dumb Acronyms from School.
“PEMDAS” actually stands for an order of operations (parentheses, exponentiation, multiplication/division, addition/subtraction) and a mnemonic such as “Please Excuse My Dear Aunt Sally” is often used to remember the initials. However, instead of memorizing some arbitrary sentence, one might give a justification of the convention like this: Multiplication can be seen as repeated addition and thus takes precedence over addition. Exponentiation can be seen as repeated multiplication and thus takes precedence over multiplication. In effect, you can simplify repetitions without adding parentheses like this:
11 − 3 − 3 − 3 = 11 − 3 × 3 = 11 − 3²
Makes sense, eh? “PEMDAS” can also lead people into thinking that multiplication takes precedence over division and addition over subtraction.
In German schools, the line “Punkt(rechnung) vor Strich(rechnung)” (“dot (calculation) before stroke (calculation)”) is taught because multiplication is indicated with a middle dot (·) and division, at least in primary and secondary school, with a colon (:). However, multiplication is written with a cross (×) when talking about dimensions and mathematicians indicate division with a slash (/).
“PEMDAS” actually stands for an order of operations (parentheses, exponentiation, multiplication/division, addition/subtraction) and a mnemonic such as “Please Excuse My Dear Aunt Sally” is often used to remember the initials. However, instead of memorizing some arbitrary sentence, one might give a justification of the convention like this: Multiplication can be seen as repeated addition and thus takes precedence over addition. Exponentiation can be seen as repeated multiplication and thus takes precedence over multiplication. In effect, you can simplify repetitions without adding parentheses like this:
11 − 3 − 3 − 3 = 11 − 3 × 3 = 11 − 3²
Makes sense, eh? “PEMDAS” can also lead people into thinking that multiplication takes precedence over division and addition over subtraction.
In German schools, the line “Punkt(rechnung) vor Strich(rechnung)” (“dot (calculation) before stroke (calculation)”) is taught because multiplication is indicated with a middle dot (·) and division, at least in primary and secondary school, with a colon (:). However, multiplication is written with a cross (×) when talking about dimensions and mathematicians indicate division with a slash (/).
Always remember PEMDAS.
Screw it! Also, who the f*ck needs to be told “Inner parentheses before outer parentheses”? The whole point of parentheses is grouping, so of course you cannot evaluate “(2 × (3 + 5))” as “(((2 × 3) + 5))”.
Screw it! Also, who the f*ck needs to be told “Inner parentheses before outer parentheses”? The whole point of parentheses is grouping, so of course you cannot evaluate “(2 × (3 + 5))” as “(((2 × 3) + 5))”.
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