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My guess - and it is a guess, is
6*(p + 2) - 2p = 6p + 12 - 2p = 4p + 12 where the + is missing throughout.
But it could be
6*(p - 2) - 2p = 6p - 12 - 2p = 4p - 12 where most of the - are missing.
Nested parentheses are sets of parentheses inside sets of parentheses, where a set of parentheses refers to a left parenthesis and a right parenthesis. This is an example of nested parentheses: The mohel (a man who performs a bris (circumcision)) was setting up his equipment on the table.
When evaluating an expression, do these in this order:work out what is inside any parentheses firstnext, do exponentsmultiplication and division are done in the order you see them, from left to right.addition and subtraction are done in the order you see them, from left to right.
Same as parentheses. Brackets are used simply as a different type of parentheses, to make it easier to match the left and the right side.
It is unknown for right now.
A reason why an algebraic expression is right.
4(x+y)
It means that the number or expression on the left of the symbol is less that the value or expression to the right, or that they are equal.
BIDMAS (UK) or PEMDAS (US). B or P : Brackets (Parentheses) I or E : Index (Exponent) DM or MD : Division and Multiplication. Equal priority, evaluate from left to right. AS : Addition and Subtraction. Equal priority, evaluate from left to right.
In mathematics, such expressions indicate that the value of the expression to the left of the equal sign has the same value as the expression to the right of the equal sign. In some cases, it can also be interpreted to mean that the expression on one side of the equal sign can be used in place of the expression on the other side of the equal sign (say in manipulating algebraic expressions). In computer languages, the equal sign is sometimes also used to indicate that the value of the expression to the right of the equal sign is to be transferred to the location indicated by the expression to the left of the equal sign. The expression to the left of the equal sign is usually a single variable that represents a memory location.
Since there are no parentheses (brackets) the expression is evaluated from left to right and so 696 / 3 * 2 = 232 * 2 = 464
The usual rules are: * Evaluate anything within parentheses first. * Evaluate multiplications and divisions from left to right. * Then evaluate additions and subtractions from left to right.
Add multiply what is in parentheses and the number that is on the outside of the parentheses that is to the right or to the left.
x(x2)2x2this is because the exponent only applies to the term right in front of it, unless there are parentheses.
Nested parentheses are sets of parentheses inside sets of parentheses, where a set of parentheses refers to a left parenthesis and a right parenthesis. This is an example of nested parentheses: The mohel (a man who performs a bris (circumcision)) was setting up his equipment on the table.
To solve this expression, we need to follow the order of operations, which is commonly known as PEMDAS (Parentheses, Exponents, Multiplication and Division from left to right, and Addition and Subtraction from left to right). First, let's simplify the multiplication M×4m=4Mm Next, let's simplify the addition: 4Mm+54n+72f×62L Since there are no parentheses, we move on to the multiplication: 72f×62L=4464fL Finally, we can add all the terms together: 4Mm+54n+4464fL Therefore, the final expression is; 4Mm+54n+4464fL To solve this expression, we need to follow the order of operations, which is commonly known as PEMDAS (Parentheses, Exponents, Multiplication and Division from left to right, and Addition and Subtraction from left to right). First, let's simplify the multiplication M×4m=4Mm Next, let's simplify the addition: 4Mm+54n+72f×62L Since there are no parentheses, we move on to the multiplication: 72f×62L=4464fL Finally, we can add all the terms together: To solve this expression, we need to follow the order of operations, which is commonly known as PEMDAS (Parentheses, Exponents, Multiplication and Division from left to right, and Addition and Subtraction from left to First, let's simplify the Next, let's simplify the Since there are no parentheses, we move on to the Finally, we can add all the terms ( 4M \mathrm{~m} + 54 \mathrm{n} + 4464 \mathrm{fL} )To solve this expression, we need to follow ( 4M \mathrm{~m} + 54 \mathrm{n} + 4464 \mathrm{fL} )To solve this expression, we need to follow the order of operations, which is commonly known as PEMDAS (Parentheses, Exponents, Multiplication and Division from left to right, and Addition and Subtraction from left to right). First, let's simplify the multiplication: ( M \times 4 \mathrm{~m} = 4M \mathrm{~m} ) Next, let's simplify the addition: ( 4M \mathrm{~m} + 54 \mathrm{n} + 72 \mathrm{f} \times 62L ) Since there are no parentheses, we move on to the multiplication: ( 72 \mathrm{f} \times 62L = 4464 \mathrm{fL} ) Finally, we can add all the terms together: ( 4M \mathrm{~m} + 54 \mathrm{n} + 4464 \mathrm{fL} ) Therefore, the final expression is: ( 4M \mathrm{~m} + 54 To solve this expression, we need to follow the order of operations, which is commonly known as PEMDAS (Parentheses, Exponents, Multiplication and Division from left to right, and Addition ( 4M \mathrm{~m} + 54 \mathrm{n} Since there are no parentheses, ( 72 \mathrm{f} Finally, we ( 4M \mathrm{~m} + ( 4M \mathrm{~m} + To solve this expression, we need to follow the order of operations, which is commonly known as PEMDAS (Parentheses, Exponents, Multiplication and Division from left to right, and
The precedence (not percedence!) is BIDMAS (UK) or PEMDAS (US) The acronyms stand for: Brackets (Parentheses) Index (Exponent) Division and Multiplication which have equal precedence and are evaluated from left to right. Addition and Subtraction which have equal precedence and are evaluated from left to right.
* arithmetic expressions are evaluated from left to right using the rules of precedence.. * when parentheses are used,the expressions within parentheses assume highest priority... * if parentheses are nested, the evaluation begins with the inner most parentheses... * the associativity rules are applied when 2 or more operators of same precedence level appear in a sub expression