Problem 71
Question
Simplify the expression. $$4 y-9+3 y$$
Step-by-Step Solution
Verified Answer
Simplified result is \(7y - 9\).
1Step 1: Identify like terms
In this expression, the like terms are \(4y\) and \(3y\).
2Step 2: Combine like terms
To combine the identified terms, add or subtract them as indicated by their leading coefficient (the number in front of the variable). In this case, we add \(4y + 3y\) to get \(7y\).
3Step 3: Rewrite the simplified expression
After combining the like terms, rewrite the expression with the simplified term and keep the unrelated term as it is. Therefore, the simplified expression will be \(7y - 9\).
Key Concepts
Combining Like TermsAlgebraic ExpressionsCoefficient
Combining Like Terms
Simplifying algebraic expressions often involves combining like terms, which are terms that have the same variable raised to the same power. Think of like terms as items that are the same kind and can be grouped together. For instance, apples can be added to apples but not to oranges. Similarly, in algebra, terms with the same variable part, like 4y and 3y, can be combined because they both contain the variable y to the first power.
To combine like terms, observe their coefficients, which are the numbers in front of the variables. If the coefficients are positive, you add them together; if one is negative, you subtract them from each other. The variable part remains unchanged. For example, combining the like terms 4y and 3y results in 7y because you simply add the coefficients (4 + 3) and keep the variable y.
To combine like terms, observe their coefficients, which are the numbers in front of the variables. If the coefficients are positive, you add them together; if one is negative, you subtract them from each other. The variable part remains unchanged. For example, combining the like terms 4y and 3y results in 7y because you simply add the coefficients (4 + 3) and keep the variable y.
Algebraic Expressions
An algebraic expression is a mathematical phrase that can include numbers, variables, and operation symbols. Variables are symbols like x, y, or z that represent unknown values. You can think of algebraic expressions as sentences in the language of mathematics, where the variables are like nouns – the subjects we're talking about or working with.
Algebraic expressions can be as simple as a single term, like 5x, or as complex as a long combination of terms with different variables and powers. For instance, the expression 4y - 9 + 3y combines the terms 4y and 3y (which are like terms) and the constant -9. When simplifying expressions, your goal is to make them as concise as possible by performing operations like addition, subtraction, multiplication, and combination of like terms.
Algebraic expressions can be as simple as a single term, like 5x, or as complex as a long combination of terms with different variables and powers. For instance, the expression 4y - 9 + 3y combines the terms 4y and 3y (which are like terms) and the constant -9. When simplifying expressions, your goal is to make them as concise as possible by performing operations like addition, subtraction, multiplication, and combination of like terms.
Coefficient
The coefficient in an algebraic expression is the number that is directly multiplied by a variable. It tells you how many of that variable you have. Coefficients are crucial when it comes to simplifying expressions because they determine how terms can be combined.
In the expression 4y - 9 + 3y, the coefficients are 4 and 3 for the terms involving y. Constants, like -9, are also considered terms but they are not variables and thus don't have coefficients in the same sense. When combining like terms, it is the coefficients that you add or subtract according to the operation indicated in the expression, while the variable part stays the same, reflecting how many units of the variable are present.
In the expression 4y - 9 + 3y, the coefficients are 4 and 3 for the terms involving y. Constants, like -9, are also considered terms but they are not variables and thus don't have coefficients in the same sense. When combining like terms, it is the coefficients that you add or subtract according to the operation indicated in the expression, while the variable part stays the same, reflecting how many units of the variable are present.