Simplify 3/7x + 2/7x using properties of operations.
To simplify the expression 3/7x + 2/7x, we can combine the like terms.
Since both terms have the same denominator (7x), we can add the numerators (3 + 2) and keep the same denominator to combine the terms.
Therefore, 3/7x + 2/7x simplifies to (3 + 2)/7x, which is equal to 5/7x.
To simplify the expression 3/7x + 2/7x, we can first combine the two fractions since they have the same denominator, which is 7x.
So, 3/7x + 2/7x = (3 + 2) / 7x
This simplifies to 5/7x.
To simplify the expression (3/7)x + (2/7)x, we can combine the like terms by adding their coefficients:
(3/7)x + (2/7)x = (3 + 2)/(7)x = 5/7x
So the simplified form of the expression is 5/7x.
To arrive at this result, you need to follow these steps:
Step 1: Identify the like terms, which are the terms that have the same variable with the same exponent. In this case, both terms have the variable "x" raised to the power of 1, so they are like terms.
Step 2: Use the distributive property to factor out the common factor (x). This involves dividing each term by the common factor.
Step 3: Add the coefficients of the like terms. In this case, the coefficients are 3/7 and 2/7, so we add them to get 3/7 + 2/7 = 5/7.
Step 4: Write the sum of the coefficients over the common factor (x). So the simplified expression is 5/7x.