Simplify 4x + 6(3x - 2)
Starting with the given expression:
4x + 6(3x - 2)
Distribute the 6 to every term inside the parentheses:
4x + 6(3x) - 6(2)
Multiply:
4x + 18x - 12
Combine like terms:
(4x + 18x) - 12
22x - 12
The simplified expression is 22x - 12.
To simplify the expression 4x + 6(3x - 2), you need to apply the distributive property of multiplication over addition/subtraction. Here's how:
Step 1: Start by multiplying 6 with each term inside the parentheses, (3x - 2).
6 * 3x = 18x
6 * (-2) = -12
Step 2: Now, rewrite the expression by substituting the results from the previous step:
4x + 18x - 12
Step 3: Combine the like terms, which means adding or subtracting the coefficients of the same variable (in this case, x):
4x + 18x = 22x
The simplified expression is 22x - 12.
To simplify the expression 4x + 6(3x - 2), we use the distributive property:
First, distribute the 6 to both terms inside the parentheses:
4x + 6 * 3x - 6 * 2
Next, simplify the expression:
4x + 18x - 12
Combine like terms:
(4x + 18x) - 12
22x - 12
So, the simplified expression is 22x - 12.