Simplify 4x+6(3x−2)
To simplify the expression 4x + 6(3x - 2), distribute the 6 to both terms inside the parentheses:
4x + 6(3x) - 6(2)
Simplifying this gives:
4x + 18x - 12
Combining like terms:
(4x + 18x) - 12
22x - 12
So, the simplified expression is 22x - 12.
Simplify 13(9x − 5)
To simplify the expression 13(9x - 5), distribute the 13 to both terms inside the parentheses:
13 * 9x - 13 * 5
Simplifying this gives:
117x - 65
So, the simplified expression is 117x - 65.
Simplify 1/3(9x − 5)
To simplify the expression 1/3(9x - 5), distribute the 1/3 to both terms inside the parentheses:
1/3 * 9x - 1/3 * 5
This gives:
3x - 5/3
So, the simplified expression is 3x - 5/3.
To simplify the expression 4x + 6(3x - 2), you need to apply the distributive property first. This means multiplying each term inside the parentheses by 6.
So, starting with the expression 4x + 6(3x - 2), you can rewrite it as:
4x + 6 * 3x - 6 * 2.
Next, multiply the numbers:
4x + 18x - 12.
Combine like terms:
(4x + 18x) - 12.
Combine the coefficients of the x terms:
22x - 12.
Therefore, the simplified expression is 22x - 12.
To simplify the expression 4x + 6(3x - 2), you need to apply the distributive property.
Start by distributing the 6 to both terms inside the parentheses:
6 * 3x = 18x
6 * -2 = -12
Now rewrite the expression with the distributed terms:
4x + 18x - 12
Next, combine like terms:
(4x + 18x) - 12 = 22x - 12
So, the simplified form of the expression 4x + 6(3x - 2) is 22x - 12.