Simplify 2(3v+9)−14−6(−5v−4) .
To simplify the given expression, we distribute the coefficients across the terms within each set of parentheses:
2(3v+9)−14−6(−5v−4)
First, distribute 2 across the terms within the parentheses:
= 6v + 18 - 14 - 6(-5v - 4)
Then distribute -6 across the terms within the second set of parentheses:
= 6v + 18 - 14 + 30v + 24
Now combine like terms:
= (6v + 30v) + (18 + 24) - 14
= 36v + 42 - 14
= 36v + 28
Therefore, 2(3v+9)−14−6(−5v−4) simplifies to 36v + 28.
To simplify the expression 2(3v+9)−14−6(−5v−4), follow these steps:
Step 1: Distribute the 2 to the terms inside the parentheses: 2 * 3v + 2 * 9
This gives us: 6v + 18
Step 2: Distribute the -6 to the terms inside the parentheses: -6 * -5v + -6 * -4
This gives us: 30v + 24
Step 3: Put the simplified terms together: 6v + 18 - 14 + 30v + 24
Step 4: Combine like terms: 36v + 28
So, the simplified expression is 36v + 28.
To simplify the expression, follow these steps:
Step 1: Distribute the 2 to every term inside the parentheses:
2(3v + 9) - 14 - 6(-5v - 4)
Result: 6v + 18 - 14 - (-30v - 24)
Step 2: Simplify the expression by combining like terms:
Combine the constant terms: 18 - 14 = 4
Combine the terms with "v": 6v - (-30v) = 6v + 30v = 36v
Combine the remaining constant terms: 4 - (-24) = 4 + 24 = 28
Step 3: Rewrite the simplified expression:
36v + 28
So, the simplified expression is 36v + 28.