Simplify -4(7b+3)+24b-8
To simplify the expression -4(7b+3)+24b-8, we can distribute the -4 to the terms inside the parentheses:
-4 * 7b = -28b
-4 * 3 = -12
The expression simplifies to:
-28b - 12 + 24b - 8
Next, we can combine like terms by combining the b terms and the constant terms:
(-28b + 24b) + (-12 - 8) = -4b - 20
Therefore, the simplified expression is -4b - 20.
To simplify the given expression, you need to apply the distributive property and combine like terms.
Let's break down the expression step by step:
-4(7b+3) + 24b - 8
Step 1: Apply the distributive property by multiplying -4 with each term inside the parentheses.
-4 * 7b = -28b
-4 * 3 = -12
The expression becomes:
-28b - 12 + 24b - 8
Step 2: Combine like terms. Group the terms with b together and the constant terms together.
(-28b + 24b) + (-12 - 8)
(-4b) + (-20)
The expression simplifies to:
-4b - 20
So, -4(7b+3) + 24b - 8 simplifies to -4b - 20.
To simplify -4(7b+3) + 24b - 8, we can use the distributive property.
First, distribute -4 to both terms inside the parentheses:
-4 * 7b = -28b
-4 * 3 = -12
After distributing, the expression becomes:
-28b - 12 + 24b - 8
Combine like terms:
-28b + 24b = -4b
-12 - 8 = -20
The simplified expression is:
-4b - 20