Remove the parentheses from the following expression, and combine like terms: 3(ax + b2 – c) + 2 22
A. –3(ax – b2 + 3c – 6
B. 3ax +3b2 – 3c + 2
C. 3(ax + 3b2 – 3c + 6
D. (ax + b2 – c + 5
3(ax + b2 – c) + 2
3ax + 3b^2 -3c +2
B
what is the answer
To remove the parentheses from the expression 3(ax + b2 – c) + 2, you will distribute the 3 to each term inside the parentheses.
3(ax + b2 – c) + 2 becomes 3ax + 3b2 – 3c + 2
Therefore, the expression with parentheses removed and like terms combined is B. 3ax + 3b2 – 3c + 2.
To remove the parentheses and combine like terms in the given expression, follow these steps:
Step 1: Distribute the 3 to all terms within the parentheses:
3(ax + b^2 - c) + 2(22) = 3ax + 3b^2 - 3c + 44
Step 2: Combine like terms:
3ax + 3b^2 - 3c + 44
The correct answer is B. 3ax + 3b^2 - 3c + 44.