Answer:
Explanation:
Solve for o in the equation (7 + 4) + (7 - 41) = 14©(7 + 4) + 0 = 7 + 41o(7 + 4)(1) = 7 + 41o(7 + 41) + ( - 7 - 41) = 0
We first need to simplify the expression removing parentheses
Simplify 41o(7 + 4): Distribute the 41o to each term in (7+4)
41o * 7 = (41 * 7)o = 287o 41o * 4 = (41 * 4)o = 164o
Our Total expanded term is 287o + 164o
Simplify 41o(7 + 41): Distribute the 41o to each term in (7+41)
41o * 7 = (41 * 7)o = 287o 41o * 41 = (41 * 41)o = 1681o
Our Total expanded term is 287o + 1681o
Our updated term to work with is (7 + 4) + (7 - 41) = 14©(7 + 4) + 0 = 7 + 287o + 164o(1) = 7 + 287o + 1681o + ( - 7 - 41) = 0
We first need to simplify the expression removing parentheses
Simplify 164o(1): Distribute the 164o to each term in (1)
164o * 1 = (164 * 1)o = 164o Our Total expanded term is 164o
Our updated term to work with is (7 + 4) + (7 - 41) = 14©(7 + 4) + 0 = 7 + 287o + 164o = 7 + 287o + 1681o + ( - 7 - 41) = 0
Step 1: Group variables: We need to group our variables (7 and 14©(7. To do that, we subtract 14©(7 from both sides (7 - 14©(7 = 14©(7 - 14©(7
Step 2: Cancel 14©(7 on the right side: 0o = 0 Step 3: Divide each side of the equation by 0