What is the expression 4+8(3x−2)−7x when simplified? Apply the order of operations and the commutative and distributive properties. Show all your work.(4 points) Math Short Answer Rubric (4 points) Points Awarded Criteria 4 The answer is clear and correct. The answer shows that the student used problem-solving skills and reasoning. All work is shown or explained. 3 The answer is mostly correct. The student made small errors while solving. The answer shows that the student used some problem-solving skills and reasoning. Most work is shown or explained. 2 The answer is partially correct. The student made errors while solving. The answer shows that the student used some problem-solving skills or reasoning. Some work is shown or explained. 1 The answer is incorrect. The student made errors while solving. The answer shows little problem-solving skills or reasoning. Little or no work is shown. 0 The question is not answered.
To simplify the expression 4+8(3x−2)−7x, we will follow the order of operations and the distributive property.
First, we need to simplify the expression inside the parentheses: 3x−2.
Next, we will distribute the 8 to both terms inside the parentheses: 8(3x)−8(2).
This gives us: 24x−16.
Now, we can rewrite the entire expression as: 4+24x−16−7x.
Next, we can combine like terms by adding or subtracting the coefficients of x. In this case, we have 24x and -7x, so the expression becomes: 24x−7x.
This simplifies to: 17x.
Finally, we can combine the constants by adding or subtracting them. In this case, we have 4 and -16, so the expression becomes: 17x−12.
Therefore, the simplified expression is 17x−12.
To simplify the expression 4 + 8(3x - 2) - 7x, we will follow the order of operations, which is parentheses, exponents, multiplication/division (from left to right), and addition/subtraction (from left to right).
First, let's distribute the 8 to the terms inside the parentheses.
4 + 24x - 16 - 7x
Next, combine like terms.
(24x - 7x) + 4 - 16
Simplifying, we have:
(17x) - 12
So, the simplified expression is 17x - 12.
To simplify the expression 4 + 8(3x - 2) - 7x, we need to apply the order of operations (PEMDAS) and use the commutative and distributive properties. Let's break it down step by step:
Step 1: Work on the parentheses
Start by simplifying what's inside the parentheses. Distribute the 8 to both terms inside:
8(3x - 2) = 8 * 3x - 8 * 2 = 24x - 16
Now the expression becomes 4 + 24x - 16 - 7x.
Step 2: Combine like terms
Combine the terms with the same variable. In this case, we have 24x and -7x:
24x - 7x = 17x
The expression now becomes 4 + 17x - 16.
Step 3: Combine constant terms
Combine the constants 4 and -16:
4 - 16 = -12
Now the expression becomes -12 + 17x.
So, the simplified expression is -12 + 17x.