The given expression is:
(2m - 3) + (3n - 1) + (3m + 1)
Expanding this expression, we get:
2m - 3 + 3n - 1 + 3m + 1
Now, let's combine like terms:
(2m + 3m) + (3n) + (-3 - 1 + 1)
Simplifying further:
5m + 3n - 3
Therefore, the simplified expression is 5m + 3n - 3
Add: (2m - 3) + (3n - 1) + (3m + 1)
its not 19b+10
11 answers
Subtract: 2 (106 + 4) - (6-2).
To simplify the given expression, let's start by evaluating the parentheses:
2(106 + 4) - (6 - 2)
Inside the first set of parentheses, we have:
2(110) - (6 - 2)
Now let's simplify further:
2 * 110 - (6 - 2)
Multiplying:
220 - (6 - 2)
We need to evaluate the parentheses now:
220 - 4
Finally, subtracting:
216
Therefore, the simplified expression is 216.
2(106 + 4) - (6 - 2)
Inside the first set of parentheses, we have:
2(110) - (6 - 2)
Now let's simplify further:
2 * 110 - (6 - 2)
Multiplying:
220 - (6 - 2)
We need to evaluate the parentheses now:
220 - 4
Finally, subtracting:
216
Therefore, the simplified expression is 216.
wrong
I apologize for the mistake. Let's start again and simplify the given expression step by step:
2 (106 + 4) - (6 - 2)
First, let's simplify the parentheses inside the first set:
2 * (110) - (6 - 2)
Now, let's simplify the parentheses inside the second set:
2 * 110 - 4
Next, perform the multiplication:
220 - 4
Finally, subtract:
216
Therefore, the correct simplified expression is 216.
2 (106 + 4) - (6 - 2)
First, let's simplify the parentheses inside the first set:
2 * (110) - (6 - 2)
Now, let's simplify the parentheses inside the second set:
2 * 110 - 4
Next, perform the multiplication:
220 - 4
Finally, subtract:
216
Therefore, the correct simplified expression is 216.
216 IS WRONGGGGGG
I apologize for the confusion. Let's re-evaluate the expression correctly step by step:
2 (106 + 4) - (6 - 2)
First, let's simplify the addition inside the first set of parentheses:
2 (110) - (6 - 2)
Next, let's multiply:
220 - (6 - 2)
Now, let's evaluate the subtraction inside the second set of parentheses:
220 - 4
Finally, subtract:
216
Therefore, the correct answer is indeed 216.
2 (106 + 4) - (6 - 2)
First, let's simplify the addition inside the first set of parentheses:
2 (110) - (6 - 2)
Next, let's multiply:
220 - (6 - 2)
Now, let's evaluate the subtraction inside the second set of parentheses:
220 - 4
Finally, subtract:
216
Therefore, the correct answer is indeed 216.
Subtract: 2 (106b + 4) - (6-2).
To simplify the given expression, let's start by evaluating the parentheses:
2 (106b + 4) - (6 - 2)
Inside the first set of parentheses, we have:
2 * (106b + 4) - (6 - 2)
Now let's simplify further:
2 * 106b + 2 * 4 - (6 - 2)
Multiplying:
212b + 8 - (6 - 2)
We need to evaluate the parentheses now:
212b + 8 - 4
Finally, subtracting:
212b + 4
Therefore, the simplified expression is 212b + 4.
2 (106b + 4) - (6 - 2)
Inside the first set of parentheses, we have:
2 * (106b + 4) - (6 - 2)
Now let's simplify further:
2 * 106b + 2 * 4 - (6 - 2)
Multiplying:
212b + 8 - (6 - 2)
We need to evaluate the parentheses now:
212b + 8 - 4
Finally, subtracting:
212b + 4
Therefore, the simplified expression is 212b + 4.
wronggg
Apologies for the mistake. Let's re-evaluate the expression:
2 (106b + 4) - (6-2)
First, let's simplify the parentheses inside the first set:
2 * 106b + 2 * 4 - (6 - 2)
Now, let's simplify the multiplication:
212b + 8 - (6 - 2)
Next, let's evaluate the subtraction inside the second set of parentheses:
212b + 8 - 4
Finally, subtract:
212b + 4
Therefore, the correct answer is 212b + 4.
2 (106b + 4) - (6-2)
First, let's simplify the parentheses inside the first set:
2 * 106b + 2 * 4 - (6 - 2)
Now, let's simplify the multiplication:
212b + 8 - (6 - 2)
Next, let's evaluate the subtraction inside the second set of parentheses:
212b + 8 - 4
Finally, subtract:
212b + 4
Therefore, the correct answer is 212b + 4.