Answer the questions below about Line 1 and Line 2 shown below.
7, dot, left bracket, 6, minus, 1, right bracket
7⋅(6−1)
Line 1
7, dot, 6, minus, 7, dot, 1
7⋅6−7⋅1
Line 2
Answer
Attempt 1 out of 3
The expression was rewritten using the .
7, dot, left bracket, 6, minus, 1, right bracket7⋅(6−1) equals 7, dot7⋅ which equals .
7, dot, 6, minus, 7, dot, 17⋅6−7⋅1 equals minus− which equals .
The answer to Line 1 is 7⋅(6−1) = 35.
The answer to Line 2 is 7⋅6−7⋅1 = 42−7 = 35.
can you answer this questions?
Answer the questions below about Line 1 and Line 2 shown below.
7, dot, left bracket, 6, minus, 1, right bracket
7⋅(6−1)
Line 1
7, dot, 6, minus, 7, dot, 1
7⋅6−7⋅1
Line 2
Answer
Attempt 1 out of 3
The expression was rewritten using the .
7, dot, left bracket, 6, minus, 1, right bracket7⋅(6−1) equals 7, dot7⋅ which equals .
7, dot, 6, minus, 7, dot, 17⋅6−7⋅1 equals minus− which equals .
Certainly! Here are the answers to the questions:
Line 1:
7⋅(6−1) = 7⋅5 = 35
Line 2:
7⋅6−7⋅1 = 42−7 = 35
The expression was rewritten using the
The expression was rewritten using the distributive property.
To solve the expressions on Line 1 and Line 2, we need to follow the order of operations, which states that we must perform calculations inside parentheses first, then multiplications and divisions from left to right, and finally additions and subtractions from left to right.
Let's start with Line 1:
Line 1: 7⋅(6−1)
To simplify this expression, we need to evaluate what's inside the parentheses first, which is 6−1.
6−1 equals 5.
Now, we substitute the result back into the expression:
7⋅5
To find the answer, we multiply 7 by 5:
7⋅5 equals 35.
So, the answer to Line 1 is 35.
Now, let's move on to Line 2:
Line 2: 7⋅6−7⋅1
Again, we need to follow the order of operations. We start with the multiplications:
7⋅6 equals 42,
and 7⋅1 equals 7.
Now, we perform the subtractions from left to right:
42−7 equals 35.
Therefore, the answer to Line 2 is 35.
In summary:
Line 1: 7⋅(6−1) equals 35
Line 2: 7⋅6−7⋅1 equals 35