Asked by anyone
Complete the following stepped-out solution to show that −7+[(8⋅m)⋅1/8]+7 is equivalent to m .%C2%A0(2 points) −7+%C2%A0%C2%A0+[(8⋅m)⋅1/8] Commutative Property of Addition +[(8⋅m)⋅1/8] Inverse Property of Addition (8⋅m)⋅1/8 Identity Property of Addition (8⋅)⋅%C2%A0m Associative Property of Multiplication (%C2%A0)⋅m%C2%A0 Inverse Property of Multiplication m Identity Property of Multiplication
Answers
Answered by
anyone
Apply the Associative Property of Multiplication:
= (8⋅__)⋅m
Apply the Inverse Property of Multiplication:
= (__)⋅m
Apply the Identity Property of Multiplication:
= m
Therefore, −7+[(8⋅m)⋅1/8]+7 is equivalent to m.
= (8⋅__)⋅m
Apply the Inverse Property of Multiplication:
= (__)⋅m
Apply the Identity Property of Multiplication:
= m
Therefore, −7+[(8⋅m)⋅1/8]+7 is equivalent to m.
Answered by
anyone
Apply the Associative Property of Multiplication:
= (8⋅__)⋅m
= (8⋅__)⋅m
Answered by
anyone
what number goes in that blank bot
Apply the Associative Property of Multiplication:
= (8⋅__)⋅m
Apply the Associative Property of Multiplication:
= (8⋅__)⋅m
Answered by
GPT 3.5
−7+[(8⋅m)⋅1/8]+7
Apply the Commutative Property of Addition:
= -7 + 7 + [(8⋅m)⋅1/8]
Apply the Inverse Property of Addition:
= 0 + [(8⋅m)⋅1/8]
Apply the Identity Property of Addition:
= [(8⋅m)⋅1/8]
Apply the Associative Property of Multiplication:
= (8⋅m)⋅(1/8)
Apply the Inverse Property of Multiplication:
= (8⋅m)⋅(1/8)
Apply the Identity Property of Multiplication:
= m
Therefore, −7+[(8⋅m)⋅1/8]+7 is equivalent to m.
Apply the Commutative Property of Addition:
= -7 + 7 + [(8⋅m)⋅1/8]
Apply the Inverse Property of Addition:
= 0 + [(8⋅m)⋅1/8]
Apply the Identity Property of Addition:
= [(8⋅m)⋅1/8]
Apply the Associative Property of Multiplication:
= (8⋅m)⋅(1/8)
Apply the Inverse Property of Multiplication:
= (8⋅m)⋅(1/8)
Apply the Identity Property of Multiplication:
= m
Therefore, −7+[(8⋅m)⋅1/8]+7 is equivalent to m.
Answered by
GPT 3.5
Your completion of the solution is correct. Here is the revised stepped-out solution:
−7+[(8⋅m)⋅1/8]+7
Apply the Commutative Property of Addition:
= -7 + 7 + [(8⋅m)⋅1/8]
Apply the Inverse Property of Addition:
= 0 + [(8⋅m)⋅1/8]
Apply the Identity Property of Addition:
= [(8⋅m)⋅1/8]
Apply the Associative Property of Multiplication:
= (8⋅m)⋅(1/8)
Apply the Inverse Property of Multiplication:
= (1)⋅m
Apply the Identity Property of Multiplication:
= m
Therefore, −7+[(8⋅m)⋅1/8]+7 is equivalent to m.
−7+[(8⋅m)⋅1/8]+7
Apply the Commutative Property of Addition:
= -7 + 7 + [(8⋅m)⋅1/8]
Apply the Inverse Property of Addition:
= 0 + [(8⋅m)⋅1/8]
Apply the Identity Property of Addition:
= [(8⋅m)⋅1/8]
Apply the Associative Property of Multiplication:
= (8⋅m)⋅(1/8)
Apply the Inverse Property of Multiplication:
= (1)⋅m
Apply the Identity Property of Multiplication:
= m
Therefore, −7+[(8⋅m)⋅1/8]+7 is equivalent to m.
Answered by
GPT 3.5
You are correct. Let's revise that part of the solution:
Apply the Associative Property of Multiplication:
= 8⋅(m⋅1/8)
Thank you for pointing out the error.
Apply the Associative Property of Multiplication:
= 8⋅(m⋅1/8)
Thank you for pointing out the error.
Answered by
GPT 3.5
I apologize for the confusion in my previous responses.
To correctly apply the Associative Property of Multiplication, we need to fill in the blank with the expression inside the parentheses. In this case, the expression is already in the correct form for the Associative Property of Multiplication.
Therefore, the correct step is:
= (8⋅m)⋅1/8
Thank you for your patience.
To correctly apply the Associative Property of Multiplication, we need to fill in the blank with the expression inside the parentheses. In this case, the expression is already in the correct form for the Associative Property of Multiplication.
Therefore, the correct step is:
= (8⋅m)⋅1/8
Thank you for your patience.