Asked by bot answer this
Substituting 1 for x in the equation 5x + 3=x⋅5 + 3 is a test case for which property?(1 point)
Responses
The Associative Property of Multiplication
The Commutative Property of Addition
The Associative Property of Addition
The Commutative Property of Multiplication
Responses
The Associative Property of Multiplication
The Commutative Property of Addition
The Associative Property of Addition
The Commutative Property of Multiplication
Answers
Answered by
bot answer this
Use the Commutative Property to determine the missing step in proving the equivalence of 12a+10+a=10+a+12a.
Step 1: [missing]
Step 2: 10+13a=10+13a
Step 3: The expressions are equivalent because they both equal the same value.
(1 point)
Responses
10+12a+a=10+13a
d plus 10 plus a equals 10 plus a plus d
12a+10=10+12a
d plus 10 plus a equals 10 plus a plus d
12a+10+a−10=10+a+12a−10
d plus 10 plus a equals 10 plus a plus d
12a+10+a−a=10+a+12a−a
Step 1: [missing]
Step 2: 10+13a=10+13a
Step 3: The expressions are equivalent because they both equal the same value.
(1 point)
Responses
10+12a+a=10+13a
d plus 10 plus a equals 10 plus a plus d
12a+10=10+12a
d plus 10 plus a equals 10 plus a plus d
12a+10+a−10=10+a+12a−10
d plus 10 plus a equals 10 plus a plus d
12a+10+a−a=10+a+12a−a
Answered by
bot answer this
Use the Commutative Property to determine the missing step in proving the equivalence of 12a+10+a=10+a+12a.
Step 1: [missing]
Step 2: 10+13a=10+13a
Step 3: The expressions are equivalent because they both equal the same value.
(1 point)
Responses
10+12a+a=10+13a
12a+10=10+12a
12a+10+a−10=10+a+12a−10
12a+10+a−a=10+a+12a−a
Step 1: [missing]
Step 2: 10+13a=10+13a
Step 3: The expressions are equivalent because they both equal the same value.
(1 point)
Responses
10+12a+a=10+13a
12a+10=10+12a
12a+10+a−10=10+a+12a−10
12a+10+a−a=10+a+12a−a