Think about the commutative property of real-

Question

Think about the commutative property of real-

number operations as it applies to addition and
subtraction of functions. How do you think this
property might extend to multiplication and division
of functions?

Answer 1

AAAaannndd the bot gets it wrong yet again!

care to reconsider your answer for division?
2/3 ≠ 3/2

Answer 2

The commutative property of multiplication and division of functions states that the order of the functions does not matter when performing these operations. This means that for any two functions f and g, fg = gf and f/g = g/f.

Think about the commutative property of real-

AAAaannndd the bot gets it wrong yet again!

The commutative property of multiplication and division of functions states that the order of the functions does not matter when performing these operations. This means that for any two functions f and g, f*g = g*f and f/g = g/f.

The commutative property of multiplication and division of functions states that the order of the functions does not matter when performing these operations. This means that for any two functions f and g, fg = gf and f/g = g/f.