Question

Define Commutative law , Associative law , Distributive law In MULTIPLICATION.

Answer 1

The "Commutative Laws" say we can swap numbersover and still get the same answer ...
a × b  =  b × a

Example:
a × b  =  b × a


The "Associative Laws" say that it doesn't matter how we group the numbers (i.e. which we calculate first

(a × b) × c  =  a × (b × c)

The "Distributive Law" is the BEST one of all, but needs careful attention.
a × (b + c)  =  a × b  +  a × c
Hope it helps you
PLZ MARK AS BRAINLIEST

Answer 2

Answer:

• Commutative laws say we can swap numbers, and you still get the same number when you add, for example, a+b = b+a and same for multiplication.

• Associative laws say it does not matter how we group the number final value will remain the same, for example, (a+b)+c = (a+b)+c , and same for multiplication

• Distributive laws say that we can have the same answer while multiplying a number by a group of numbers added together or multiplying them separately and then add them, For example, a x ( b+c) = axb + axc