\Huge\blue{A}\times\green{B}=\pink?
Let's picture this problem by drawing \green{B} rows of \blue{A} circles.
How many circles are there?
\green{B} zeros, how much do we have in total?
\blue{A} zeros, how much do we have in total?
\green{B}, how much do we have in total?
\blue{A}, how much do we have in total?
\Huge\blue{A}\times\green{B}=\pink{C}
\Huge\blue{A}\times\green{?}=\pink{C}
\Huge\green{?}\times\blue{A}=\pink{C}
How many rows of \blue{A} circles do we need to make \pink{C} total circles?
We need \green{B} rows of \blue{A} circles to make \pink{C} total circles.
\blue{A} equals zero?
\blue{A} to get \pink{C}?
\Huge\blue{A}\times\green{B}=\pink{C}
\Huge\green{B}\times\blue{A}=\pink{C}