Simplify: \$(a^2) \div (3b) \div (2a) \div (b^2)\$.

The given expression is

\$(a^2) \div (3b) \div (2a) \div (b^2)\$

To simplify, you multiply the numerators by the reciprocal of the denominators

\$(a^2) \div (3b) \times (b^2) \div (2a)\$

Now, multiply the numerators and denominators:

\$(a^2) \times(b^2) \div (3b) \times (2a)\$

Therefore, the simplified exression is:

\$(ab^2) \div (6)\$

This answer is correct because the simplified expression is \$(ab^2) \div(6)\$

\$(ab^2) \div(6)\$

This answer is incorrect because the simplified expression is \$(ab^2) \div(6)\$, not \$(2ab^2) \div(6)\$

\$(2ab^2) \div(6)\$

This answer is incorrect because the simplified expression is \$(ab^2) \div(6)\$, not \$(3ab^2) \div(6)\$

\$(3ab^2) \div(6)\$

This answer is incorrect because the simplified expression is \$(ab^2) \div(6)\$, not \$(4ab^2) \div(6)\$

\$(4ab^2) \div(6)\$

Option

A

Can you summarize what you’ve understood in the above steps?