Answer:
[tex]9x^8y^{12}[/tex]
Step-by-step explanation:
The expression is:
[tex](3xy^3)^2(xy)^6[/tex]
we use the following rule to simplify the expression:
[tex](a^m)^n=a^{m*m}[/tex]
that is, we multiply the exponent inside the parentheses by the exponent outside the parentheses (also using [tex]x=x^1[/tex]):
[tex]3^2x^{1*2}y^{3*2}x^{1*6}y^{1*6}[/tex]
and we simplify the exponents and substitute [tex]3^2=9[/tex]:
[tex]9x^2y^6x^6y^6[/tex]
We have not finished simplifying yet, since we have that x and y are repeated we must use the following law of exponents:
[tex]a^ma^n=a^{m+n}[/tex]
We add the exponents that each variable has.
thus, the expression becomes:
[tex]9x^{2+6}y^{6+6}[/tex]
and we simplify the exponents:
[tex]9x^8y^{12}[/tex]
which is the fourth option
