The main properties we use in this problem are:
i) [tex]x^a \cdot x^b=x^{a+b}[/tex] (so, when we multiply 2 exponents of the same base, we add the exponents)
ii) [tex]({x^a})^b=x^{a \cdot b}=x^{ab}[/tex]
thus,
[tex](x^m \cdot x^2)^3=({x^{2m}})^3=x^{2m \cdot3}=x^{6m}[/tex]
by first applying property i) then property ii)
also, [tex]({k}^3)^5=k^{15}[/tex], by property ii)
So we have:
[tex]({x^m \cdot x^2})^3 \cdot({k}^3)^5=x^{21} \cdot k^{15}\\\\x^{6m}\cdot k^{15}=x^{21} \cdot k^{15}[/tex],
now we only have to compare the exponents.
6m must be equal to 21,
thus m=21/6=7/2
Answer: m=7/2
