Answer:
Monomial [tex]0.0001\cdot a^8\cdot x^4[/tex] is a square of monomial [tex]0.01\cdot a^4\cdot x^2[/tex]
Step-by-step explanation:
Given monomial [tex]0.0001\cdot a^8\cdot x^4[/tex]
Using property [tex](a^m)^n=a^{m\cdot n},[/tex] note that
[tex]0.0001=(0.01)^2\\ \\a^8=(a^4)^2\\ \\x^4=(x^2)^2[/tex]
So,
[tex]0.0001\cdot a^8\cdot x^4=(0.01)^2\cdot (a^4)^2\cdot (x^2)^2.[/tex]
Now use property [tex](a\cdot b)^n=a^n\cdot b^n[/tex] to rewrite the previous expression:
[tex](0.01)^2\cdot (a^4)^2\cdot (x^2)^2=(0.01\cdot a^4\cdot x^2)^2[/tex]
Hence, monomial [tex]0.0001\cdot a^8\cdot x^4[/tex] is a square of monomial [tex]0.01\cdot a^4\cdot x^2[/tex]
