Answer:
[tex]18p^3r[/tex]
and [tex]63p^3[/tex]
Step-by-step explanation:
We have to check which term and [tex]45p^4q[/tex] has GCF [tex]9p^3[/tex]
GCF of [tex]18p^3r[/tex]
and [tex]45p^4q[/tex]= [tex]9p^3[/tex]
GCF of [tex]27p^4q[/tex]
and [tex]45p^4q[/tex]= [tex]9p^4q[/tex]
GCF of [tex]36p^3q^6[/tex]
and [tex]45p^4q[/tex]= [tex]9p^3q[/tex]
GCF of [tex]63p^3[/tex]
and [tex]45p^4q[/tex]= [tex]9p^3[/tex]
GCF of [tex]72p^3q^6[/tex]
and [tex]45p^4q[/tex]= [tex]9p^3q[/tex]
Hence, the correct answer is:
[tex]18p^3r[/tex]
and [tex]63p^3[/tex]
