Answer:
Third option.
Step-by-step explanation:
The greatest common factor (GCF) for a polynomial is defined as the largest monomial that divides each term.
Given the polynomial [tex]10x^5+15x^4-25x^3[/tex], the GCF of the coefficients can be found by descompose each one of them into their prime factors:
[tex]10=2*5\\15=2*5\\25=5*5[/tex]
You can observe that the GCF of the coefficients is:
[tex]GFC_{(coefficients)}=5[/tex]
Now you need to find the GCF of the variables. You can notice that each term has at least one x³, then:
[tex]GFC_{(variables)}=x^3[/tex]
Threfore, the GCF of the polynomial is:
[tex]GCF=5x^3[/tex]
