Keywords:
Division, quotient, polynomial, monomial
For this case we must solve a division between a polynomial and a monomial and indicate which is the quotient.
By definition, if we have a division of the form: [tex]\frac {a} {b} = c[/tex], the quotient is given by "c".
We have the following polynomial:
[tex]65y ^ 3 + 15y ^ 2 - 25y[/tex] that must be divided between monomy[tex]5y[/tex], then:
[tex]C (y)[/tex] represents the quotient of the division:
[tex]C (y) = \frac {65y ^ 3 + 15y ^ 2 - 25y} {5y}[/tex]
[tex]C (y) = \frac {65y ^ 3} {5y} + \frac {15y ^ 2} {5y} - \frac {25y} {5y}[/tex]
[tex]C (y) = 13y ^ 2 + 3y-5[/tex]
Thus, the quotient of the division between the polynomial and the monomial is given by:
[tex]C (y) = 13y ^ 2 + 3y-5[/tex]
Answer:
The quotient is: [tex]C (y) = 13y ^ 2 + 3y-5[/tex]
Option: A
