Question

How do you solve `(10y^2-13y-30)/(2y^5-50y^3)<0`?

Answer 1

Solution is `-oo< y< -5` or `-6/5< y< 0` or `5/2< y< 5`.

Explanation:

`(10y^2-13y-30)/(2y^5-50y^3)`

= `(10y^2-25y+12y-30)/(2y^3(y^2-25)`

= `(5y(2y-5)+6(2y-5))/(2y^3(y+5)(y-5))`

= `((5y+6)(2y-5))/(2y^3(y+5)(y-5))`

Hence, `f(y)=(10y^2-13y-30)/(2y^5-50y^3)<0`

`hArrf(y)=((5y+6)(2y-5))/(2y^3(y+5)(y-5))<0`
`:.` zeros of numerator and denominators are

`{-5,-6/5,0,5/2,5}` and they divide real number line in `6` intervals.

In `-oo< y< -5`, all monomials are negative and hence `f(y)<0`

In `-5< y< -6/5`, while `(y+5)` is positive, all other monomials are negative and hence `f(y)>0`

In `-6/5< y< 0`, while `(y+5)` and `(5y+6)` are positive, all other monomials are negative and hence `f(y)<0`

In `0< y< 5/2`, while `(y+5)`, `(5y+6)` and `y` are positive, `(2y-5)` and `(y-5)` are negative and hence `f(y)>0`

In `5/2< y< 5`, while `(y+5)`, `(5y+6)`, `y` and `(2y-5)` are positive, `(y-5)` is negative and hence `f(y)<0`

and in `5< y< oo`, all monomials are positive and hence `f(y)>0`

Hence solution is `-oo< y< -5` or `-6/5< y< 0` or `5/2< y< 5`.
graph{(10x^2-13x-30)/(2x^5-50x^3) [-10, 10, -2, 2]}