Question

I choose a random integer `n` between `1` and `10` inclusive. What is the probability that for the `n` I chose, there exist no real solutions to the equation `x(x+5) = -n`? Express your answer as a common fraction.

~ Question from AoPS ~

Background Information
Subject: Algebra
Focus: Percents
*Review Problem

Answer 1

`color(blue)(2/5)`

Explanation:

`x(x+5)=-n`

Expand:

`x^2+5x+n=0`

We need the solutions to this equation to be non-real.

Using the discriminant of a quadratic:

`bb(b^2-4ac)`

If:

`b^2-4ac> 0` The equation has two real solutions.

`b^2-4ac= 0` The equation has repeated real solutions.

`b^2-4ac< 0` The equation has non-real solutions.

We need the last situation.

From equation:

`(5)^2-4(1)(n)<0`

`25-4n<0`

`n>25/4`

So for the equation to have no real solutions:

`n>24/4=6.25`

We are choosing integers so n would have to be:

`7, 8 , 9, 10`

So for the probability of this we have:

`("favourable outcomes")/("all possible outcomes")=4/10=2/5`