Question

How do you find the discriminant, describe the number and type of root, and find the exact solution using the quadratic formula given `9x^2-6x-4=-5`?

Answer 1

The solution is `S={1/3}`

Explanation:

Let's rewrite the quadratic equation in the form

`ax^2+bx+c=0`

`9x^2-6x-4+5=0`

`9x^2-6x+1=0`

Let's calculate the discriminant

`Delta=b^2-4ac=(-6)^2-4*9*1=36-36=0`

As, `Delta=0`, we have a double real root

`x=(-b+-sqrtDelta)/(2a)=-b/(2a)=6/18=1/3`

We can also factorise the quadratic equation

`9x^2-6x+1=(3x-1)(3x-1)=(3x-1)^2`

graph{(3x-1)^2 [-1.717, 2.128, -0.713, 1.209]}