Question

How do you find the roots, real and imaginary, of `y= 2(x+1)^2-(x-4)^2` using the quadratic formula?

Answer 1

`x = -6 + 5sqrt(2) " or " x = -6 - 5sqrt(2)`

Explanation:

Need to expand out the brackets:

`y = 2(x^2 + 2x + 1) - (x^2 - 8x + 16)`

`y = x^2+12x - 14`

The roots of a quadratic of the form

`ax^2 + bx + c`

given by

`x = (-b +- sqrt(b^2 - 4ac))/(2a)`\

In this case `a = 1, b = 12, c = -14`

`x = (-12 +- sqrt(144 -4(1)(-14)))/2 = (-12+-sqrt(144+56))/2`

`x = (-12+-sqrt(200))/2`

`x = (-12 +- sqrt(100)sqrt(2))/2 = (-12+-10sqrt(2))/2`

`therefore x = -6 + 5sqrt(2) " or " x = -6 - 5sqrt(2)`