Question

If `x=2` is a zero of `x^3-(k+1)x+k` then what is the value of `k` ?

Answer 1

`k=6`

Explanation:

Substitute `x=2` into the given cubic equation to get:

`0 = 2^3-(k+1)(2)+k`

`color(white)(0) = 8-2k-2+k`

`color(white)(0) = 6-k`

So:

`k = 6`

With `k = 6` and `x = 2` a zero, `(x-2)` is a factor and we have:

`x^3-(k+1)x+k = x^3-7x+6`

`color(white)(x^3-(k+1)x+k) = (x-2)(x^2+2x-3)`

`color(white)(x^3-(k+1)x+k) = (x-2)(x-1)(x+3)`

So the other two roots are `x=1` and `x=-3`