1.Let g(x)=x2−(b+1)x+(b−1)g(x) = x^2 - (b + 1)x + (b - 1)g(x)=x2−(b+1)x+(b−1), where bbb is a real parameter. The largest natural number bbb satisfying g(x)>−2g(x) > -2g(x)>−2 ∀\forall∀ x∈Rx \in \mathbb{R}x∈R, is -a.111b.222c.333d.444Login to continueOnly logged in users canattempt or see the solution.