[tex]f:\mathbb{R}\to \mathbb{R},\quad f(x) = \left\{\begin{array}{II}x^2+ax,~~x\leq 1\\ \\ x^2+a^2,~x> 1~ \end{array}\right\\ \\ \text{Pentru } x< 1:\\ x^2+ax\text{ functie elementara continua si derivabila pe }(-\infty,1)\\ \\ \text{Pentru }x > 1: \\ x^2+a^2 \text{ functie elementara continua si derivabila pe } (1,+\infty)[/tex]
[tex]\text{Studiem continuitatea in punctul x = 1:} \\ \\ x^2+ax\Big|_{x=1} = x^2+a^2\Big|_{x=1} = f(1) \\ \\ 1+a = 1+a^2 \Rightarrow a(a-1) = 0 \Rightarrow a\in \{0,1\}[/tex]
[tex]\text{Studiem derivabilitatea in punctul x = 1:}\\\\\text{Pentru }x \neq 1,~~ f'(x) = \left\{\begin{array}{II}2x+a,~~x < 1\\ \\ 2x~~~~~,~x> 1~ \end{array}\right\\ \\ \text{Functia este derivabila in punctul x = 1 daca:} \\ \\ 2x+a\Big|_{x=1} = 2x\Big|_{x=1} \Rightarrow 2+a = 2 \Rightarrow a = 0[/tex]
[tex]\Rightarrow a\in \{0,1\} \cap \{0\} \Rightarrow \boxed{a = 0}[/tex]
