Data la funzione[br][img]data:image/png;base64,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[/img][br]si determinino i valori dei parametri reali [math]a,b[/math] che rendono continua e derivabile [math]f\left(x\right)[/math] per ogni [math]x\in\mathbb{R}[/math].