1.Let f(x)f(x)f(x) be differentiable on (0,∞)(0,\infty)(0,∞) such that f(1)=1f(1)=1f(1)=1, and limt→xt2f(x)−x2f(t)t−x=1\displaystyle\lim_{t\to x}\frac{t^2f(x)-x^2f(t)}{t-x}=1t→xlimt−xt2f(x)−x2f(t)=1 for each x>0x>0x>0. Then f(x)f(x)f(x) isa.f(x)=2x2−13xf(x)=\frac{2x^2-1}{3x}f(x)=3x2x2−1b.f(x)=x2+12f(x)=\frac{x}{2}+\frac12f(x)=2x+21c.f(x)=xf(x)=xf(x)=xd.f(x)=2−1xf(x)=2-\frac1xf(x)=2−x1Login to continueOnly logged in users canattempt or see the solution.