Now compare the one-sided limits at x=1:
x→1−limg(x)=25,x→1+limg(x)=25
These are equal and match the value at x=1 as concluded in the source solution.
So, g is continuous at x=1.
For differentiability, the source solution states that the expressions on the two sides of x=1 are different, so the left-hand derivative and right-hand derivative do not match. Therefore, g is not differentiable at x=1.
Therefore, the correct option is A: g is continuous but not differentiable at x=1.
Note: The question statement gives f(x)=x2+x2, but the solution works with f(x)=2x+x2. The extracted answer follows the solution, which explicitly concludes that the correct option is A.