Answer:
9.5
Step-by-step explanation:
Substitute a = 5 and b = 1 into the expression
=
=
=
= 9.5
Answer:There is an app that helps you with this stuff.
Step-by-step explanation:
F is continuous every-where. But it is not differentiable at two points. Note <span>it is not differentiable at </span><span>x = 0</span><span> and </span><span>x = 1! I mean just consider </span>f(x)= ∣x∣+∣x − 1∣
If you need me to expand let me explain it a bit more.
If you define a function f(x) so that f(x) = |x| for x<0. f(x) = sinx for 0 ≤ x < 22/7, We have f(x) = |x - 22/7| for x ≥ 22/7 then we can say this function is continuous however it will still have two points that are not differentiable. This would be for |x|