Question

Show that the following functions are not differentiable at the indicated value of x.

`f(x) = {{:(3x",", x < 0),(-4x",", x ≥ 0):}` , x = 0

Answer 1

First we find the left limit of f(x) at x = 0

When x = 0^–, then x < 0

∴ f(x) = 3x

f(0) = 3 × 0 = 0

`f"'"(0^-) =  lim_(x -> 0^-) (f(x) - f(0))/(x - 0)`

= `lim_(x -> 0^-) (3x - 0)/x`

= `lim_(x -> 0^-) (3)` = 3  .........(1)

Next we find the right limit of f(x) at x = 0

When x = 0⁺, then x ≥ 0

∴ f(x) = – 4x

f(0) = – 4 × 0 = 0

`f"'"(0^+) =  lim_(x -> 0^+) (f(x) - f(0))/(x - 0)`

= `lim_(x -> 0^+) (- 4x - 0)/x`

= `lim_(x -> 0^+) (-4x)/x`

= `lim_(x -> 0^+) (- 4)` = – 4  .........(2)

From equations (1) and (2), we get

f'(0^–) ≠ f'((0⁺)

∴ f(x) is not differentiable at x = 0