NO LINKS!! Find the function value, if possible. (If the answer is undefined, enter UNDEFINED.) f(x) = |x|/x a. f(x -1) { ___ if x < _ { _ if x > ___

Question

asked Oct 19, 2023 230k views

2 Answers

Joe Love · Answer 1 · 2023-10-21T21:52:51+0000

Answer:

$f(x-1) \begin{cases}-1\;\; \text{if}\;\;x < 1\\\;\:\:1\;\; \text{if}\;\;x > 1\end{cases}$

Explanation:

Given function:

f(x)=(|x|)/(x)

Therefore:

f(x-1)=(|x-1|)/(x-1)

The function is undefined when the denominator is zero.

Therefore, the function is undefined when x = 1.

As the numerator is an absolute value it is always positive.

$\textsf{When}\;\;x < 1 \implies f(-x-1)=(|-x-1|)/(-x-1)=(|-(x+1)|)/(-(x+1))=(|x+1|)/(-(x+1))=-1$

$\textsf{When}\;\;x > 1 \implies f(x-1)=(|x-1|)/(x-1)=1$

Sumanth · Answer 2 · 2023-10-25T06:18:30+0000

Answer:

-----------------------------------

Given function:

The function f(x - 1) is:

The absolute value is always positive in this case and can't be zero otherwise it is undefined.

When x - 1 > 0, both the numerator and denominator are positive with same value so:

When x - 1 < 0, the numerator is positive and denominator is negative with same value so: