Increasing and decreasing functions

f is increasing if f'(x) > 0 for all x in that interval. As x gets bigger, f(x) gets bigger — the graph goes UP.

f is decreasing if f'(x) < 0 for all x in that interval. As x gets bigger, f(x) gets smaller — the graph goes DOWN.

1) Find f'(x). 2) Solve f'(x) = 0 — these are the critical x-values. 3) Test a value in each interval: if f'(x) > 0, increasing; if f'(x) < 0, decreasing.

f'(x) = 2x − 4. Critical point: x = 2. For x < 2: f'(x) < 0 → DECREASING. For x > 2: f'(x) > 0 → INCREASING.

It marks the boundary between increasing and decreasing. At that point, the function is momentarily flat — it is a critical (stationary) point.

Draw a number line. Mark critical x-values. Pick one test x in each interval, evaluate f'(x). Label each interval + (increasing) or − (decreasing).

f'(x) = −2x + 6. Substitute x = 2: f'(2) = 2 > 0. Yes — f is increasing at x = 2.

The function is increasing for all x. It never turns around. Example: f(x) = x³ has f'(x) = 3x² ≥ 0 but is still overall increasing.