for each problem, find the: x and y intercepts, x-coordinates of the critical points, open intervals where…

for each problem, find the: x and y intercepts, x-coordinates of the critical points, open intervals where the function is increasing and decreasing, x-coordinates of the inflection points, open intervals where the function is concave up and concave down, and relative minima and maxima. using this information, sketch the graph of the function.\n1) ( y = -\frac{x^3}{3} + x^2 )
Answer
Explanation:
Step1: Find x-intercepts
Set $y=0$: $-\frac{x^3}{3} + x^2 = 0 \Rightarrow x^2(-\frac{x}{3} + 1) = 0 \Rightarrow x=0$ or $x=3$
Step2: Find y-intercept
Set $x=0$: $y=0$
Step3: Find critical points
First derivative: $y' = -x^2 + 2x$
Set $y'=0$: $-x(x-2)=0 \Rightarrow x=0$ or $x=2$
Step4: Determine increasing/decreasing
Test intervals:
$(-\infty,0)$: $y'<0$ (decreasing)
$(0,2)$: $y'>0$ (increasing)
$(2,\infty)$: $y'<0$ (decreasing)
Step5: Find relative extrema
$x=0$: decreasing→increasing (min)
$x=2$: increasing→decreasing (max)
Step6: Find inflection points
Second derivative: $y'' = -2x + 2$
Set $y''=0$: $-2x+2=0 \Rightarrow x=1$
Step7: Determine concavity
Test intervals:
$(-\infty,1)$: $y''>0$ (concave up)
$(1,\infty)$: $y''<0$ (concave down)
Answer:
x-intercepts: 0, 3
y-intercept: 0
Critical points: 0, 2
Increasing: (0,2); Decreasing: (-∞,0)∪(2,∞)
Relative min at x=0, relative max at x=2
Inflection point: 1
Concave up: (-∞,1); Concave down: (1,∞)
(Graph sketch: Plot intercepts (0,0),(3,0); min at (0,0), max at (2, 4/3); inflection at (1, 2/3); curve concave up left of x=1, concave down right of x=1.)