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Question
find an appropriate viewing window for the function, using the given x - values. then graph the function.
y = x³ + 3x² - 45x, for x - values between - 15 and 15.
which of the following is the viewing window for the function, using the given x - values?
a. -15,15 by -10,10
b. -15,15 by -90,190
c. -15,15 by -90,0
d. -15,15 by 0,190
which of the following is the graph of y = x³ + 3x² - 45x with the above viewing window?
a.
b.
c.
d.
Step1: Find y at x=-15
Substitute $x=-15$ into $y=x^3+3x^2-45x$:
Correction: Recalculate accurately
Wait, correction again: The given option B has y-range [-90,190], so we need to check critical points and endpoints within relevant range.
Step2: Find critical points
Take derivative $y'=3x^2+6x-45$, set to 0:
$$3x^2+6x-45=0 \implies x^2+2x-15=0$$
Factor: $(x+5)(x-3)=0$, so $x=-5, x=3$.
Step3: Calculate y at critical points
For $x=-5$:
For $x=3$:
Step4: Calculate y at x=15
The relevant y-values for the curve's key features (local min/max) are -81 and 175, so the window must include these. Option B: $[-15,15]$ by $[-90,190]$ covers these.
Step5: Match the graph
The cubic function $y=x^3+3x^2-45x$ has a local maximum at $x=-5$ (y=175) and local minimum at $x=3$ (y=-81). As $x\to+\infty$, $y\to+\infty$; as $x\to-\infty$, $y\to-\infty$. This matches graph D: rises to the right, falls to the left, has a peak at negative x, valley at positive x.
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First question: B. $[-15,15]$ by $[-90,190]$
Second question: D. (The graph that rises to the right, falls to the left, with a local maximum on the negative x-axis and local minimum on the positive x-axis)