what is the end behavior of the graph of the polynomial function $f(x) = 3x^6 + 30x^5 + 75x^4$?\nas $x \\to…

what is the end behavior of the graph of the polynomial function $f(x) = 3x^6 + 30x^5 + 75x^4$?\nas $x \\to -\\infty, y \\to -\\infty$ and as $x \\to \\infty, y \\to -\\infty$.\nas $x \\to -\\infty, y \\to -\\infty$ and as $x \\to \\infty, y \\to \\infty$.\nas $x \\to -\\infty, y \\to \\infty$ and as $x \\to \\infty, y \\to -\\infty$.\nas $x \\to -\\infty, y \\to \\infty$ and as $x \\to \\infty, y \\to \\infty$.
Answer
Explanation:
Step1: Identify degree and leading coefficient
The polynomial is $f(x) = 3x^6 + 30x^5 + 75x^4$. Degree $n=6$ (even), leading coefficient $a=3$ (positive).
Step2: Apply end behavior rules
For even degree, $x\to\pm\infty$: $x^6\to\infty$. Multiply by positive $3$: $3x^6\to\infty$. Lower terms become negligible.
Answer:
D. As $x \to -\infty, y \to \infty$ and as $x \to \infty, y \to \infty$.