Answer:
[tex]1.)\\\text{a.) Increasing for $(2, \infty)$, Decreasing for $(-\infty, 2)$}\\\text{b.) Vertex: }(2, -4)\\\text{c.) $x$-intercepts: }0, 4\\\text{d.) $y$-intercept: }0\\\text{e.) axis of symmetry: } x = 2\\\text{f.) reflection of the $y$-intercept: } (4,0)\\\text{g.) f(1): } -3\\ \text{h.) What $x$-values will make $f(x) = -3$: } 1,3\\\text{i.) Range: } [-4, \infty)[/tex]
[tex]2.)\\\text{a.) Increasing for $(-\infty, -1)$, Decreasing for $(-1, \infty)$}\\\text{b.) Vertex: }(-1, 1)\\\text{c.) $x$-intercepts: }-2, 0\\\text{d.) $y$-intercept: }0\\\text{e.) axis of symmetry: } x = -1\\\text{f.) reflection of the $y$-intercept: } (-2,0)\\\text{g.) f(-3): } -3\\ \text{h.) What $x$-values will make $f(x) = -3$: } -3,1\\\text{i.) Range: }(-\infty, 1][/tex]
[tex]3.)\\\text{a.) Increasing for $(-\infty, -4)$, Decreasing for $(-4, \infty)$}\\\text{b.) Vertex: }(-4, 2)\\\text{c.) $x$-intercepts: }-5.5, -2.5\\\text{d.) $y$-intercept: }-14\\\text{e.) axis of symmetry: } x = -4\\\text{f.) reflection of the $y$-intercept: } (-8, -14)\\\text{g.) f(-7): } -6\\ \text{h.) What $x$-values will make $f(x) = 1$: } -5,-3\\\text{i.) Range: }(-\infty, 2][/tex]
Copyright © 2024 EHUB.TIPS team's - All rights reserved.
Answers & Comments
Answer:
[tex]1.)\\\text{a.) Increasing for $(2, \infty)$, Decreasing for $(-\infty, 2)$}\\\text{b.) Vertex: }(2, -4)\\\text{c.) $x$-intercepts: }0, 4\\\text{d.) $y$-intercept: }0\\\text{e.) axis of symmetry: } x = 2\\\text{f.) reflection of the $y$-intercept: } (4,0)\\\text{g.) f(1): } -3\\ \text{h.) What $x$-values will make $f(x) = -3$: } 1,3\\\text{i.) Range: } [-4, \infty)[/tex]
[tex]2.)\\\text{a.) Increasing for $(-\infty, -1)$, Decreasing for $(-1, \infty)$}\\\text{b.) Vertex: }(-1, 1)\\\text{c.) $x$-intercepts: }-2, 0\\\text{d.) $y$-intercept: }0\\\text{e.) axis of symmetry: } x = -1\\\text{f.) reflection of the $y$-intercept: } (-2,0)\\\text{g.) f(-3): } -3\\ \text{h.) What $x$-values will make $f(x) = -3$: } -3,1\\\text{i.) Range: }(-\infty, 1][/tex]
[tex]3.)\\\text{a.) Increasing for $(-\infty, -4)$, Decreasing for $(-4, \infty)$}\\\text{b.) Vertex: }(-4, 2)\\\text{c.) $x$-intercepts: }-5.5, -2.5\\\text{d.) $y$-intercept: }-14\\\text{e.) axis of symmetry: } x = -4\\\text{f.) reflection of the $y$-intercept: } (-8, -14)\\\text{g.) f(-7): } -6\\ \text{h.) What $x$-values will make $f(x) = 1$: } -5,-3\\\text{i.) Range: }(-\infty, 2][/tex]