2 Answers

Jonathan Shay · Answer 1 · 2020-04-15T05:01:19+0000

There are infinite possible graphs for each of the questions. I am assuming that the purpose of this assignment is to get you to graph different types of equations and then transform them (by shifting to the left, right, up, down and/or stretching them) in order to see how the graphs move. I suggest you do this because it will be helpful for you to understand transformations.

Here are the answers and possible graphs. I have attached a snapshot of the maximum number of intersections for each graph.

a) They can intersect 0, 1, or 2 times

$\begin {array}c\underline{Intersections}&\underline{Line}&\underline{Parabola}\\ 0&y=x&y=x^2+2\\1&y=2&y=x^2+2\\2&y=x&y=x^2-2\\\end{array}$

b) They can intersect 0, 1, or 2 times

$\begin {array}l\underline{Intersections}&\underline{Parabola\ 1}&\underline{Parabola\ 2}\\0&y=x^2+2&y=-x^2-2\\1&y=x^2-2&y=(x-2)^2\\2&y=x^2-2&y=(1)/(2)x^2\\\end{array}$

c) They can intersect 0, 1, 2, 3, or 4 times

$\begin {array}\underline{Intersections}&\underline{Parabola}&\underline{\qquad Circle\qquad }\\0&y=x^2+1&x^2+(y-4)^2=4\\\\1&y=x^2-2&x^2+(y-4)^2=4\\\\2&y=x^2-3&x^2+(y-4)^2=4\\\\3&y=x^2&x^2+(y-(22)/(5))^2=4\\\\4&y=x^2-2&x^2+(y-2)^2=9\\\end{array}$

d) They can intersect 0, 1, 2, or 3 times

$\begin {array}l\underline{Intersections}&\underline{\quad Parabola\quad }&\underline{Hyperbola}\\0&y=(x+5)^2+1&y=1/x\\1&y=x^2+2&y=1/x\\2&y=(x+5)^2-2&y=1/x\\3&y=x^2-4&y=1/x\\\end{array}$

Can someone please help? just need help with the possibilities...-example-1

Can someone please help? just need help with the possibilities...-example-2

Can someone please help? just need help with the possibilities...-example-3

Can someone please help? just need help with the possibilities...-example-4

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