A line is parameterized by x=2+6???? and y=4+3????. (a) Which of the following points are on the section of the line obtained by restricting ???? to nonnegative numbers (for each, enter Y if the point is on the section, and N if not)? (−28,−11) : (8,7) : (26,16) : Then, give one more point that is on the section of the line obtained by this restriction: (b) What are the endpoints of the line segment obtained by restricting ???? to −2≤????≤1? left endpoint : right endpoint : (c) How should ???? be restricted to give the part of the line above the x-axis (give your answer as an interval for ????, for example, (3,8) or [-2,Inf))? ???? must be in :

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AlonsoDehner AlonsoDehner · Answer 1 · 2019-12-02T11:24:44+01:00

Answer:

No, yes, yes

(-28,-11) and (8.7)

[tex][tex][\frac{-4}{3} ,\infty)[/tex]}[/tex]

Step-by-step explanation:

Given that a line in two dimension is parametrized by

[tex]x=2+6t \\y = 4+3t[/tex]

a) If t is non negative, then (-28,-11) cannot lie on that part

(-28,-11) No because t =-5

(8,7) yes because t =1

(26,16) yes because t = 4

b) when t lies between -2 and 1

we have left end point as

[tex]x=2+6(-2) = -10\\y = 4+3(-2) = -2\\[/tex]

(-10,-2) is left end point

Right end point is when t =1 i.e.

(8,7)

c) when the points should be above x axis, y should be non negative

i.e. [tex]y=4+3t\geq 0\\t\geq [/tex]

So t should lie in the interval

[tex][\frac{-4}{3} ,\infty)[/tex]}