How do you convert $8 = {(3 x - y)}^{2} + y - 5 x$ $8=(3x-y)^2+y-5x$ into polar form?

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How do you convert $8 = {(3 x - y)}^{2} + y - 5 x$ $8=(3x-y)^2+y-5x$ into polar form?

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Answer 1 · 2016-12-09T16:26:35

$r^{2} {(3 cos θ - sin θ)}^{2} + r (sin θ - 5 cos θ) - 8 = 0$ $r^2(3cos theta-sin theta)^2+r(sin theta-5cos theta)-8=0$ representing a small-size parabola-

Explanation:

As the second degree terms form a perfect square, the equation

represents a parabola.

The conversion formula is #(x, y) = r(cos theta, sin theta).

Substitutions give the form given in the answer,

It is incredible but true. This equation would reduce to the simple

form

$2 \frac{a}{r} = 1 + cos θ$ $2a/r=1+cos theta$

referred to the focus as pole ( r = 0 ) and the axis, $\to$ $rarr$ vertex, as

$θ = 0$ $theta = 0$ . Here, ( the focus-vertex distance ) a is the size of the

parabola

graph{(3x-y)^2+y-5x-8=0 [-40, 40, -20, 20]}

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How do you convert $8 = {(3 x - y)}^{2} + y - 5 x$ $8=(3x-y)^2+y-5x$ into polar form?

1 Answer

Explanation:

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Science

Math

Humanities

... and beyond

How do you convert 8=(3x-y)^2+y-5x8=(3x−y)2+y−5x8=(3x-y)^2+y-5x into polar form?

1 Answer

Explanation:

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How do you convert $8 = {(3 x - y)}^{2} + y - 5 x$ $8=(3x-y)^2+y-5x$ into polar form?