How do you convert $r=tan(theta)sec(theta)$ into cartesian form?

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How do you convert $r=tan(theta)sec(theta)$ into cartesian form?

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Answer 1 · 2016-01-08T10:30:20

By substitution $y = x^2$

Explanation:

First convert the expression into terms of $cos(theta)$ and $sin(theta)$
$r = sin(theta)/cos(theta) *1/cos(theta)$
$rcos^2(theta) = sin(theta)$
Now the normal substitutions are $x=rcos(theta)$ and $y=rsin(theta)$
$:. sin(theta) = y/r$ and $cos(theta) = x/r$

Substituting these values into the expression above gives
$r*(x/r)^2 = y/r$
$cancel(r)*x^2/r^cancel(2) = y/r$
$x^2 = r*y/r = y$
$:.y = x^2$

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How do you convert $r=tan(theta)sec(theta)$ into cartesian form?

1 Answer

Explanation:

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How do you convert r=tan(theta)sec(theta)r=tan(theta)sec(theta) into cartesian form?

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Explanation:

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How do you convert $r=tan(theta)sec(theta)$ into cartesian form?