What is the equation of the tangent line of $r=-5cos(-theta-(pi)/4) + 2sin(theta-(pi)/12)$ at $theta=(-5pi)/12$ ?

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What is the equation of the tangent line of $r=-5cos(-theta-(pi)/4) + 2sin(theta-(pi)/12)$ at $theta=(-5pi)/12$ ?

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Answer 1 · 2017-10-06T04:54:27

See explanation

Explanation:

Recall that in polar coordinates, you have $x = r*cosθ, y=r*sinθ$ . The equation for the slope of tangent line to the curve at any given point is still $dy/dx$ , despite being in polar coordinates. Since y and x are functions of r and θ, this means...

$dy/dx = (dy/(dθ))/(dx/(dθ)) = ((dr)/(dθ)sinθ + rcosθ)/((dr)/(dθ)cosθ - rsinθ)$ .

Since $r(θ) = -5cos(-θ-pi/4) + 2sin(θ-pi/12), (dr)/(dθ) = -5sin(-θ-pi/4) + 2 cos(θ-pi/12)$ ...

Then...

Answer 2 · 2017-10-06T13:11:08

The polar equation is invalid when $theta = -(5pi)/12$

Explanation:

We have a polar equation:

$r = -5cos(-theta-pi/4) + 2sin(theta-pi/12)$

When $theta = -(5pi)/12$ we have:

$r = -5cos(pi/6) + 2sin(-pi/2)$
$\ \ = -(5sqrt(3))/2-2$
$\ \ ~~-6$

Hence, The polar equation is invalid when $theta = -(5pi)/12$

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What is the equation of the tangent line of $r=-5cos(-theta-(pi)/4) + 2sin(theta-(pi)/12)$ at $theta=(-5pi)/12$ ?

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Explanation:

Explanation:

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What is the equation of the tangent line of r=-5cos(-theta-(pi)/4) + 2sin(theta-(pi)/12)r=-5cos(-theta-(pi)/4) + 2sin(theta-(pi)/12) at theta=(-5pi)/12theta=(-5pi)/12?

2 Answers

Explanation:

Explanation:

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What is the equation of the tangent line of $r=-5cos(-theta-(pi)/4) + 2sin(theta-(pi)/12)$ at $theta=(-5pi)/12$ ?