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Nathalie · Answer 1 · 2020-01-23T00:33:37+0000

Answer:

Assume that
and
are constants. The slope of the line will be equal to

$\displaystyle -(cos((a)))/(sin((a))) = \cot{(a)}$ if
$sin(a) \\e 0$ ;
Infinity if
.

Explanation:

Rewrite the expression of the line to express
in terms of
and the constants.

Substract
$x\cdot cos((a))$ from both sides of the equation:

y sin((a)) = p - xcos((a)) .

In case
$sin(a) \\e 0$ , divide both sides with
sin(a) :

$\displaystyle y = - (cos((a)))/(sin((a)))\cdot x+ (p)/(sin((a)))$ .

Take the first derivative of both sides with respect to
.
(p)/(sin((a))) is a constant, so its first derivative will be zero.

$\displaystyle (dy)/(dx) = - (cos((a)))/(sin((a)))$ .

$\displaystyle (dy)/(dx)$ is the slope of this line. The slope of this line is therefore

$\displaystyle - (cos((a)))/(sin((a))) = -\cot{(a)}$ .

In case
sin(a) = 0 , the equation of this line becomes:

y sin((a)) = p - xcos((a)) .

xcos((a)) = p .

$\displaystyle x = (p)/(cos((a)))$ ,

which is the equation of a vertical line that goes through the point
$\displaystyle \left(0, (p)/(cos((a)))\right)$ . The slope of this line will be infinity.

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