An alternative line definition Given a fxed point P,(xo- Yo) and a nonzero vector n = (a, b), the set of points P(x, y) for which PP is orthogonal to n is a line e (see figure). The vector n is called a normal vector or a vector normal to e. yA n = (a, b) P(x, y) Suppose a line is normal to n = (5, 3). What is the slope of the line?

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An alternative line definition Given a fxed point P,(xo- Yo)
and a nonzero vector n = (a, b), the set of points P(x, y) for which
PP is orthogonal to n is a line e (see figure). The vector n is called a
normal vector or a vector normal to e.
yA
n = (a, b)
P(x, y)
Suppose a line is normal to n = (5, 3). What is the slope of
the line?
Transcribed Image Text:An alternative line definition Given a fxed point P,(xo- Yo) and a nonzero vector n = (a, b), the set of points P(x, y) for which PP is orthogonal to n is a line e (see figure). The vector n is called a normal vector or a vector normal to e. yA n = (a, b) P(x, y) Suppose a line is normal to n = (5, 3). What is the slope of the line?
Expert Solution
Step 1

Given :

           n = (5 , 3)

 

Step 2

Formula used :

                     

                        L = 0ln 8f(θ)2+f'(θ)2dθ

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