What is the equation of the normal line of $f (x) = 2 x + \frac{3}{x}$ $f(x)=2x+3/x$ at $x = 1$ $x=1$ ?

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What is the equation of the normal line of $f (x) = 2 x + \frac{3}{x}$ $f(x)=2x+3/x$ at $x = 1$ $x=1$ ?

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Answer 1 · 2016-10-31T12:44:39

$:. y=x+4$

Explanation:

$f(x) = 2x+3/x$
$:. f(x) = 2x+3x^-1$

Differentiating wrt $x$ gives us:
$f'(x) = 2+3(-x^-2)$
$:. f'(x) = 2-3/x^2$

When $x=1 => f(1)=2+3 = 5$
and, $f'(1) = 2-3=-1$

So the gradient of the tangent at $x=1$ is $m'=-1$ , and the tangent and normal are perpendicular so the product of their gradients is $-1$
Hence, gradient of Normal is $m=-1/(-1)=1$

So the Normal has gradient $m=1$ and it passes through $(1,5)$ , so using $y-y_1=m(x-x_1)$ the Normal equation is given by:

$y-5=(1)(x-1)$
$:. y=x+4$

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What is the equation of the normal line of $f (x) = 2 x + \frac{3}{x}$ $f(x)=2x+3/x$ at $x = 1$ $x=1$ ?

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What is the equation of the normal line of f(x)=2x+3/xf(x)=2x+3xf(x)=2x+3/x at x=1x=1x=1?

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What is the equation of the normal line of $f (x) = 2 x + \frac{3}{x}$ $f(x)=2x+3/x$ at $x = 1$ $x=1$ ?