Question

Did I do this right?

Find the derivative of f(x) = |x + 2| at the point (1, 3).
a. -1
b. 0
c. 1
d. does not exist.

I found the derivative which is (x+2)/|x + 2|. Then, I plugged 1 in for x and got 3/3, which is just 1. The answer is c.

Answer 1

`\bf f(x)=|x+2|\implies f(x)=\pm√((x+2)^2)\implies f(x)=\left[ (x+2)^2 \right]^{(1)/(2)} \\\\\\ \cfrac{dy}{dx}=\stackrel{chain~rule}{\cfrac{1}{2}[(x+2)^2]^{-(1)/(2)}\cdot 2(x+2)^1\cdot 1}\implies \cfrac{dy}{dx}=[(x+2)^2]^{-(1)/(2)}(x+2) \\\\\\ \cfrac{dy}{dx}=\cfrac{x+2}{[(x+2)^2]^{(1)/(2)}}\implies \left. \cfrac{dy}{dx}=\cfrac{x+2}{\pm √((x+2)^2)} \right|_(x=1)\implies \cfrac{3}{\pm 3}`

check the picture below. the point 1,3 is on the increasing slope side, so will be 3/3 or 1.