- #1
train449
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Homework Statement
Find the line tangent to the curve f(x) = { (x+3)^2 | x < 0} , {-x^ + 8x -4 | x≥ 0} at two distinct points
Homework Equations
slope = Δy/Δx
The Attempt at a Solution
I only got as far as finding the slope of the line to be: a= -50p^2 + 50p. where p is a point on y = (x+3)^2.
my reasoning:
a = (s - q)/(r - p),
where (p,q) belongs to the curve (x + 3)^2 and (r,s) belongs to -x^ + 8x -4
then,
a = [-r^2 + 8r -4 -(p + 3)^2]/r - p = [-r^2 + 8r - p^2 -6p]/r-p
also,
d/dx (x + 3)^2 = 2x + 6
d/dx -x^2 + 8x -4 = -2x +8
these slopes should both be equal, and also to a
thus
2p + 6 = [-r^2 + 8r - p^2 -6p]/r-p
2pr - 2r -p^2 +12p = 0
-2r + 8 = [-r^2 + 8r - p^2 -6p]/r-p
-r^2 + 2pr -2p = 0
2pr - 2r -p^2 +12p = -r^2 + 2pr -2p
r = 7p
then a = [-(7p)^2 + 8(7p) - p^2 -6p]/7p-6p
a = -50p^2 +50p
As nice as the result looks, I'm now stumped, beating my head against the wall and feeling like I've gone down the complete wrong path.
Any help is appreciated
