164 CHAPTER 3 Inequalities
We have
0 = b^2 = 4ac
= m^2 − 4which immediately givesm =±2. Only the valuem = 2 is rele-
vant here (as we assumed thatx >0) and this is the sought-after
minimum value ofg. (The extraneous valuem=−2 can easily be
seen to be the maximum value ofx+1
x, x <0.)Example 3. Find the equations of
the two straight lines which pass
through the point P(0,5) and are
both tangent to the graph of
y= 4−x^2.6
yxy= 4−x^2
+@ @ @ @ @ @ @ @@@@@@@
Solution. If we write a line with equation`:y= 5 +mx, where the
slope is to be determined, then we are solving 4−x^2 = 5 +mxso
that a double root occurs (i.e., tangency). Clearly, there should
result two values of m for this to happen. Again, the discrimi-
nant is a very good tool. Write the quadratic equation having the
multiple root asx^2 +mx+ 1 = 0, and so0 = b^2 − 4 ac
= m^2 − 4 ⇒m=± 2.Therefore, the two lines are given by equationsy= 5 + 2x and y= 5− 2 x.(The two points of tangency are at the points with coordinates
(± 1 ,3).)