The common external tangents to the graphs for (x+1)^2+y^2=1 and (x-2)^2+y^2=4 are drawn. Find the slope of the tangent line that has a positive slope.

Question

I tried finding the derivatives and setting them equal to each other, but that didn't give me an answer. Please help!

Steve · Answer

I agree that the calculus gets messy, but the algebra is simple.

Label the centers C and D, respectively, and the points of tangency E and F.

We want the slope of the line EF.
Draw CE and DF. Since they are both perpendicular to EF, they are parallel.

Mark point P on DF such that CE is parallel to EF. So, CD = PF = 1, meaning that PD=1 as well.

CD = 1+2 = 3, so our line makes an angle z with the x-axis, such that

sin(z) = 1/3, so our slope, tan(z) is 1/√8.