Question

The minimum distance between the curves $y=tanx,\forall x\in \left(-\frac{\pi }{2},\frac{\pi }{2}\right)$ and ${\left(x-2-\frac{\pi }{4}\right)}^2+y^2=1$ is

• A. $\sqrt{2}-1$
• B. $\sqrt{5}-1$
• C. $\sqrt{5}+1$
• D. $2$

Answer 1

Answer: (B)

The minimum distance between two curves lies along their common normal.
Let, $P\left(h,tanh\right)$ lies on $y=tanx$
Then, the equation of normal at $P$
is $y-tanh=-\frac{1}{se{c}^{2}h}\left(x-h\right)$
this passes through the centre of the circle, hence,
$tanhse{c}^{2}h=2+\frac{\pi }{4}-h$
$\Rightarrow h=\frac{\pi }{4}$
Minimum distance = distance between $\left(\frac{\pi }{4},1\right)$ and $\left(2+\frac{\pi }{4},0\right)$ $-1$
$=\sqrt{5}-1$