Question

What is the slope of the line normal to the tangent line of `f(x) = tanx+sin(x-pi/4)` at `x= (5pi)/8`?

Answer 1

`-0.1290`, nearly.

Explanation:

At #x=5/8pi,

y= f(5/8pi)=tan(5/8pi)+sin(5/8pi-pi/4)#

`=tan(pi/2+pi/8)+sin(-pi/8)`

`=-cot(pi/8)-sin(pi/8)=-2.797`, nearly

The slope of the normal at this point

`P(5/8pi, 2.0315)=P(1.9635,2.0315)`

is -1/y/ at P

`=-1/(tan x+sin(x-pi/4))'` at `x =5/8pi`

`=-1/(sec^2(5/8pi)+cos(pi/8)`

`=-1/(csc^2(pi/8)+cos(pi/8))`

`=-0.1290`, nearly.

The equation to the normal at P(1.9635,2.0315)# is

y-2.0315=-0.1290(x-1.9635)#. Simplifying,

`y=-0.1290 x+2.057`