Find the slope of the tanget line ?

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Answer 1 · 2017-03-18T17:13:04

The slope of the tangent is #-1/6#.

Slope of the tangent at a given point on the curve #f(x)# is given by #f'(x_0)#.

As #f(x)=sqrt(8-x)#

#f'(x)=1/(2sqrt(8-x))xxd/(dx)(8-x)#

= #(-1)/(2sqrt(8-x))#

As such the slope of the tangent is

#f'(-1)=(-1)/(2sqrt(8-(-1)))=-1/6#

Additionally as #f(-1)=3#, equation of tangent is

#y-3=-1/6(x+1)# or #x+6y-17=0#

and tangent appears as follows:

graph{(y-sqrt(8-x))(x+6y-17)=0 [-25, 15, -5, 15]}