What is the equation of the normal line of #f(x)= 2(x-2)^4+(x-1)^3+(x-3)^2# at #x=4#?

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Answer 1 · 2016-05-31T13:45:51

#78y=-x+4680#

First find the slope of the tangent at the given point by differentiating and then substituting in #x=4#

#f'(x)=8(x-2)^3 +3(x-1)^2 +2(x-3)#

At #x=4# this is #m =8*2^3+3*2^2+2*1 = 64+12+2 = 78#

The slope of the normal line is #-1/m = -1/78#

The equation of the normal is then #y = -1/78x+c#

To calculate #c#, find the value of the original function at the given point and then substitute into the equation of the normal.

#f(4) = 2*2^4+3^3 +1^2 = 32+27+1 = 60#

#:.60=-1/78*4+c#

#c=60+4/78 = 4680/78#

#y=-1/78x+4680/78#

#:.78y=-x+4680#