Let `f(x)=x^(3)+x+1` and let g(x) be its inverse function then equation of the tangent to `y=g(x)` at x = 3 is
A
`x-4y+1=0`
B
`x+4y-1=0`
C
`4x-y+1=0`
D
`4x+y-1=0`
Text Solution
Verified by Experts
The correct Answer is:
A
Let `(3,alpha)` be the point on `y=g(x) rArr (alpha, 3)` lines on `y=f(x) rArr alpha=1` `"Also "x=f(g(x))` `rArr" "g'(3)=(1)/(f'(g(3)))=(1)/(f'(1))=(1)/(4)` `therefore" Tangent is y"-1=(1)/(4)(x-3)or x-4y+1=0`.
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