SOLUTION: Given the function g=(t^(2)-3)/t, find the function that gives the gradient of the curve of the function g at any point on the curve.

Question 977452: Given the function g=(t^(2)-3)/t, find the function that gives the gradient of the curve of the function g at any point on the curve.
Found 2 solutions by anand429, Alan3354:
Answer by anand429(138) (Show Source): You can put this solution on YOUR website!
Gradient of g = d(g)/d(t)
=
=
=
Answer by Alan3354(69443) (Show Source): You can put this solution on YOUR website!
Given the function g=(t^(2)-3)/t, find the function that gives the gradient of the curve of the function g at any point on the curve.
--------------
g(t) = t - 3/t
It's the 1st derivative.
g'(t) =
t <> 0

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