Question

How do you find the slope of a tangent line to the graph of the function `f(x)= (2x^2+5x-4)/x^2` at x=3?

Answer 1

`y = -7/27x+4`

Explanation:

The gradient of the tangent to a curve at any particular point is given by the derivative of the curve at that point.

so If `f(x) = (2x^2+5x-4)/x^2 =2+5/x-4/x^2` then differentiating wrt `x` gives us:

`f'(x) = -5/x^2+8/x^3`

When `x=3 => f(3)=(18+15-4)/9=29/9`
and `f'(3) = -5/9+8/27=-7/27`

So the tangent passes through `(3,29/9)` and has gradient `-7/27`, so using the point/slope form `y-y_1=m(x-x_1)` the equation we seek is;

`\ \ \ \ \ y-(29/9) = -7/27(x-3)`
`:. y-29/9 = -7/27x+7/9`
`:. \ \ \ \ \ \ \ y = -7/27x+4`

We can confirm this solution is correct graphically: