Question

How do you find the equation of a line tangent to the function `y=x+4/sqrtx` at (1,5)?

Answer 1

`y=-x+6`

Explanation:

`y=x+4/sqrtx`

`= x+4x^(-1/2)`

`y' = d/dx(x+4x^(-1/2))`

`=1-2x^(-3/2) = 1-2/sqrt(x^3)`

The equation of a straight line through `(x_1, y_1)` is:

`(y-y_1) = m(x-x_1)` Where m is the slope the line

The slope of `y` at `(1, 5)` is `y'(1) = 1-2/1 = -1`

Hence the slope of the tangent to `y` at `(1, 5)` is:

`(y-5) = -1(x-1)`

`y=-x+6`
graph{(y-x-4/sqrtx)(y+x-6)=0 [-7.04, 12.96, -1.04, 8.96]}