Question

How do you find the equation of the line tangent to `y=sinx` at `(pi/4, sqrt(2)/2)`?

Answer 1

`y=(4x-pi+4)/(4sqrt2)`

Explanation:

The slope of the tangent line can be found using the derivative of the function:

`dy/dx=cosx`

The slope of the tangent line at `x=pi/4` can then be found through plugging `pi/4` into the derivative.

`cos(pi/4)=sqrt2/2`

So, we have a line that passes through the point `(pi/4,sqrt2/2)` and a slope of `sqrt2/2`:

`y-y_0=m(x-x_0)`

`y-sqrt2/2=sqrt2/2(x-pi/4)`

`y=sqrt2/2x-(pisqrt2)/8+sqrt2/2`

`y=(4sqrt2x-pisqrt2+4sqrt2)/8`

Note that `sqrt2/8=sqrt2/(4sqrt2sqrt2)=1/(4sqrt2)`:

`y=(4x-pi+4)/(4sqrt2)`