Question

Find the equation of the line through the point `(3, 5)` that cuts off the least area from the first quadrant?

Answer 1

`5x+3y-30 = 0`

Explanation:

I think it will be the line through `(0, 10)` and `(6, 0)` cutting off a triangle of area `30` from Q1.

Why?

If the given point was `(1, 1)` then the minimum area would be for a line through `(0, 2)` and `(2, 0)`. Then stretch this solution horizontally (by a factor of `3`) and vertically (by a factor of `5`).

Let's check using a little algebra and calculus...

Suppose the line passes through `(t, 0)` and `(3, 5)`, where `t > 3`.

Then the `y` intercept is at `(0, (5t)/(t-3))`

So the area of the triangle is:

`1/2 t*(5t)/(t-3) = (5t^2)/(2(t-3))`

Then:

`d/(dt) (5t^2)/(2(t-3)) = (5t)/(t-3) - (5t^2)/(2(t-3)^2)`

`color(white)(d/(dt) (5t^2)/(2(t-3))) = (5t)/(2(t-3)^2)(2(t-3)-t)`

`color(white)(d/(dt) (5t^2)/(2(t-3))) = (5t)/(2(t-3)^2)(t-6)`

Since we require `t > 3`, the zero of the derivative that we see is when `t=6`, confirming the geometric solution proposed above.

We can write the equation of this line as:

`5x+3y-30 = 0`