Question

In the x-y coordinate plane, the graph of `x=y^2-4` intersects line l at `(0,p)` and `(5,t)`? What is the greatest possible value of the slope of l?

Answer 1

`m = 1`

Explanation:

Given:

Points `(0,p)` and `(5,t)` lie on the curve `x = y^2-4`

The slope of a line through the points is:

`m = (t-p)/(5-0)`

`m = (t-p)/5`

When we solve for t and p, we discover that both have two possible values as follows:

`0 = p^2-4` and `5 = t^2-4`

`p^2=4` and `t^2=9`

`p=+-2` and `t=+-3`

The greatest value will occur when, t is positive and p is negative:

`m = (3- (-2))/5`

`m = 5/5`

`m = 1`