Question

Does the parabola `y= -1/2x^2 - 5x - 10` ever intersect the line `y= 2`?

Answer 1

`" Yes, at the points "(-5-sqrt17,2) and (-5+sqrt17,2)`.

Explanation:

If it does, then the `x"-co-ordinates"` of their points of

intersection (if any) must satisfy the following eqn. :

`2=-1/2x^2-5x-2`.

To get rid of fractions, multiplying by `2`, we have,

`4=-x^2-10x-4, or, x^2+10x+8=0`.

`:. x^2+2*x*5+5^2-25+8=0, i.e.,`.

`(x+5)^2=25-8=17`.

`:. x+5=+-sqrt17`.

`:. x=-5+-sqrt17`.

The corresponding `y"-co-ordinate"` is already known to be `2`.

Accordingly, the given curves do intersect each other at the

points `(-5-sqrt17,2) and (-5+sqrt17,2)`.