Question

In a coordinate plane, how many points are both 5 units from the origin and 2 units from the x-axis?

Answer 1

4

Explanation:

The loci of point 5 units from the origin is a circle of radius `5` centred on the origin (red)

The loci of points 3 units from the `x`-axis is two parallel lines `y=+-2` (blue)

Visually we can see there are `4` such points of intersection.

Proof

The loci of the circle is:

`x^2+y^2=25`

The loci of the two lines are:

`y=+-2`

At a point of intersection we have both equation satisfied simultaneously; thus:

`x^2+(+-2)^2=25`
`:. x^2+4=25`
`:. x^2=21`
`:. x=+-sqrt(21)`

Thus we have the four coordinates (all possible permutations) of:
coordinates `( +-sqrt(21), +-2)`, ie:

`(-sqrt(21), 2), (-sqrt(21), -2), (sqrt(21), 2), (sqrt(21), -2)`