Since the vectors from 2 to 1 and 1 to 3 are perpendicular, their dot product is 0.

This leaves you with two unknowns: x from 1 to 3 (x13), and y from 1 to 3 (y13)

Use the Pythagorean theorem to get another equation for those unknowns.

Solve for each unknown by substitution...

This requires squaring and unsquaring, so you lose the sign associated with your equations.

To determine the sign, consider:

```
while x21 is negative, y13 will be positive
while x21 is positive, y13 will be negative
while y21 is positive, x13 will be positive
while y21 is negative, x13 will be negative
```

Known: point 1 : x1 , y1

Known: point 2 : x2 , y2

```
x21 = x1 - x2
y21 = y1 - y2
```

Known: distance |1->3| : N/2

equation a: Pythagorean theorem

```
x13^2 + y13^2 = |1->3|^2
x13^2 + y13^2 = (N/2)^2
```

Known: angle 2-1-3 : right angle

vectors 2->1 and 1->3 are perpendicular

2->1 dot 1->3 is 0

equation b: dot product = 0

```
x21*x13 + y21*y13 = 2->1 dot 1->3
x21*x13 + y21*y13 = 0
```

ratio b/w x13 and y13:

```
x21*x13 = -y21*y13
x13 = -(y21/x21)y13
x13 = -phi*y13
```

equation a: solved for y13 with ratio

```
plug x13 into a
phi^2*y13^2 + y13^2 = |1->3|^2
factor out y13
y13^2 * (phi^2 + 1) =
plug in phi
y13^2 * (y21^2/x21^2 + 1) =
multiply both sides by x21^2
y13^2 * (y21^2 + x21^2) = |1->3|^2 * x21^2
plug in Pythagorean theorem of 2->1
y13^2 * |2->1|^2 = |1->3|^2 * x21^2
take square root of both sides
y13 * |2->1| = |1->3| * x21
divide both sides by the length of 1->2
y13 = (|1->3|/|2->1|) *x21
lets call the ratio of 1->3 to 2->1 lengths psi
y13 = psi * x21
check the signs
when x21 is negative, y13 will be positive
when x21 is positive, y13 will be negative
y13 = -psi * x21
```

equation a: solved for x13 with ratio

```
plug y13 into a
x13^2 + x13^2/phi^2 = |1->3|^2
factor out x13
x13^2 * (1 + 1/phi^2) =
plug in phi
x13^2 * (1 + x21^2/y21^2) =
multiply both sides by y21^2
x13^2 * (y21^2 + x21^2) = |1->3|^2 * y21^2
plug in Pythagorean theorem of 2->1
x13^2 * |2->1|^2 = |1->3|^2 * y21^2
take square root of both sides
x13 * |2->1| = |1->3| * y21
divide both sides by the length of 2->1
x13 = (|1->3|/|2->1|) *y21
lets call the ratio of |1->3| to |2->1| psi
x13 = psi * y21
check the signs
when y21 is negative, x13 will be negative
when y21 is positive, x13 will be negative
x13 = psi * y21
```

to condense

```
x21 = x1 - x2
y21 = y1 - y2
|2->1| = sqrt( x21^2 + y^21^2 )
|1->3| = N/2
psi = |1->3|/|2->1|
y13 = -psi * x21
x13 = psi * y21
```

I normally wouldn't do this, but I solved it at work and thought that explaining it thoroughly would help me solidify my knowledge.