No matter how far

that person is,

No matter how impossible

for both of you to meet

As long as there is love

in between,

Seeing each other

will not anymore be a dream

That’s the Geometrical Probability of Love

She is sitting on a bench,

180 degrees facing north.

Who would have a thought

that this man’s standing,

180 degrees facing south

would likely to meet this girl, sitting?

The story goes this way…

The love between these strangers

started from the **absolute value
**their distance started from zero

But how will they meet, if that’s so?

These strangers have **angles
**two rays with same vertex,

two rays with the same endpoint,

But how will they meet if that’s so?

Under the coordinate system,

then they’re stepping in **axis
**that’s there reference line beyond x or y

But how will they meet, if that’s so?

Beneath, distance across the circles

The main point is through the center

their **diameter** is indeed vague

But how will they meet, if that’s so?

Under the spell of **divisibility,
**anything can be divided evenly

So is their distance yet an exemption

But how will they meet, if that’s so?

And these strangers are **parallel
**their

**lines**will not cross

for their distance is a total opposite

But how will they meet, if that’s so?

Below, they’re in the same **plane
**Having infinite points around

their

**intersecting lines**formed

But how will they meet, if that’s so?

Opposite directions diverged as two

their interval is still equal

Yes,it is called **equidistant
**But how will they meet, if that’s so?

Suddenly, they have four right angles

their **perpendicular lines** are formed

Indeed, their lines will cross

But how will they meet, if that’s so?

However…

New stranger is inevitable

may **bisects** their angles

and divides it unequally

But will they still meet, if that’s so?

Yet, a **remainder** results

when one’s effort doesn’t fit

the other one so even

Now, will they still meet if that’s so?

Hence, one of them had a thought

that their love must be **simplified
**For just in math, the simplest answer

is much accepted and realized

So will they now meet, if that’s so?

Possibly, they will see each other

for she is the **Segment
**A line with beginning point

and He is her

**endpoint**

And so they may meet

Yet…

Above these journeys

they have forgotten one thing

that their coordinates is (0,0)

remember, that’s their **origin**

Finally,

She is sitting from **x-axis
**he is standing from

**y-axis**

they’re now in their origin (0,0)

and that’s the time

they will probably meet

I hate math.. I absolutely detest it… yet your words have me falling in love!

We’re total opposites. I love math! That’s why I am able to relate love with it. HAHA:) Well, thank you so much! 🙂

I could very well tell. It was a pleasure to read though. I absolutely admire what you’ve been able to do with words.

Really? I am flattered. Thank you so much! 🙂

You’re very welcome!