3.1415
A 9
265 to the 35
89
7932 oh my
Keep going, but why? (ooh ooh)
(Why?) 'Cause that's pi
(Correct!) yeah that’s pi that’s pi
The universe keeps many secrets
But basic geometry teaches
If you break the edge of a circle in pieces
By the distance across it - it reaches
About three times given some leftover pieces
That knowledge will leave you all speechless
When it’s put together it will be cohesive
So plеase listen now as I teach it
Takе a circle like this one
Let’s put a dot in the center
Draw a line from the dot
Right to the edge with utensil
The line from the dot to the edge
Is something you need to remember
We call it radius - radius
Please write it down with a pencil
Now take two radii and line them up like this
Go from one edge through the center to the other edge don’t miss
This line has a special name twice the size of radius
Something called the diameter
Please write it down real quick
Aye
You’ll find at once that
The distance across a circle
We call it the circumference
(write it down write it down)
But what we want is
To show the circumference divided by the diameter is something and The outcome is written in front it’s
3.1415
A 9
265 to the 35
89
7932 oh my
Kids going but why (why?)
Cause that’s pi
Yeah that’s pi that’s pi
3.1415
A 9
265 to the 35
89
7932 oh my
Keeps going, but why? (why?)
Cause that’s pi
Yeah that’s pi that’s pi
Ok now you know the radius
Two of those is diameter
Plus now you know the circumference
Which is the circle's perimeter
Next - gonna hit you with a wow
Imma bout to show you what this pi this is about
Take a piece of string that you have lying around
Then you find something circular and measure it right now
Next take the string and you wrap it around it
If you have an excess you need to cut down it
And now that it’s trimmed to the part that surrounds it
You measure it out and the length you must count it
And now that you measured you must write it down
As the circumference of the object that is round
But there is one more noun we forgot to account
That’s the length of diameter get that amount
Pull that ruler out
Measure it throughout
Edge-to-edge through the center in route
Write that number out
Got two numbers now
Divide circumference by diameter and calc'
'Cause when you divide you tryna find how many times to combine the smaller line just to get the bigger size
And you did it right you will realize that the number that you got inside of the calculator might look like the same number that I Described at the beginning of the rhyme
You will find an answer very close to pi
And if you had measurements more precise
I would believe you’d reply with
3.1415
A 9
265 to the 35
89
7932 oh my
Kids going but why (why?)
Cause that’s pi
Yeah that’s pi that’s pi
3.1415
A 9
265 to the 35
89
7932 oh my
Keeps going, but why? (why?)
Cause that’s pi
Yeah that’s ---
A 9
265 to the 35
89
7932 oh my
Keep going, but why? (ooh ooh)
(Why?) 'Cause that's pi
(Correct!) yeah that’s pi that’s pi
The universe keeps many secrets
But basic geometry teaches
If you break the edge of a circle in pieces
By the distance across it - it reaches
About three times given some leftover pieces
That knowledge will leave you all speechless
When it’s put together it will be cohesive
So plеase listen now as I teach it
Takе a circle like this one
Let’s put a dot in the center
Draw a line from the dot
Right to the edge with utensil
The line from the dot to the edge
Is something you need to remember
We call it radius - radius
Please write it down with a pencil
Now take two radii and line them up like this
Go from one edge through the center to the other edge don’t miss
This line has a special name twice the size of radius
Something called the diameter
Please write it down real quick
Aye
You’ll find at once that
The distance across a circle
We call it the circumference
(write it down write it down)
But what we want is
To show the circumference divided by the diameter is something and The outcome is written in front it’s
3.1415
A 9
265 to the 35
89
7932 oh my
Kids going but why (why?)
Cause that’s pi
Yeah that’s pi that’s pi
3.1415
A 9
265 to the 35
89
7932 oh my
Keeps going, but why? (why?)
Cause that’s pi
Yeah that’s pi that’s pi
Ok now you know the radius
Two of those is diameter
Plus now you know the circumference
Which is the circle's perimeter
Next - gonna hit you with a wow
Imma bout to show you what this pi this is about
Take a piece of string that you have lying around
Then you find something circular and measure it right now
Next take the string and you wrap it around it
If you have an excess you need to cut down it
And now that it’s trimmed to the part that surrounds it
You measure it out and the length you must count it
And now that you measured you must write it down
As the circumference of the object that is round
But there is one more noun we forgot to account
That’s the length of diameter get that amount
Pull that ruler out
Measure it throughout
Edge-to-edge through the center in route
Write that number out
Got two numbers now
Divide circumference by diameter and calc'
'Cause when you divide you tryna find how many times to combine the smaller line just to get the bigger size
And you did it right you will realize that the number that you got inside of the calculator might look like the same number that I Described at the beginning of the rhyme
You will find an answer very close to pi
And if you had measurements more precise
I would believe you’d reply with
3.1415
A 9
265 to the 35
89
7932 oh my
Kids going but why (why?)
Cause that’s pi
Yeah that’s pi that’s pi
3.1415
A 9
265 to the 35
89
7932 oh my
Keeps going, but why? (why?)
Cause that’s pi
Yeah that’s ---
( Brandon Jamar Scott )
www.ChordsAZ.com