Download presentation
Presentation is loading. Please wait.
1
Math 409/409G History of Mathematics
Sums of Squares and Cubes
2
In the lesson on figurative numbers you saw how the triangular and square numbers were used to find formulas for sums of counting numbers, even counting numbers, and odd counting numbers.
3
In this lesson we will use what we have learned about the triangular and square numbers to derive formulas for the sums of squares and cubes. One of these derivations will be geometric and the other will be algebraic.
4
But first, lets review a bit.
The triangular numbers are generated by the iterative relation
5
In the lesson on the sum of triangular numbers we derived the formula for the sum of the first n triangular numbers. The square numbers are
6
To find a formula for the sum of the squares of the first n counting numbers, let’s first consider the sum Use a diagram of the first four square numbers to represent this sum.
7
Add enough dots to form a rectangular array.
Do you see any pattern in the dots we added?
8
The added dots can be counted using the triangular numbers.
9
The number of dots in this array is
This number is also the product of the (horizontal) length and (vertical) width of the array.
10
Clearly the length is 10 and the width is 4
Clearly the length is 10 and the width is 4. But we want to generalize our formula for to We need to express that 10 in terms of 4.
11
But 10 is the forth triangular number.
So let’s add another row of dots at the top.
12
The number of dots in the array is now
And the length of the array is t4 and its width is
13
This gives And generalizing this gives us
14
We know that and Plugging these into our last equation gives
15
And then solving for gives us the formula we were looking for.
16
Do you see a pattern in the successive values of
17
Each sum is a perfect square.
Do you see a pattern in the numbers that are squared?
18
They are the triangular numbers.
19
So in general, And since , we now have a formula for the sum of the cubes of the first n counting numbers. Namely,
20
Sums of Squares and Cubes
This ends the lesson on Sums of Squares and Cubes
Similar presentations
© 2024 SlidePlayer.com. Inc.
All rights reserved.