The
Madhava Trignometric series is one of a series in a collection of
infinite series expressions discovered by Madhava of Sangramagrama (
1350-1425 ACE ), the founder of the Kerala School of Astronomy and
Mathematics. These are the infinite series expansions of the Sine,
Cosine and the ArcTangent functions and Pi. The power series expansions
of sine and cosine functions are called the Madhava sine series and the Madhava cosine series.
The power series expansion of the arctangent function is called the Madhava- Gregory series. The power series are collectively called as Madhava Taylor series. The formula for Pi is called the Madhava Newton series.
One of his disciples, Sankara Variar had translated his verse in his Yuktideepika commentary on Tantrasamgraha-vyakhya, in verses 2.440 and 2.441
Multiply the arc by the square of the arc, and take the result of repeating that (any number of times). Divide (each of the above numerators) by the squares of the successive even numbers increased by that number and multiplied by the square of the radius. Place the arc and the successive results so obtained one below the other, and subtract each from the one above. These together give the jiva, as collected together in the verse beginning with "vidvan" etc.
Rendering in modern notations
Let r denote the radius of the circle and s the arc-length.
The following numerators are formed first:
s.s^2,
s.s^2.s^2
s.s^2.s^2.s^2
These are then divided by quantities specified in the verse.
1)s.s^2/(2^2+2)r^2,
2)s. s^2/(2^2+2)r^2. s^2/4^2+4)r^2
3)s.s^2/(2^2+2)r^2.s^2/ (4^2+4)r^2. s^2/(6^2+6)r^2
Place the arc and the successive results so obtained one below the other, and subtract each from the one above to get jiva:
Jiva = s-(1-2-3)
When we transform it to the current notation
If x is the angle subtended by the arc s at the center of the Circle, then s = rx and jiva = r sin x.
Sin x = x - x^3/3! + x^5/5! - x^7/7!...., which is the infinite power series of the sine function.
By means of the same argument, the circumference can be computed in another way too. That is as (follows): The first result should by the square root of the square of the diameter multiplied by twelve. From then on, the result should be divided by three (in) each successive (case). When these are divided in order by the odd numbers, beginning with 1, and when one has subtracted the (even) results from the sum of the odd, (that) should be the circumference. ( Yukti deepika commentary )
This quoted text specifies another formula for the computation of the circumference c of a circle having diameter d. This is as follows.
c = SQRT(12 d^2 - SQRT(12 d^2/3.3 + sqrt(12 d^2)/3^2.5 - sqrt(12d^2)/3^3.7 +.......
As c = Pi d , this equation can be rewritten as
Pi = Sqrt(12( 1 - 1/3.3 + 1/3^2.5 -1/3^3.7 +......
This is obtained by substituting z = Pi/ 6 in the power series expansion for arctan (z).
Pi/4 = 1 - 1/3 +1/5 -1/7+.....
This is Madhava's formula for Pi, and this was discovered in the West by Gregory and Liebniz
The power series expansion of the arctangent function is called the Madhava- Gregory series. The power series are collectively called as Madhava Taylor series. The formula for Pi is called the Madhava Newton series.
One of his disciples, Sankara Variar had translated his verse in his Yuktideepika commentary on Tantrasamgraha-vyakhya, in verses 2.440 and 2.441
Multiply the arc by the square of the arc, and take the result of repeating that (any number of times). Divide (each of the above numerators) by the squares of the successive even numbers increased by that number and multiplied by the square of the radius. Place the arc and the successive results so obtained one below the other, and subtract each from the one above. These together give the jiva, as collected together in the verse beginning with "vidvan" etc.
Rendering in modern notations
Let r denote the radius of the circle and s the arc-length.
The following numerators are formed first:
s.s^2,
s.s^2.s^2
s.s^2.s^2.s^2
These are then divided by quantities specified in the verse.
1)s.s^2/(2^2+2)r^2,
2)s. s^2/(2^2+2)r^2. s^2/4^2+4)r^2
3)s.s^2/(2^2+2)r^2.s^2/
Place the arc and the successive results so obtained one below the other, and subtract each from the one above to get jiva:
Jiva = s-(1-2-3)
When we transform it to the current notation
If x is the angle subtended by the arc s at the center of the Circle, then s = rx and jiva = r sin x.
Sin x = x - x^3/3! + x^5/5! - x^7/7!...., which is the infinite power series of the sine function.
By means of the same argument, the circumference can be computed in another way too. That is as (follows): The first result should by the square root of the square of the diameter multiplied by twelve. From then on, the result should be divided by three (in) each successive (case). When these are divided in order by the odd numbers, beginning with 1, and when one has subtracted the (even) results from the sum of the odd, (that) should be the circumference. ( Yukti deepika commentary )
This quoted text specifies another formula for the computation of the circumference c of a circle having diameter d. This is as follows.
c = SQRT(12 d^2 - SQRT(12 d^2/3.3 + sqrt(12 d^2)/3^2.5 - sqrt(12d^2)/3^3.7 +.......
As c = Pi d , this equation can be rewritten as
Pi = Sqrt(12( 1 - 1/3.3 + 1/3^2.5 -1/3^3.7 +......
This is obtained by substituting z = Pi/ 6 in the power series expansion for arctan (z).
Pi/4 = 1 - 1/3 +1/5 -1/7+.....
This is Madhava's formula for Pi, and this was discovered in the West by Gregory and Liebniz
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