linyen416 said:by writing arctan as a power series, you can obtain an approximation to arctan (1/root 3) and hence approximate pi. I've done this by multiplying my answer for arctan (1/root3) by 6 to get 3.14... radians.
I would like to know How can this approximation be improved?
thanks!
PI (π) is a mathematical constant that represents the ratio of a circle's circumference to its diameter. It is an irrational number, meaning it has an infinite number of decimal places. Approximating PI is important because it is used in various mathematical calculations and has practical applications in fields such as engineering, physics, and geometry.
PI is typically approximated using the infinite series expansion of the arctangent function. This involves summing a series of terms, each of which contains the inverse tangent of a fraction. The more terms that are included in the summation, the more accurate the approximation becomes.
The approximation for arctan(1/√3) is 0.5235987756 radians or approximately 30 degrees.
The approximation for arctan(1/√3) can be improved by using the Machin formula, which involves subtracting or adding the arctangent of various fractions to the original approximation. This can lead to a more accurate result with fewer terms in the series.
Improving the arctan(1/√3) approximation can lead to a more accurate value for PI, which can be useful in various calculations and applications. It can also provide a better understanding of the mathematical concept and the relationships between different trigonometric functions.