Pi-dagen

Lista på [math]\displaystyle{ \pi }[/math]-aktiviteter

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Matteproblem

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Öva bråkräkning

Använd informationen nedan för att ta fram ett bråk som ger en så bra approximation till pi som möjligt.

Pi kan skrivas så här:

[math]\displaystyle{ \pi=3+\textstyle \cfrac{1}{7+\textstyle \cfrac{1}{15+\textstyle \cfrac{1}{1+\textstyle \cfrac{1}{292+\textstyle \cfrac{1}{1+\textstyle \cfrac{1}{1+\textstyle \cfrac{1}{1+\ddots}}}}}}} }[/math]

Like all irrational numbers, π cannot be represented as a common fraction (also known as a simple or vulgar fraction), by the very definition of "irrational number" (that is, "not a rational number"). But every irrational number, including π, can be represented by an infinite series of nested fractions, called a continued fraction:

Truncating the continued fraction at any point yields a rational approximation for π; the first four of these are 3, 22/7, 333/106, and 355/113. These numbers are among the most well-known and widely used historical approximations of the constant. Each approximation generated in this way is a best rational approximation; that is, each is closer to π than any other fraction with the same or a smaller denominator.

Wikipedia:Pi

Trgonometri och komplexa tal

Läs på om varför Eulers identitet anses så vacker.

Kan du förklara Eulers identitet:

[math]\displaystyle{ e^{i \pi} +1 = 0 }[/math]

Den snyggaste GGBn jag vet

Matteskämt

Vad får man om man korsar en rätvinklig triangel med en cirkel?

Pithagoras sats.