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tegrates

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There are 8 letters in TEGRATES ( A¹E¹G²R¹S¹T¹ )

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6 letters out of TEGRATES

5 letters out of TEGRATES

4 letters out of TEGRATES

3 letters out of TEGRATES

AGE AGS ARE ARS ART ATE ATT EAR EAT ERA ERE ERG ERS ETA GAE GAR GAS GAT GEE GET RAG RAS RAT REE REG RES RET SAE SAG SAT SEA SEE SEG SER SET TAE TAG TAR TAS TAT TEA TEE TEG TET

2 letters out of TEGRATES

AE AG AR AS AT ER ES ET RE TA

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Tegrates might refer to
In mathematics, Tetration (or hyper-4) is the next hyperoperation after exponentiation, and is defined as iterated exponentiation. The word was coined by Reuben Louis Goodstein, from tetra- (four) and iteration. Tetration is used for the notation of very large numbers. The notation * * * * * * * * n * * * a * * * * {\displaystyle {^{n}a}} * means * * * * * * a * * * a * * * ⋅ * * * ⋅ * * a * * * * * * * * * * * * {\displaystyle {a^{a^{\cdot ^{\cdot ^{a}}}}}} * , the application of exponentiation * * * * n * − * 1 * * * {\displaystyle n-1} * times. * Shown here are the first four hyperoperations, with tetration as the fourth (and succession, the unary operation denoted * * * * * a * ′ * * = * a * + * 1 * * * {\displaystyle a'=a+1} * taking * * * * a * * * {\displaystyle a} * and yielding the number after * * * * a * * * {\displaystyle a} * , as the 0th):* Addition * * * * * a * + * n * = * a * + * * * * * 1 * + * 1 * + * ⋯ * + * 1 * * ⏟ * * * * n * * * * * {\displaystyle a+n=a+\underbrace {1+1+\cdots +1} _{n}} * * n copies of 1 added to a. * Multiplication * * * * * a * × * n * = * * * * * a * + * a * + * ⋯ * + * a * * ⏟ * * * * n * * * * * {\displaystyle a\times n=\underbrace {a+a+\cdots +a} _{n}} * * n copies of a combined by addition. * Exponentiation * * * * * * a * * n * * * = * * * * * a * × * a * × * ⋯ * × * a * * ⏟ * * * * n * * * * * {\displaystyle a^{n}=\underbrace {a\times a\times \cdots \times a} _{n}} * * n copies of a combined by multiplication. * Tetration * * * ...

Tegrates might refer to

In mathematics, Tetration (or hyper-4) is the next hyperoperation after exponentiation, and is defined as iterated exponentiation. The word was coined by Reuben Louis Goodstein, from tetra- (four) and iteration. Tetration is used for the notation of very large numbers. The notation
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* , the application of exponentiation
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* Multiplication
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* Exponentiation
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* {\displaystyle a^{n}=\underbrace {a\times a\times \cdots \times a} _{n}}
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* n copies of a combined by multiplication.
* Tetration
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* ...

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