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Browse High School Number Theory
Stars indicate particularly interesting answers or
good places to begin browsing.
Selected answers to common questions:
Diophantine equations.
Infinite number of primes?
Testing for primality.
What is 'mod'?
 Roots of ax^f2 bx+c = 0 [05/22/1997]

Prove that if a,b,c are odd integers, then the roots of ax^2 bx+c=0 are
not rational.
 Rounding Negative Numbers [05/23/2007]

I was wondering what 0.5 is rounded to the nearest integer?
 RSA Encryption [04/25/2002]

Decrypt the encrypted message in ciphertext C to find the original
plaintext, a string of English letters.
 Running Time of an Insertion Sort [08/06/1999]

How can I write and solve a recurrence formula for the running time of an
insertion sort? Which is better, an insertion sort or a mergesort?
 Search for the Largest Prime [08/01/2000]

What is the largest finite number that has a practical use in some branch
of mathematics or science? What is the largest prime number known?
 SecondDegree TwoVariable Diophantine Equation [04/12/2001]

Solve Ax^2+Bxy+Cy^2+Dx+Ey+F = 0 where B^24AC=k^2 for some integer k.
 SecondOrder Linear Recurrences [06/08/2001]

Three problems involving recurrence equations.
 Second Order Recurrence with NonConstant Coefficients [05/27/2005]

I'm trying to find a closed form solution of a second order recurrence
relation with no constant coefficients, specifically: u(n+2) =
2*(2*n+3)^2 * u(n+1)  4*(n+1)^2*(2*n+1)*(2*n+3)*u(n). Can you help?
 Semitonal HalfStepping, Ever Sharper [05/05/2012]

An octogenarian wonders why modulating through the circle of fifths results in adjacent
scales that become successively sharper. Doctor George applies some modular
arithmetic to peel away at the chromatic scale — then spontaneously augments
his original response to offer clearer insight.
 Sequence of Integers [08/12/2008]

Find all functions f such that for each n in Z+ we have f(n) > 1 and
f(n + 3)f(n + 2) = f(n + 1) + f(n) + 18.
 Set Theory and GCD and Divisibility [01/27/2003]

If 1 <= a <= n and 1 <= b <= n and ab <= n, and if a divides n and b
divides n, does that mean that ab divides n given that GCD(a,b) = 1 ?
 Show 2^(N1) Congruent to 1(mod N) [02/25/2003]

I need to show that if N = 2^p  1, p prime, then 2^(N1) is congruent
to 1(mod N).
 Showing a Diophantine Equation Has No Solutions [07/30/2008]

Do there exist positive integers m and n such that m^3 = 3n^2 + 3n + 7?
 Showing Divisibility [07/12/1998]

How do you show that 5^(2n) + 3(2^(2n+1)) is divisible by 7?
 Showing Two Numbers Are Relatively Prime [08/01/2008]

Show that for every natural number n, 21n + 4 and 14n + 3 are
relatively prime.
 Show n^3 + 11n Divisible by 6 [12/11/2002]

If n is a natural number, show that for all values of n, (n^3+11n) is
divisible by 6.
 Sigma Notation [12/17/1998]

Some summation formulas; finding Sum((n+1)^2).
 Significance of Irrational Numbers [08/23/1999]

What exactly is the meaning of .333... or pi? What's the difference
between point three repeating and point three to the 105th decimal place?
 Simple Example of Ramanujan's Work [03/28/1999]

Ramanujan's contributions to the divisibility properties of partitions of
whole numbers.
 Simultaneous Modulus Congruencies [04/18/2001]

How can I find x if x = 3 (mod 8), x = 11 (mod 20) and x = 1 (mod 15)?
 Sizes of Infinities [01/31/1997]

How can you prove that one infinity is larger than another?
 Smallest Number Puzzle [06/30/1998]

Find the smallest number which when divided by 9,13,17, and 25 leaves
remainders 1,0,2, and 3 respectively.
 The Smallest Number Which When Divided Leaves Specific Remainders [02/27/2010]

Doctor Rick, an eleven yearold, and her father apply least common multiples,
modular arithmetic, and the Chinese Remainder Theorem to reason their way to the
smallest number which when divided by 3, 7, and 11 leaves remainders 1, 6, and 5,
respectively.
 A Solution in Natural Numbers [10/30/2001]

Prove that x^2+y^2=z^n has a solution in natural numbers for all n, where
n is a natural number.
 Solving a Diophantine Equation [05/01/2005]

How can I find all integer solutions of an equation in the form
aXY + bX + cY + d = 0? For example, 5XY + 3X  8Y  8 = 0.
 Solving a Diophantine Equation [01/28/2005]

Solve the following Diophantine equation: 5x + 3kx = 8k^2  25
 Solving Cubic and Quartic Polynomials [04/30/1998]

Could you describe the algorithms used to solve cubic and quartic
polynomials (Tartaglia's Solution)?
 Solving Diophantine Equations By Organized Thinking [11/25/2003]

Laura is in charge of lighting. Each light fixture supplies exactly
1,000 watts of power to light the bulbs in the fixture. Laura can
use any combination of 150watt, 100watt, 75watt, or 60watt bulbs,
but the total number of watts must be 1,000. How many different
combinations of bulbs could Laura use in a light fixture?
 Solving Modular Formula [11/04/2008]

If a = b^e (mod c), how do I solve for b if I know a and c?
 Solving Multivariable Diophantine Equations [05/03/1998]

Finding general solutions to two diophantine equations.
 Solving the Diophantine Equation x^y  y^x = x + y [04/30/2005]

Find all integer solutions of x^y  y^x = x + y.
 Solving x^y = y^(x  y) for All Natural x, y [11/18/2010]

A student seeks all natural numbers x, y such that x^y = y^(x  y). With chains of
reasoning about integer divisibility and exponentiation, Doctor Vogler deduces all
three solutions.
 Spacing between Prime Numbers [11/08/2005]

Where is the first place that the difference between two consecutive
prime numbers exceeds 2000? Is there a formula or general approach to
finding such differences without having to just read through lists of
known primes?
 Splitting a Sum of Integers into Two Equal Sums [09/07/2004]

Given integers {1,2,3,4,...n}, prove that if their sum is even they
can be split into two equivalent sums, each equal to half of the
original sum, and using each integer once.
 The Square and Multiply Method [08/31/1998]

Solve an encryption problem by solving the math function 33815^(81599)
(mod 154381).
 Square Numbers, All Digits the Same [06/17/2003]

Is there any square number with all the same digits?
 Square of an Odd Number [11/12/2002]

True or false: the square of any odd number can be represented in the
form 8n+1, where n is a whole number.
 Square Root and Sum of Digits [07/25/2008]

I noticed that 81 has the same square root as the sum of its digits
since 8 + 1 = 9 and the square root of 81 is also 9. Are there other
numbers that have the same property?
 Square Root of 2 as a 'Vulgar Fraction' [05/04/2001]

Can the square root of 2 be expressed as a fraction?
 Square Root of a Prime [07/14/1999]

Suppose p is a prime number. Show that sqrt(p) is irrational.
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