Hint | Answer | % Correct |
---|---|---|
Number of regular plane tesselations | 3 | 81%
|
Number of semi-regular plane tesselations | 8 | 73%
|
Number of Archimedean solids | 13 | 50%
|
Euler Characteristic of a torus | 0 | 38%
|
Pascal's first name | Blaise | 31%
|
States that Pythagorean triples with higher exponents do not exist | Fermat's Last Theorem | 29%
|
Loop that, when chopped in half, remains a loop | Möbius strip | 27%
|
4-dimensional extension of complex numbers | Quaternions | 25%
|
Alice in Wonderland author (pen and real names) | Lewis Carroll | 21%
|
Reflection of a complex number across the real axis | conjugate | 19%
|
Namesake of the Cartesian plane (first name required) | René Descartes | 19%
|
French Mathematician; died aged 20 from a duel | Évariste Galois | 17%
|
Isogonal conjugate of the circumcentre | Orthocentre | 17%
|
The product of a gross, a dozen, and a score | 34560 | 13%
|
Object that, when chopped in half, gives the previous answer | Klein bottle | 13%
|
A non-disjoint graph whose vertices all have even degree contains an... | Eulerian circuit | 12%
|
Regular polychora | Hexadecachoron | 12%
|
Circumcircle of the midpoints of the sides of a triangle | Nine point circle | 12%
|
Regular polychora | Icositetrachoron | 10%
|
Regular polychora | Octachoron | 10%
|
Regular polychora | Pentachoron | 10%
|
Reflection of the median across the angle bisector | Symmedian | 10%
|
States that a^b - c^d = 1 has only 1 integer solution when all 4 variables are greater than 1 | Catalan's Conjecture | 8%
|
States that two triangles are in perspective axially if and only if they are in perspective centrally | Desargues' Theorem | 8%
|
States that there exist arbitrarily long arithmetic progressions of prime numbers | Green-Tao Theorem | 8%
|
Regular polychora | Hecatonicosachoron | 8%
|
Regular polychora | Hexacosichoron | 8%
|
Fibonacci sequence, but starting with 2, 1, ... | Lucas numbers | 8%
|
Result of colouring Pascal's triangle by parity | Sierpinski's triangle | 8%
|
States that any continuous function mapping a compact convex non-empty set into itself maps a point to itself | Brouwer's fixed point theorem | 6%
|
Alice in Wonderland author (pen and real names) | Charles Lutwidge Dodgson | 6%
|
What the "fi" in Fibonacci stands for | filius | 6%
|
States that a^b - c^d = 1 has only 1 integer solution when all 4 variables are greater than 1 | Mihăilescu's Theorem | 6%
|
A prime p, where 2p+1 is prime | Sophie Germain prime | 4%
|
States that a spherical triangle on a unit sphere has area equal to the sum of its angles, minus pi | Girard's Theorem | 2%
|
Copyright H Brothers Inc, 2008–2024
Contact Us | Go To Top | View Mobile Site