Seeker of Lost Homework
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Seeker of Lost Homework is a Basic Collections achievement that requires unlocking all of the trophies from Cracked Fractal Encryption boxes.
Achievement[edit]
  Seeker of Lost Homework
|
Basic Collections | 5
|
|---|---|---|
| Collect 21 junk items from Fractal Encryptions awarded in the Fractals of the Mists."Math? Of course I know math! What kind of things are they teaching you kids these days? Bah!" —Councillor Phlunt
|
Collected 1 Junk Item From Fractal Encryptions | 1
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| Collected 6 Junk Items From Fractal Encryptions | 1
| |
| Collected 11 Junk Items From Fractal Encryptions | 1
| |
| Collected 16 Junk Items From Fractal Encryptions | 1
| |
| Collected 21 Junk Items From Fractal Encryptions | 1
|
Items in this collection[edit]
| Collectible | Type | Subtype | Notes | |
|---|---|---|---|---|
| 1 |  Proof of Bask's Theorem
|
Item | Trophy | Refers to a particular proof of the Pythagorean Theorem (after Bhaskar). |
| 2 | Proof of Neta's Square Inversion Law
|
Item | Trophy | Refers to the inversely quadratic property of an intensity in relation to a distance in some physical laws (after Newton). |
| 3 | Proof of Gott's Integral Derivation
|
Item | Trophy | Refers to the Fundamental Theorem of Calculus, which states that differentiation reverses the process of integration, and that integration can be used to find antiderivatives (after Gottfried Leibniz). |
| 4 | Proof of Drik's Transformations
|
Item | Trophy | Refers specifically to the Lorentz Transformations of relativity (after Hendrik Lorentz). |
| 5 | Proof of Gali's Proportional Traversal
|
Item | Trophy | Refers to Interception theorem (also known as Thales' theorem, used to determinate ratios of various line segments that are created if two intersecting lines are intercepted by a pair of parallels (after Galileo Galilei). |
| 6 | Proof of Dekin's Rational Cuts
|
Item | Trophy | Refers to Dedekind cut, which is a partition of the rational numbers into two non-empty sets A and B, such that all elements of A are less than all elements of B, and A contains no greatest element. Dedekind cuts are one method of construction of the real numbers (after Richard Dedekind). |
| 7 |  Manuscript of 'Halfway There and...'
|
Item | Trophy | Refers to one of Zeno's paradoxes where one cannot reach a destination due to constantly having to travel half the distance to it. |
| 8 | Manuscript of 'This Book Is False'
|
Item | Trophy | Refers to the Liar's paradox. |
| 9 | Manuscript of 'Proposal for a 1:1 Scale Map of Tyria'
|
Item | Trophy | Refers to a 1:1 scale model simply being the original object. |
| 10 |  Postulate of Construction
|
Item | Trophy | Refers to the first postulate (axiom) of Euclidean geometry from Euclid's Elements, which states that a straight line can be constructed from any point to any other point.. |
| 11 | Postulate of Continuity
|
Item | Trophy | Refers to the second postulate of Euclidean geometry from Euclid's Elements, which states that a finite straight line can be extended continuously. |
| 12 | Postulate of Diameter
|
Item | Trophy | Refers to the third postulate of Euclidean geometry from Euclid's Elements, which states that a circle can be described with any given centre and radius (and therefore any given diameter, since the diameter of the circle is 2 times the radius). |
| 13 | Postulate of Rectitude
|
Item | Trophy | Refers to the fourth postulate of Euclidean geometry from Euclid's Elements, which states that "all right angles are equal to one another". |
| 14 | Postulate of Parallels
|
Item | Trophy | Refers to the Parallel Postulate, the fifth postulate of Euclidean geometry from Euclid's Elements, which is often stated as "in a plane, given a line and a point not on it, at most one line parallel to the given line can be drawn through the point". |
| 15 | Postulate of Superposition
|
Item | Trophy | Refers to the Method of Superposition, a method of proof used in Euclid's Elements but not permitted by the axioms. Some modern treatments of Euclidean geometry add an extra sixth postulate to account for this. |
| 16 |  Treatise on Convergence
|
Item | Trophy | Refers to the Convergent propriety of series in maths - a Convergent series is a series that converge to its limit. |
| 17 | Treatise on Divergence
|
Item | Trophy | Refers to the Divergency of series in maths - a Divergent series is a series that does not converge to its limit. |
| 18 | Treatise on Equivalence
|
Item | Trophy | Refers to a term X being equal to a term Y. |
| 19 | Treatise on Symmetry
|
Item | Trophy | Refers to the invariability of an object after a transformation. |
| 20 | Treatise on Iteration
|
Item | Trophy | Refers to the act of repeating a process with the aim of approaching a desired result. |
| 21 | Treatise on Commensurability
|
Item | Trophy | Refers to the probability of two concepts or things of being measurable or comparable by a common standard. |
