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Revision as of 02:36, 17 November 2012
The objective of this task is to parse in a difficult polynomial, and generate a "pretty" representation of the polynomial in Unicode.
In the target language define a "polynomial" object (or structure or record). Using this object also define the routines for parsing a polynomial as input, and generating a normalised Unicode representation of the polynomial as output.
Task details:
Given a string containing an untidy Unicode polynomial, e.g.
-0.00x⁺¹⁰ + 1.0·x ** 5 + -2e0x^4 + +0,042.00 × x ⁺³ + +.0x² + 20.000 000 000x¹ - -1x⁺⁰ + .0x⁻¹ + 20.x¹
Coerce (or convert) the string into the "polynomial" object, at the same time normalise the polynomial to a canonical form. The ideal normalised output (in this example) would be:
x⁵ - 2x⁴ + 42x³ + 40x + 1
| Description | Input example test cases |
|---|---|
| "Zero" coefficients are removed | x⁵ - 2x⁴ + 42x³ + 0x² + 40x + 1 |
| The "0" polynomial case | 0e+0x⁰⁰⁷ + 00e-00x + 0x + .0x⁰⁵ - 0.x⁴ + 0×x³ + 0x⁻⁰ + 0/x + 0/x³ + 0x⁻⁵ |
| "One" coefficients are normalised | 1x⁵ - 2x⁴ + 42x³ + 40x + 1x⁰ |
| Signs are normalised | +x⁺⁵ + -2x⁻⁻⁴ + 42x⁺⁺³ + +40x - -1 |
| ASCII representations are parsed | x^5 - 2x**4 + 42x^3 + 40x + 1 |
| Non-ASCII representations are parsed | x↑5 - 2.00·x⁴ + 42.00·x³ + 40.00·x + 1 (c.f. ↑ & ·) |
| Specifically permit non-polynomials where terms have negative exponents | x⁻⁵ - 2⁄x⁴ + 42x⁻³ + 40/x + 1x⁻⁰ (n.b. Unicode Fraction) |
| Spaces in numbers and between operators are ignored | x⁵ - 2x⁴ + 42.000 000x³ + 40x + 1 |
| Single commas are ignored in numbers | x⁵ - 2x⁴ + 0,042x³ + 40.000,000x + 1 |
| A coefficient may be duplicated, zero, or missing | 0x⁷ + 10x + 10x + x⁵ - 2x⁴ + 42x³ + 20x + 1 |
| Support Scientific notation and optionally support Unicode Decimal Exponent Symbol U+23E8/⏨ |
1E0x⁵ - 2,000,000.e-6x⁴ + 4.2⏨1x³ + .40e+2x + 1 |
| Unicode characters that must be specifically supported are: | ⁰ ¹ ² ³ ⁴ ⁵ ⁶ ⁷ ⁸ ⁹ ⁻ ⁺ · × ⁄ ↑ ⏨. Where · & × are multiplication, and ⁄ is Unicode Fraction. |
| Support fractions for both input and output. | x⁵ - x⁴⁄2 + 405x³⁄4 + 403x⁄4 + 5⁄2 On output round the decimal to appropriate fraction. |
| Optionally support Unicode Vulgar fractions for both input and output. ¼ ½ ¾ ⅐ ⅑ ⅒ ⅓ ⅔ ⅕ ⅖ ⅗ ⅘ ⅙ ⅚ ⅛ ⅜ ⅝ ⅞ ↉ |
x⁵ - ½x⁴ + 101¼x³ + 100¾x + 2½ On output round the decimal to appropriate fraction. |
There are (at least) three possible ways of achieving this task.
- Using an external parsing library.
- Using a built-in parsing/formatting library.
- Coding a custom polynomial parsing routing.
Either one, or all of these approaches are accepted and appear as a subtitle.