# Rabbit Algebra

(Difference between revisions)
 Revision as of 04:14, 19 November 2006 (edit)← Older edit Revision as of 19:25, 4 December 2006 (edit) (undo)Lapper (Talk | contribs) (LaTeX formatting)Newer edit → Line 4: Line 4: ==Fun Facts== ==Fun Facts== - *If solved, ''x'' = ±9. + *If solved, $x = \pm 9$ - *The score, log''x''14, is dependent on ''x'' + *The score, \log_x 14, is dependent on ''x'' **Setting ''x'' to 14 or any integer root of 14 (e.g. square root, cube root, etc) yields an integral score. **Setting ''x'' to 14 or any integer root of 14 (e.g. square root, cube root, etc) yields an integral score. - **If ''x'' = 9 ''(see above)'', the score is 1.2011. + **If $x = 9$ ''(see above)'', the score is 1.2011. - **If ''x'' = –9, the score is the [[wikipedia:complex number|complex number]] 0.3945 – 0.5641''i''. + **If $x = - 9$, the score is the [[Wikipedia:Complex number|complex number]] $0.3945 - 0.5641i$. - **If ''x'' = 3 ''(see below)'', the score is 2.4022. + **If $x = 3$ ''(see below)'', the score is 2.4022. **The score cannot be zero. **The score cannot be zero. - *In the number of "mans", 2''x''=6, ''x'' is equal to 3. + *In the number of "mans", $2x = 6$, ''x'' is equal to 3. - *The version on HomestarRunner.com PAY PLUS! has the problem ''x''2 + 28 = 44, which gives ''x'' = ±4. + *The version on [[HomestarRunner.com PAY PLUS!]] has the problem x^2 + 28 = 44[/itex], which yields $x = \pm 4$ ==Appearances== ==Appearances==

## Revision as of 19:25, 4 December 2006

Solve for X!!

Rabbit Algebra is a Videlectrix educational title, shown in the Peasant's Quest Preview. It is a "game" where algebra is taught by a rabbit. This is a parody of The Learning Company's Reader Rabbit and Math Rabbit, where various animals teach elementary subjects. It is not listed on Videlectrix's website and cannot be played.

## Fun Facts

• If solved, $x = \pm 9$
• The score, logx14, is dependent on x
• Setting x to 14 or any integer root of 14 (e.g. square root, cube root, etc) yields an integral score.
• If x = 9 (see above), the score is 1.2011.
• If x = − 9, the score is the complex number 0.3945 − 0.5641i.
• If x = 3 (see below), the score is 2.4022.
• The score cannot be zero.
• In the number of "mans", 2x = 6, x is equal to 3.
• The version on HomestarRunner.com PAY PLUS! has the problem x2 + 28 = 44, which yields $x = \pm 4$