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- '''2014 [[UNM-PNM Statewide High School Mathematics Contest | UNM-PNM Contest]]''' problems and solutions. The test was held on February 1, 2014. The fir * [[2014 UNM-PNM Statewide High School Mathematics Contest II Problems|Entire Test]]2 KB (190 words) - 22:57, 7 November 2014
- ...<math>\textdollar{25}</math> to monogram BARRY and <math>\textdollar{18}</math> to monogram SARAH, <math>b+r+y+a+n= 21</math>1 KB (242 words) - 22:44, 3 August 2020
- ...) = x^3 + 6x^2 + 12x + 6</math>, solve the equation <math>f(f(f(x))) = 0.</math> {{UNM-PNM Math Contest box|year=2014|n=II|num-b=1|num-a=3}}243 bytes (34 words) - 22:26, 7 November 2014
- ...th>f(x) = x^3+6x^2+12x+6</math>, solve the equation <math>f(f(f(x))) = 0.</math> ...o and solving for <math>x</math>, we have <math>\boxed{x=-2+\sqrt[27]{2}}</math>427 bytes (70 words) - 19:51, 17 January 2021
- ...th> and <math>B</math>, are having a discussion about the ages of <math>B</math>’s children. B: “The product of their ages is <math>72</math>.”2 KB (239 words) - 19:42, 25 July 2016
- ...</math> such that there is an equilateral triangle of side length <math>1</math> with two vertices on one of ...clearly works, so the smallest distance would be <math>2\cdot1=\boxed{2}</math>2 KB (315 words) - 21:44, 17 November 2019
- <math>5^n</math> is written on the blackboard. The sum of its digits is calculated. Then th ...t is calculated and so on until we have a single digit. If <math>n = 2014</math>, what2 KB (259 words) - 23:06, 28 November 2021
- How many triples <math>(x, y, z)</math> of rational numbers satisfy the following system of equations? If <math>z=0</math>, then <math>x+y = 0</math> and <math>xy + 2y = 0</math>. We can rearrange and solve:871 bytes (143 words) - 19:57, 25 July 2016
- ...Show that the sum of the <math>k^{th}</math> powers of the first <math>n</math> positive integers is a polynomial of degree <math>k + 1</math>, i.e.,700 bytes (112 words) - 12:23, 20 December 2018
- ...ions equivalent to <math>\textdollar{15}</math> and <math>\textdollar{44}</math>. The ATM as both bills are used. Show that you can withdraw <math>\textdollar{x}</math> if and only if you cannot withdraw2 KB (355 words) - 20:04, 20 October 2022
- Suppose that <math>f</math> is a mapping of the plane into itself such that the vertices of every ...math>f</math> is distance preserving, i.e., <math>d(p, q) = d(f(p), f(q))</math> for all points825 bytes (146 words) - 00:37, 6 August 2020
- Given a sheet in the shape of a rhombus whose side is <math>2</math> meters long and one of its angles is <math>60^{\circ}</math> what is the maximum area that can be cut out of the sheet if we are allowe400 bytes (66 words) - 00:37, 6 August 2020
- ...<math>\textdollar{25}</math> to monogram BARRY and <math>\textdollar{18}</math> to monogram SARAH, <math>b+r+y+a+n= 21</math>1 KB (211 words) - 10:55, 4 August 2020
- '''2015 [[UNM-PNM Statewide High School Mathematics Contest | UNM-PNM Contest]]''' problems and solutions. The test was held on February 7, 2015. The fir * [[2015 UNM-PNM Statewide High School Mathematics Contest II Problems|Entire Test]]2 KB (190 words) - 01:47, 12 January 2019
- '''2016 [[UNM-PNM Statewide High School Mathematics Contest | UNM-PNM Contest]]''' problems and solutions. The test was held on February 6, 2016. The fir * [[2016 UNM-PNM Statewide High School Mathematics Contest II Problems|Entire Test]]2 KB (190 words) - 01:49, 12 January 2019
- '''2017 [[UNM-PNM Statewide High School Mathematics Contest | UNM-PNM Contest]]''' problems and solutions. The test was held on February 4, 2017. The fir * [[2017 UNM-PNM Statewide High School Mathematics Contest II Problems|Entire Test]]2 KB (190 words) - 01:50, 12 January 2019
- '''2018 [[UNM-PNM Statewide High School Mathematics Contest | UNM-PNM Contest]]''' problems and solutions. The test was held on February 3, 2018. The fir * [[2018 UNM-PNM Statewide High School Mathematics Contest II Problems|Entire Test]]2 KB (189 words) - 01:51, 12 January 2019
- <math>1, 2, 2, 4, 4, 4, 4, 8, 8, 8, 8, 8, 8, 8, 8, \cdots </math> what number occupies position <math>2015</math>?742 bytes (99 words) - 23:18, 31 January 2020
- Show that if <math>S</math> is a set of finitely many non-collinear points in the plane (i.e., not all points of <math>S</math>. Is the claim true if <math>S</math> has infinitely many points? Hint: Use an extremal444 bytes (76 words) - 02:50, 12 January 2019
- {{UNM-PNM Math Contest box|year=2015|n=II|num-b=2|num-a=4}}556 bytes (96 words) - 02:50, 12 January 2019