Add a minimum number of grouping symbols to either or both sides of this Equation to make it correct so that no opponent can add grouping symbols to make it … Continue →
Buzz Allen, son of Equations creator Layman Allen, distributed this puzzle at the 2013 AGLOA National Tournament. Goal: 6Resources: — — x ÷ ÷ 1 2 3 4 Write 12 … Continue →
Give all integer values of this Goal with Red Exponent: √73-19 where the 3 is red. Indicate the grouping of the Goal that produces each integer value.
With 0 wild, give all integer values, if any, of this Goal: 3√30-8 Indicate what 0 stands for and the grouping of the Goal for each value.
The Number of factors variation is in force along with Multiple operations. The Goal is: 6×3 May a Solution-writer interpret the Goal as 6xx3 (with Multiple operations) and make it … Continue →
The Goal is 6×5+3 with no grouping on the mat. A player presents this Equation after a Challenge: (7 x 4) + 5 – 0 = 33 Assuming the Solution … Continue →
The player in the lead makes a Bonus move. An opponent points out the illegal procedure. In what divisions does the Mover lose one point? (A) Junior/Senior only(B) Elementary/Middle only(C) … Continue →
The Mover plays the last cube in Resources to Forbidden. An opponent challenges Never. What should happen?
Add a minimum number of grouping symbols to either or both sides of this Equation to make it correct. √ 9 + 2 + 4 – 3 = √ 25 + 11
Use all the Resources listed below to write a Solution for this Goal: 21 + ^ ÷ ÷ 0 3 6 7 9