I am terrible at doing mental math, so I was recommended to play this simple game to hone my number sense. The game involves picking four numbers and the coming generating the numbers from $1$ to $20$.
Here's an example: Let the set of numbers be $\left \{ 2,3,4,5 \right \}$.
The numbers generated are as follows:
$1 = \left ( 3-2 \right )\times \left ( 5-4 \right )$
$2 = \left ( 3-2 \right )+ \left ( 5-4 \right )$
$3 = 3 \times \left ( \left ( 4+2 \right ) \times 5\right ))$
$4 = \left ( 4-2 \right )+ \left ( 5-3 \right )$
$5 = 2 + \frac{4+5}{3}$
$6 = 3 + \frac{4+5}{2}$
$7 = \left ( 2 \times 3 \right )+ \left ( 5-4 \right )$
$8 = \left ( 2+4 \right )+ \left ( 5-3 \right )$
$9 = \left ( 4+5 \right )+ \left ( 3-2 \right )$
$10 = \left ( 2 \times 5 \right )\times \left ( 4-3 \right )$
$11 = \left ( 2 \times 5 \right )+ \left ( 4-3 \right )$
$12 = \left ( 2 + 4 \right )\times \left ( 5-3 \right )$
$13 = \left ( 4-2 \right )\times 5 + 3$
$14 = 2 + 3+ 4 + 5$
$15 = \left ( 2 \times 3 \right )+ \left ( 4+5 \right )$
$16 = 4 \times \left [ \left ( 5-3 \right ) +2 \right ]$
$17 = \left ( 3 \times 5 \right )+ \left ( 4 - 2 \right )$
$18 = 3^{2} + 4 + 5$
$19 = \left ( 4 \times 5 \right )- 3 + 2$
$20 = \left ( 4 \times 5 \right )\times \left ( 3-2 \right )$
However this game becomes difficult with a different set of numbers consisting of primes $\left \{ 2,3,5,7 \right \}$. The number $5$ couldn't be obtained.
So does this type of game actually help in getting good at mental math?
