Problem: Article: On your turn, you can do one of the following actions:  Buy a horse. Play a card. Bet on a horse. Discard 2 cards for $5. Do nothing. To do this, look at their price tag on the side, and pay the bank that amount. Take the horse and place it in front of you. You now own this horse. This purchase counts as your one action for your turn. You can only do one action per turn, so if you choose to play a card that will count as your one action.  You can play any card you want on your turn. You can play a moving horse card or a money card. If you play a money card, you get the amount of money that the card says. If you play a moving horse card, you move the horse as described on the card.
Summary: Decide on one action for your turn. Consider buying a horse. Play a card if desired.

INPUT ARTICLE: Article: An easy way to factor a number is by creating a factor tree diagram. Read Do a Factor Tree for complete instructions.  A radicand is the number under the radical sign. A prime number is a number that can only be divided evenly by 1 and itself, for example, 2, 3, 5, 7, 11, etc. You do NOT need to factor any coefficients. A coefficient is a number in front of the radical sign. Let’s say, for example, that you want to add 20+445+5+7.{\displaystyle {\sqrt {20}}+4{\sqrt {45}}+{\sqrt {5}}+{\sqrt {7}}.}To do this, you need to factor 20{\displaystyle 20} as 2×2×5{\displaystyle 2\times 2\times 5}. You also need to factor 45{\displaystyle 45} as 3×3×5{\displaystyle 3\times 3\times 5}. If a radicand is already a prime number, it does not need to be factored. For example, since 5{\displaystyle 5} and 7{\displaystyle 7} are already prime numbers, 5{\displaystyle {\sqrt {5}}} and 7{\displaystyle {\sqrt {7}}} do not need to be factored. Keep all the factors under the radical sign. For example, after factoring the radicands, the example expression would be2×2×5+43×3×5+5+7.{\displaystyle {\sqrt {2\times 2\times 5}}+4{\sqrt {3\times 3\times 5}}+{\sqrt {5}}+{\sqrt {7}}.} Since you are finding a square root, by pairing up like factors, you can easily simplify the expression. For example, 2×2×5{\displaystyle {\sqrt {2\times 2\times 5}}} has a pair of 2s, so draw a circle around them. 43×3×5{\displaystyle 4{\sqrt {3\times 3\times 5}}} has a pair of 3s, so draw a circle around them. The square root of any pair of factors will equal the factor, because x×x=x2{\displaystyle x\times x=x^{2}} and x2=x{\displaystyle {\sqrt {x^{2}}}=x}. Place this number in front of the radical sign. If the expression already has a coefficient, multiply the two numbers.  For example:2×2×5{\displaystyle {\sqrt {2\times 2\times 5}}}=45{\displaystyle ={\sqrt {4}}{\sqrt {5}}}=25{\displaystyle =2{\sqrt {5}}}So, 20{\displaystyle {\sqrt {20}}} simplifies to 25{\displaystyle 2{\sqrt {5}}}.  43×3×5{\displaystyle 4{\sqrt {3\times 3\times 5}}}=4×95{\displaystyle =4\times {\sqrt {9}}{\sqrt {5}}}=(4×3)5{\displaystyle =(4\times 3){\sqrt {5}}}=125{\displaystyle =12{\sqrt {5}}}So, 445{\displaystyle 4{\sqrt {45}}}simplifies to 125{\displaystyle 12{\sqrt {5}}}. This will make the adding process much easier. For example:20+445+5+7{\displaystyle {\sqrt {20}}+4{\sqrt {45}}+{\sqrt {5}}+{\sqrt {7}}} simplifies to25+125+5+7{\displaystyle 2{\sqrt {5}}+12{\sqrt {5}}+{\sqrt {5}}+{\sqrt {7}}}

SUMMARY: Factor each radicand into prime numbers. Rewrite the expression. Circle pairs of like factors under each radical. Factor out coefficients by identifying paired factors under each radical. Rewrite your problem, using the simplified terms.

In one sentence, describe what the following article is about: Use 1 pound (453.59 g) of peanuts still in their shells. Drain the peanuts. Next, put them in a large stockpot. Add 4 cups (.96 L) of fresh water and 4 tablespoons (59.14 mL) of kosher salt to the stockpot. You can also add 2 tablespoons (29.57 mL) of smoked paprika, Old Bay Seasoning, shrimp boil mix, or star anise to the water with the salt. Reduce the heat to a very low boil, and cover the stockpot. Boil the peanuts until they are soft. The longer you boil them, the saltier and softer they will become. Try boiling them for as few as 2 hours for firmer, less salty nuts or up to 12 hours for a very soft and salty nut. Drain the nuts, but do not rinse them. Store the boiled peanuts in an airtight container. Eat or serve all the peanuts within 2 or 3 days after preparing them. They will dry out and become inedible after that.
Summary:
Rinse raw peanuts in fresh water. Bring the water, salt, and peanuts to a boil. Take the stockpot off the heat.