Essay About Truth Table in Symbolic Logic

Every time we add a new atomic sentence, we will double the number of possible combinations. 2 sentences give us 4 combinations, 8 give us 16, and so on and so forth. Mathematically speaking, if I have n number of atomic sentences, we will have 2ⁿ possible combinations for that group of atomic sentences. We will have 2^n-1 T’s followed by 2^n-1 F’s in the first column, then 2^n-2 T’s, 2^n-2 F’s, 2^n-2 T’s, and 2^n-2 F’s in the second column, until I am at the nth column, and have 2^n-n = 2⁰ = 1 T, 1 F, and so on (78).

Once you have created all the possible truth value combinations, you turn to your argument. Start by plugging in the truth value each time you see the atomic sentence in the compound. Then you will apply negations, if any exist, and place the new truth value underneath it. Finally, we look at each compound and determine what the overall truth value is based off the atomic sentences. Once we have the truth of that compound, we place that value underneath the connective of the sentences. Once we have the final truth value of the argument, we either place an arrow over that column or we circle it (79, 80).

For example, the argument A v (B ^ ~ C) is shown below. 3 atomic sentences are visible, so we expect 2³ = 8 possible combinations, with 2^3-1 = 2² = 4 T’s in first column, then 4 F’s, 2^3-2 = 2¹ = 2 T’s, 2 F’s, 2 T’s, and 2 F’s in second column, and finally 2^3-3 = 2⁰ = 1 T, 1 F, and so on. Plugging those values into each argument, we arrive at the conclusion of the argument which is presented in the center.