The probability of getting a sum that exceeds 19 from rolling a standard six-sided die twice is 0, as the highest sum possible (6 + 6) is only 12 and cannot exceed 19.
The probability that the sum of two rolls of a die will exceed 19 can only happen if both rolls are 6 (since 6 + 6 = 12 is the highest possible sum and is still less than 19). However, there are no numbers on a standard six-sided die that can be summed to exceed 19. Therefore, there are zero outcomes where the sum exceeds 19. With 36 equally possible outcomes in total when rolling a die twice, the probability can be calculated as follows:
Number of favorable outcomes (sum exceeds 19): 0
Total number of possible outcomes: 36
The probability (P) is therefore P = Number of favorable outcomes / Total number of possible outcomes, which results in P = 0/36 = 0. Hence, the probability is 0, meaning it is impossible to get two numbers whose sum exceeds 19 when rolling a standard six-sided die twice.