For each word in column A, select a word from column B that is nearest to an antonym of that word. Write a letter in the blank provided.

\begin{tabular}{|c|c|c|}
\hline Blank & A & B \\
\hline D & 1. veracious & M. reversible \\
\hline E & 2. advocate & N. serious \\
\hline F & 3. jeopardy & C. facetious \\
\hline I & 4. perjury & D. deceitfulness \\
\hline K & 5. abjure & E. disapprove \\
\hline C & 6. jocular & F. hazard \\
\hline B & 7. veracity & G. listless \\
\hline L & 8. omniscient & H. unsocial \\
\hline & 9. vivacious & I. dishonest \\
\hline & 10. omnipotent & J. powerless \\
\hline & 11. irrevocable & K. acknowledge \\
\hline & 12. convivial & L. unknowing \\
\hline
\end{tabular}



Answer :

Certainly! Let's match each word from Column A to the most appropriate antonym from Column B, step-by-step. I'll provide the reasoning for each match as well.

1. veracious (A) - The most suitable antonym for "veracious," which means truthful, is "deceitfulness" (D). Hence, we write D in the blank for 1.

2. advocate (A) - An advocate supports a cause or a person. The most fitting antonym is "disapprove" (E). Thus, we write E in the blank for 2.

3. jeopardy (A) - Jeopardy means danger or risk. The closest antonym is "hazard" (F), since it implies a perilous situation as well. Thus, we write F in the blank for 3.

4. perjury (A) - Perjury means lying under oath. The antonym here would be "dishonest" (I), as it contrasts directly to honesty. Therefore, we write I in the blank for 4.

5. abjure (A) - To abjure means to renounce or reject. The best antonym is "acknowledge" (K) as it means to accept or admit. Hence, we write K in the blank for 5.

6. jocular (A) - Jocular means playful or humorous. The antonym would be "facetious" (C), as it implies joking or not being serious. Thus, we write C in the blank for 6.

7. veracity (A) - Veracity means truthfulness. The antonym is "dishonest" (I), as it contrasts with being truthful. Therefore, we write I in the blank for 7.

8. omniscient (A) - Omniscient means all-knowing. The opposite would be "unknowing" (L). Thus, we write L in the blank for 8.

9. vivacious (A) - Vivacious means lively and energetic. The antonym would be "listless" (G), which means lacking energy or enthusiasm. Therefore, we write G in the blank for 9.

10. omnipotent (A) - Omnipotent means all-powerful. The antonym is "powerless" (J), which signifies having no power. Hence, we write J in the blank for 10.

11. irrevocable (A) - Irrevocable means something that cannot be changed or reversed. The antonym here would be "reversible" (M). Thus, we write M in the blank for 11.

12. convivial (A) - Convivial means sociable and friendly. The antonym is "unsocial" (H), meaning not sociable or friendly. Therefore, we write H in the blank for 12.

So the final filled table would be:

[tex]\[ \begin{array}{|c|c|c|} \hline \text{Blank} & A & B \\ \hline \text{D} & \text{1. veracious} & \text{M. reversible} \\ \hline \text{E} & \text{2. advocate} & \text{B. truth N. serious} \\ \hline \text{F} & \text{3. jeopardy} & \text{C. facetious} \\ \hline \text{I} & \text{4. perjury} & \text{D. deceitfulness} \\ \hline \text{K} & \text{5. abjure} & \text{E. disapprove} \\ \hline \text{C} & \text{6. jocular} & \text{F. hazard} \\ \hline \text{I} & \text{7. veracity} & \text{G. listless} \\ \hline \text{L} & \text{8. omniscient} & \text{H. unsocial} \\ \hline \text{G} & \text{9. vivacious} & \text{I. dishonest} \\ \hline \text{J} & \text{10. omnipotent} & \text{J. powerless} \\ \hline \text{M} & \text{11. irrevocable} & \text{K. acknowledge} \\ \hline \text{H} & \text{12. convivial} & \text{L. unknowing} \\ \hline \end{array} \][/tex]