use the references to access important values if needed for this question. the illustration on the left…

use the references to access important values if needed for this question. the illustration on the left represents a mixture of n₂ ( blue ) and o₂ ( red ) molecules reacting to form form n₂o₄. count the number of each kind of chemical species in the illustration and fill in the following boxes. n₂ molecules + o₂ molecules → n₂o₄ molecules now divide through by a common factor and fill in the coefficients (smallest integers possible) in the following equation. n₂+ o₂→ n₂o₄ using the equation that you have just completed, fill in the mol ratios below (smallest integers possible) for the reaction. mol o₂ / mol n₂ mol n₂o₄ / mol n₂ mol n₂o₄ / mol o₂ if 8 o₂ molecules react with sufficient n₂, n₂o₄ molecules will be formed. submit answer retry entire group 8 more group attempts remaining

use the references to access important values if needed for this question. the illustration on the left represents a mixture of n₂ ( blue ) and o₂ ( red ) molecules reacting to form form n₂o₄. count the number of each kind of chemical species in the illustration and fill in the following boxes. n₂ molecules + o₂ molecules → n₂o₄ molecules now divide through by a common factor and fill in the coefficients (smallest integers possible) in the following equation. n₂+ o₂→ n₂o₄ using the equation that you have just completed, fill in the mol ratios below (smallest integers possible) for the reaction. mol o₂ / mol n₂ mol n₂o₄ / mol n₂ mol n₂o₄ / mol o₂ if 8 o₂ molecules react with sufficient n₂, n₂o₄ molecules will be formed. submit answer retry entire group 8 more group attempts remaining

Answer

Explanation:

Step1: Count molecules

From the illustration, there are 2 $N_2$ molecules and 4 $O_2$ molecules on the left - hand side, and 2 $N_2O_4$ molecules on the right - hand side. So the first - step equation is $2N_2+4O_2\rightarrow2N_2O_4$.

Step2: Simplify the equation

Divide each coefficient by 2. The simplified chemical equation is $N_2 + 2O_2\rightarrow N_2O_4$.

Step3: Determine mole ratios

From the balanced equation $N_2 + 2O_2\rightarrow N_2O_4$, the mole ratios are: $\frac{2\ mol\ O_2}{1\ mol\ N_2}$, $\frac{1\ mol\ N_2O_4}{1\ mol\ N_2}$, $\frac{1\ mol\ N_2O_4}{2\ mol\ O_2}$.

Step4: Calculate product amount

From the balanced equation, the mole ratio of $O_2$ to $N_2O_4$ is 2:1. If 8 $O_2$ molecules react with sufficient $N_2$, the number of $N_2O_4$ molecules formed is $\frac{8}{2}=4$.

Answer:

  1. First row: 2, 4, 2
  2. Second row: 1, 2, 1
  3. Third row: 2, 1, 1, 1, 1, 2
  4. Fourth row: 4