\( CuTHNO \rightarrow Cu ( NO _ { 3 } ) + NO _ { 2 } + H _ { 2 } O \)

To balance the chemical equation \( CuTHNO \rightarrow Cu(NO_3) + NO_2 + H_2O \), we will follow these steps: 1. **Identify the compounds and their elements**: - Reactants: \( CuTHNO \) - Products: \( Cu(NO_3) \), \( NO_2 \), \( H_2O \) 2. **List the number of atoms for each element on both sides**: - On the left (reactants): - Cu: 1 - T: 1 - H: 1 - N: 1 - O: 1 - On the right (products): - Cu: 1 (from \( Cu(NO_3) \)) - N: 3 (2 from \( NO_2 \) and 1 from \( Cu(NO_3) \)) - O: 5 (3 from \( Cu(NO_3) \) and 2 from \( NO_2 \) and 1 from \( H_2O \)) - H: 2 (from \( H_2O \)) 3. **Balance the equation**: - Start with the element that appears in the least number of compounds. In this case, we can start with \( H \) and \( N \). - Adjust coefficients to balance the number of atoms for each element. Let's balance the equation step by step: - We have 1 \( H \) on the left and 2 \( H \) on the right. We can place a coefficient of 2 in front of \( H_2O \): \[ CuTHNO \rightarrow Cu(NO_3) + NO_2 + 2H_2O \] - Now, let's recount the atoms: - On the left: - Cu: 1 - T: 1 - H: 1 - N: 1 - O: 1 - On the right: - Cu: 1 - N: 3 (1 from \( Cu(NO_3) \) and 2 from \( NO_2 \)) - O: 7 (3 from \( Cu(NO_3) \), 2 from \( NO_2 \), and 2 from \( H_2O \)) - H: 4 (from \( 2H_2O \)) Next, we need to balance \( N \) and \( O \). - To balance \( N \), we can adjust the coefficient of \( NO_2 \) to 2: \[ CuTHNO \rightarrow Cu(NO_3) + 2NO_2 + 2H_2O \] Now, let's recount the atoms again: - On the left: - Cu: 1 - T: 1 - H: 1 - N: 1 - O: 1 - On the right: - Cu: 1 - N: 5 (1 from \( Cu(NO_3) \) and 4 from \( 2NO_2 \)) - O: 8 (3 from \( Cu(NO_3) \), 4 from \( 2NO_2 \), and 2 from \( 2H_2O \)) - H: 4 (from \( 2H_2O \)) Finally, we can adjust the coefficient of \( CuTHNO \) to balance \( N \) and \( O \): \[ 2CuTHNO \rightarrow 2Cu(NO_3) + 4NO_2 + 4H_2O \] Now, let's recount the atoms: - On the left: - Cu: 2 - T: 2 - H: 2 - N: 2 - O: 2 - On the right: - Cu: 2 - N: 6 (2 from \( 2Cu(NO_3) \) and 4 from \( 4NO_2 \)) - O: 12 (6 from \( 2Cu(NO_3) \), 8 from \( 4NO_2 \), and 4 from \( 4H_2O \)) - H: 8 (from \( 4H_2O \)) The final balanced equation is: \[ 2CuTHNO \rightarrow 2Cu(NO_3) + 4NO_2 + 4H_2O \] This equation is now balanced with respect to all elements.