Question

balance the following equations by placing small whole - number coefficients in the appropriate places.
synthesis

1. ba + o₂ → bao
2. c + s → cs₂
3. li + o₂ → li₂o
4. mg + n₂ → mg₃n₂
5. fecl₂ + cl₂ → fecl₃

decomposition

1. kclo₃ → kcl + o₂
2. ag₂o → ag + o₂
3. cuco₃ → cuo + co₂
4. aubr₃ → au + br₂
5. lif₄ → li + f₂

single replacement

1. zn + hcl → zncl₂ + h₂
2. zn + cuso₄ → znso₄ + cu
3. cu + agno₃ → cu(no₃)₂ + ag
4. k + h₂o → koh + h₂
5. al + cucl₂ → alcl₃ + cu

double replacement

1. bacl₂ + na₂so₄ → nacl + baso₄
2. zncl₂ + (nh₄)₂s → nh₄cl + zns
3. naoh + hcl → nacl + h₂o
4. fes + hcl → fecl₂ + h₂s
5. alcl₃ + naoh →

combustion

1. c₂h₆ + o₂ → co₂ + h₂o
2. c₄h₁₀ + o₂ → co₂ + h₂o
3. c₂h₆o + o₂ → co₂ + h₂o

Explanation:

Let's take problem 1 (Synthesis: $\ce{Ba + O_{2} -> BaO}$) as an example to balance the equation.

Step1: Count atoms on each side

Left side: Ba = 1, O = 2; Right side: Ba = 1, O = 1.

Step2: Balance O atoms

To balance O, multiply $\ce{BaO}$ by 2: $\ce{Ba + O_{2} -> 2BaO}$. Now O is balanced (2 on each side), but Ba is 1 on left and 2 on right.

Step3: Balance Ba atoms

Multiply $\ce{Ba}$ by 2: $\ce{2Ba + O_{2} -> 2BaO}$. Now Ba: 2 on left and 2 on right; O: 2 on left and 2 on right.

Step1: Count atoms

Left: C = 1, S = 1; Right: C = 1, S = 2.

Step2: Balance S

Multiply S by 2: $\ce{C + 2S -> CS_{2}}$. Now C:1, S:2 on both sides.

Step1: Count atoms

Left: Li = 1, O = 2; Right: Li = 2, O = 1.

Step2: Balance O

Multiply $\ce{Li_{2}O}$ by 2: $\ce{Li + O_{2} -> 2Li_{2}O}$. Now O:2 on both sides, Li:1 left, 4 right.

Step3: Balance Li

Multiply Li by 4: $\ce{4Li + O_{2} -> 2Li_{2}O}$. Now Li:4, O:2 on both sides. Wait, but we can simplify. Wait, better way:
Start over. Let's balance O first. O on left: 2, right:1. So multiply $\ce{Li_{2}O}$ by 2 (O:2). Then Li on right: 4, so multiply Li by 4? No, wait, maybe a better approach. Wait, the correct way:
Left: O = 2, right: O = 1 (in $\ce{Li_{2}O}$). So to balance O, we need 2 O on right, so $\ce{Li_{2}O}$ 2 (O:2). Then Li: 4 on right, so Li 4? But that gives 4 Li + O₂ -> 2 Li₂O. Let's check: Li:4, O:2 on both sides. Yes.
But alternatively, maybe I made a mistake. Wait, the correct balanced equation is $\ce{4Li + O_{2} -> 2Li_{2}O}$.

Answer:

$\ce{2Ba + O_{2} -> 2BaO}$

For problem 2 (Synthesis: $\ce{C + S -> CS_{2}}$):