31) $(11b^{3}-3b^{4})-(3b^{3}-11b^{4}+7b)$
32) $(12p + 14p^{5})+(8 - 14p^{5}-4p)$
33) $(14p^{5}+4p^{3})-(4p^{4}-14p^{3}+14p^{5})$
34) $(12b + 4b^{3})-(5b^{2}+4b^{3}-11b)$
35) $(-5m^{3}+12m^{5}+9m^{2})+(5m^{2}+6m^{5}-9m^{3})$
36) $(-12k - 6k^{2}-12k^{4})+(-5k - 6k^{2}-1k^{4})$
37) $(11r^{4}-8 - 4r^{2})-(10r^{2}-2 - 14r^{4})$
38) $(-6p^{2}-12 + 13p^{3})+(-3p^{2}-11p^{3}-2)$
39) $(-4 - 11n^{2}-4n^{3})-(-2 + 3n^{2}-9n^{3})$

Question

Accepted Answer

Let's solve each problem one by one:

### Problem 31:
# Explanation:
## Step1: Remove parentheses
$(11b^{3}-3b^{4})-(3b^{3}-11b^{4}+7b)=11b^{3}-3b^{4}-3b^{3}+11b^{4}-7b$
## Step2: Combine like terms
For $b^{4}$: $-3b^{4}+11b^{4}=8b^{4}$
For $b^{3}$: $11b^{3}-3b^{3}=8b^{3}$
The term with $b$: $-7b$
So the result is $8b^{4}+8b^{3}-7b$
# Answer:
$8b^{4}+8b^{3}-7b$

### Problem 32:
# Explanation:
## Step1: Remove parentheses
$(12p + 14p^{5})+(8-14p^{5}-4p)=12p + 14p^{5}+8-14p^{5}-4p$
## Step2: Combine like terms
For $p^{5}$: $14p^{5}-14p^{5}=0$
For $p$: $12p-4p = 8p$
The constant term: $8$
So the result is $8p + 8$
# Answer:
$8p + 8$

### Problem 33:
# Explanation:
## Step1: Remove parentheses
$(14p^{5}+4p^{3})-(4p^{4}-14p^{3}+14p^{5})=14p^{5}+4p^{3}-4p^{4}+14p^{3}-14p^{5}$
## Step2: Combine like terms
For $p^{5}$: $14p^{5}-14p^{5}=0$
For $p^{3}$: $4p^{3}+14p^{3}=18p^{3}$
The term with $p^{4}$: $-4p^{4}$
So the result is $-4p^{4}+18p^{3}$
# Answer:
$-4p^{4}+18p^{3}$

### Problem 34:
# Explanation:
## Step1: Remove parentheses
$(12b + 4b^{3})-(5b^{2}+4b^{3}-11b)=12b + 4b^{3}-5b^{2}-4b^{3}+11b$
## Step2: Combine like terms
For $b^{3}$: $4b^{3}-4b^{3}=0$
For $b$: $12b + 11b=23b$
The term with $b^{2}$: $-5b^{2}$
So the result is $23b-5b^{2}$
# Answer:
$23b - 5b^{2}$

### Problem 35:
# Explanation:
## Step1: Remove parentheses
$(-5m^{3}+12m^{5}+9m^{2})+(5m^{2}+6m^{5}-9m^{3})=-5m^{3}+12m^{5}+9m^{2}+5m^{2}+6m^{5}-9m^{3}$
## Step2: Combine like terms
For $m^{5}$: $12m^{5}+6m^{5}=18m^{5}$
For $m^{3}$: $-5m^{3}-9m^{3}=-14m^{3}$
For $m^{2}$: $9m^{2}+5m^{2}=14m^{2}$
So the result is $18m^{5}-14m^{3}+14m^{2}$
# Answer:
$18m^{5}-14m^{3}+14m^{2}$

### Problem 36:
(Assuming the last term is $-12k^{4}$ instead of $-1\mathrm{i}k^{4}$ as it might be a typo)
# Explanation:
## Step1: Remove parentheses
$(-12k-6k^{2}-12k^{4})+(-5k-6k^{2}-12k^{4})=-12k-6k^{2}-12k^{4}-5k-6k^{2}-12k^{4}$
## Step2: Combine like terms
For $k^{4}$: $-12k^{4}-12k^{4}=-24k^{4}$
For $k^{2}$: $-6k^{2}-6k^{2}=-12k^{2}$
For $k$: $-12k-5k=-17k$
So the result is $-24k^{4}-12k^{2}-17k$
# Answer:
$-24k^{4}-12k^{2}-17k$ (assuming the typo correction)

### Problem 37:
# Explanation:
## Step1: Remove parentheses
$(11r^{4}-8 - 4r^{2})-(10r^{2}-2-14r^{4})=11r^{4}-8 - 4r^{2}-10r^{2}+2 + 14r^{4}$
## Step2: Combine like terms
For $r^{4}$: $11r^{4}+14r^{4}=25r^{4}$
For $r^{2}$: $-4r^{2}-10r^{2}=-14r^{2}$
For constants: $-8 + 2=-6$
So the result is $25r^{4}-14r^{2}-6$
# Answer:
$25r^{4}-14r^{2}-6$

### Problem 38:
# Explanation:
## Step1: Remove parentheses
$(-6p^{2}-12 + 13p^{3})+(-3p^{2}-11p^{3}-2)=-6p^{2}-12 + 13p^{3}-3p^{2}-11p^{3}-2$
## Step2: Combine like terms
For $p^{3}$: $13p^{3}-11p^{3}=2p^{3}$
For $p^{2}$: $-6p^{2}-3p^{2}=-9p^{2}$
For constants: $-12-2=-14$
So the result is $2p^{3}-9p^{2}-14$
# Answer:
$2p^{3}-9p^{2}-14$

### Problem 39:
# Explanation:
## Step1: Remove parentheses
$(-4-11n^{2}-4n^{3})-(-2 + 3n^{2}-9n^{3})=-4-11n^{2}-4n^{3}+2-3n^{2}+9n^{3}$
## Step2: Combine like terms
For $n^{3}$: $-4n^{3}+9n^{3}=5n^{3}$
For $n^{2}$: $-11n^{2}-3n^{2}=-14n^{2}$
For constants: $-4 + 2=-2$
So the result is $5n^{3}-14n^{2}-2$
# Answer:
$5n^{3}-14n^{2}-2$

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QUESTION IMAGE

Question

Explanation:

Problem 31:

Step1: Remove parentheses

Step2: Combine like terms

Step1: Remove parentheses

Step2: Combine like terms

Step1: Remove parentheses

Step2: Combine like terms

Answer:

Problem 32: