1) Discuss one topic that you struggled with in this homework. Be specific. Use a specific problem from the homework assignment or text and give as much of the solution process as you can. If you...

1 answer below »

View more »
Answered Same DayDec 24, 2021

Answer To: 1) Discuss one topic that you struggled with in this homework. Be specific. Use a specific problem...

Robert answered on Dec 24 2021
121 Votes
554593-7

1.
     
6 6 6
6 7 6 7a b a b [Use property  
n n nab a b ]
  6 6 7 6a b  [Use property  
m
n nma a ]
  36 42a b
Therefore,
    
6
6 7 36 42a b a b
2.

 
 
55 33
55 5
yy
z z
 
 
 
[Use property
n n
n
a a
b b
 
 
 
]

 
 
3 5
5 5
y
z




15
25
y
z

Therefore,
5
3 15
5 25
y y
z z
 
 
 
3.
Consider the expression

2
2
vw

Since the expression has only one term and no negative exponent, so it is a monomial.
4.
Consider the expression

2 24 3x xy y 
Since the expression has three terms
24x , 3xy and
2y and no negative exponent, so it
is a trinomial.
5.
Consider the expression

7 6 58 2y y y  
Since the expression has four terms
7y ,
6y ,
58y and 2 , so the given expression is not a
monomial, not a binomial and not a trinomial.
6.
Consider the expression

3 47 10 10x x 
First write the highest power term which is 4, next the highest power is 3 and lastly the
power is zero

3 4 4 37 10 10 10 7 10x x x x     .
7.
Consider the expression

2 10 6x x  
Put 3x  in the given expression
2 210 6 3 10 3 6
9 30 6
45
x x       
   
 
8.
The statement is false.
Consider the expression
4 310 7 10x x  . The number of term in the expression is three,
so it is a trinomial. The highest power of the expression is 4, so the degree of the
trinomial is 4.
9.
Consider the expression

08x
Since
0 1x  , so

08 8 1
8
x  

10.
Consider the expression

35
The expression can be written as

3
3
1
5
5
  [use the property
1a
a
x
x
  ]

1
125

11.
Consider the expression

5
20
m
m

Since the power in the numerator is positive and smaller than the power in the
denominator, so write the numerator term in the denominator.

5
20 20 5
1m
m m m
 [Use the property
1a
a
x
x
 ]

20 5
1
m 
 [Use the property
a b a bx x x   ]

15
1
m

Therefore,

5
20 15
1m
m m

12.
Consider the expression

 
 
5
3
4
3
r
r r



First use property  
m
n nma a
 
 
 
 
5
3 3 5
4 3 43
15
12
r r
r rr r
r
r r


...
SOLUTION.PDF

Answer To This Question Is Available To Download

Related Questions & Answers

More Questions »

Submit New Assignment

Copy and Paste Your Assignment Here
April
January
February
March
April
May
June
July
August
September
October
November
December
2025
2025
2026
2027
SunMonTueWedThuFriSat
30
31
1
2
3
4
5
6
7
8
9
10
11
12
13
14
15
16
17
18
19
20
21
22
23
24
25
26
27
28
29
30
1
2
3
00:00
00:30
01:00
01:30
02:00
02:30
03:00
03:30
04:00
04:30
05:00
05:30
06:00
06:30
07:00
07:30
08:00
08:30
09:00
09:30
10:00
10:30
11:00
11:30
12:00
12:30
13:00
13:30
14:00
14:30
15:00
15:30
16:00
16:30
17:00
17:30
18:00
18:30
19:00
19:30
20:00
20:30
21:00
21:30
22:00
22:30
23:00
23:30