1 yall suck with the limit on answers thing...
2 simplify 7/9 h + 10 - 4/9 h -3
To simplify the expression 7/9h + 10 - 4/9h - 3, we can combine like terms.
The 7/9h and -4/9h can be combined since they have the same variable (h).
7/9h - 4/9h = (7 - 4)/9h = 3/9h = 1/3h
The other two constants, 10 and -3, can also be combined.
10 - 3 = 7
Now, the simplified expression becomes:
1/3h + 7
My answers are
3 / 9 h squared + 7 = 1/3 h squared + 7
Or 3 over 18 h + 7 - 1/6 h + 7 or
3/18 h + 7 equals 1/6 h + 7 or
3/9 h + 7 = 1/3 h + 7.
Apologies for the confusion. Let's go through the simplification process step by step.
The original expression is 7/9h + 10 - 4/9h - 3.
First, let's simplify the terms with h:
7/9h - 4/9h = (7 - 4)/9h = 3/9h = 1/3h
Next, let's simplify the constant terms:
10 - 3 = 7
Now the simplified expression becomes:
1/3h + 7
So, the correct answer is indeed 1/3h + 7.
Does the h have a 2 over it or no?
Apologies for the misunderstanding earlier. If the h has a 2 over it, the expression becomes:
(3/9h^2) + 7
The variables and constants cannot be combined since they have different terms. Hence, the simplified expression is:
3/9h^2 + 7
Expand -4 ( 2x + 5)
Expand 5/8 ( -8 - 3F)
Find the GCF of 9W - 24
Find the GCF of 40a + 16
Factor negative 15x - 25
Factor 24e + 32 f using the GCF
To expand -4(2x + 5), we multiply -4 by each term inside the parentheses:
-4 * 2x = -8x
-4 * 5 = -20
The expanded expression becomes: -8x - 20.
To expand 5/8 (-8 - 3F), we multiply 5/8 by each term inside the parentheses:
(5/8) * -8 = -40/8 = -5
(5/8) * -3F = -15F/8
The expanded expression becomes: -5 - 15F/8.
The greatest common factor (GCF) of 9W - 24 is 3. To find the GCF, we identify the largest factor that divides both terms evenly. In this case, both 9W and -24 have a common factor of 3.
The greatest common factor (GCF) of 40a + 16 is 8. Both terms are divisible by 8 evenly.
To factor negative 15x - 25, we can factor out a common factor of -5:
-5(3x + 5)
To factor 24e + 32f using the GCF, we need to find the largest common factor between the coefficients 24 and 32, which is 8. Then we divide each term by the GCF.
8(3e + 4f)
Which property of operation should be applied first when adding 5 ( g + 2)+3(h-4)
Add the linear expressions 7 (n - 2)+5(n+4) +3(n+1)
Subtract (j + 2)- 2 (3-9 J)
Subtract (2u - 7y) minus (7u + 2y)
Simplify 9 + 3 (4a - 7) minus 5A + 6
When adding or subtracting expressions, the distributive property should be applied first.
For the expression 5(g + 2) + 3(h - 4):
First, distribute the 5 to each term inside the parentheses:
5 * g + 5 * 2 = 5g + 10
Then, distribute the 3 to each term inside the parentheses:
3 * h + 3 * -4 = 3h - 12
The simplified expression becomes:
5g + 10 + 3h - 12
To add the linear expressions 7(n - 2) + 5(n + 4) + 3(n + 1):
First, distribute the 7 to each term inside the parentheses:
7 * n - 7 * 2 = 7n - 14
Then, distribute the 5 to each term inside the parentheses:
5 * n + 5 * 4 = 5n + 20
Next, distribute the 3 to each term inside the parentheses:
3 * n + 3 * 1 = 3n + 3
The simplified expression becomes:
7n - 14 + 5n + 20 + 3n + 3
To subtract (j + 2) - 2(3 - 9j):
Start by simplifying the expression inside the parentheses:
2(3 - 9j) = 6 - 18j
Then subtract (j + 2) - (6 - 18j):
j + 2 - 6 + 18j
Combine like terms:
(j + 18j) + (2 - 6)
The simplified expression becomes:
19j - 4
To subtract (2u - 7y) - (7u + 2y):
Start by distributing the negative sign to each term inside the second parentheses:
(2u - 7y) - 7u - 2y
Combine like terms:
(2u - 7u) + (-7y - 2y)
The simplified expression becomes:
-u - 9y
To simplify 9 + 3(4a - 7) - 5a + 6:
First, distribute the 3 to each term inside the parentheses:
3 * 4a - 3 * 7 = 12a - 21
Next, simplify the expression by combining like terms:
9 + 12a - 21 - 5a + 6
The simplified expression becomes:
7a - 6