What is the value of the expression (a + b) over 4 + (a / b) + c if a = 2, b = 6, c = 10?

• A. 2
• B. 2 1/8
• C. 3
• D. 3 1/2

Answer: (B)

To find the value of the expression \((a + b) / 4 + (a / b) + c\) given that \(a = 2\), \(b = 6\), and \(c = 10\), we can start by substituting these values into the expression. 1. First, calculate \(a + b\): \[ a + b = 2 + 6 = 8 \] 2. Now, calculate \((a + b) / 4\): \[ (a + b) / 4 = 8 / 4 = 2 \] 3. Next, calculate \(a / b\): \[ a / b = 2 / 6 = 1/3 \] 4. Lastly, we include \(c\): \[ c = 10 \] Now we can combine all these parts together: \[ 2 + (1/3) + 10 \] To add these, we must first convert everything to a common form. Here, it's convenient to express 2 and 10 as fractions with a denominator of 3: \[ 2

To find the value of the expression ((a + b) / 4 + (a / b) + c) given that (a = 2), (b = 6), and (c = 10), we can start by substituting these values into the expression.

1. First, calculate (a + b):

[

a + b = 2 + 6 = 8

]

2. Now, calculate ((a + b) / 4):

[

(a + b) / 4 = 8 / 4 = 2

]

3. Next, calculate (a / b):

[

a / b = 2 / 6 = 1/3

]

4. Lastly, we include (c):

[

c = 10

]

Now we can combine all these parts together:

[

2 + (1/3) + 10

]

To add these, we must first convert everything to a common form. Here, it's convenient to express 2 and 10 as fractions with a denominator of 3:

[

2