Answer:
If it doesn’t equal two one gallon it would be greater than. So it’s less than.

Combine like terms to create an equivalent expression. 1/7 - 3 (3/7n - 2/7)

Find the measure of angle b

Find the equation for the line that passes through the points ( 1 , 1 ) and ( − 5 , 6 ) . Give your answer in point-slope form. You do not need to simplify.

Find the indefinite integral using the substitution x = 10 sin(θ). (Use C for the constant of integration.) 1 (100 − x2)3/2 dx

Sanderson Manufacturing produces ornate, decorative wood frame doors and windows. Each item produced goes through three manufacturing processes: cutting, sanding, and finishing. Each door produced requires 1 hour in cutting, 30 minutes in sanding, and 30 minutes in finishing. Each window requires 30 minutes in cutting, 45 minutes in sanding, and 1 hour in finishing. In the coming week Sanderson has 40 hours of cutting capacity available, 40 hours of sanding capacity, and 60 hours of finishing capacity. Assume all doors produced can be sold for a profit of $500 and all windows can be sold for a profit of $400.Required:a. Formulate an LP model for this problem. b. Sketch the feasible region. c. What is the optimal solution?

Find the measure of angle b

Find the equation for the line that passes through the points ( 1 , 1 ) and ( − 5 , 6 ) . Give your answer in point-slope form. You do not need to simplify.

Find the indefinite integral using the substitution x = 10 sin(θ). (Use C for the constant of integration.) 1 (100 − x2)3/2 dx

Sanderson Manufacturing produces ornate, decorative wood frame doors and windows. Each item produced goes through three manufacturing processes: cutting, sanding, and finishing. Each door produced requires 1 hour in cutting, 30 minutes in sanding, and 30 minutes in finishing. Each window requires 30 minutes in cutting, 45 minutes in sanding, and 1 hour in finishing. In the coming week Sanderson has 40 hours of cutting capacity available, 40 hours of sanding capacity, and 60 hours of finishing capacity. Assume all doors produced can be sold for a profit of $500 and all windows can be sold for a profit of $400.Required:a. Formulate an LP model for this problem. b. Sketch the feasible region. c. What is the optimal solution?

**Answer:**

**Step-by-step explanation:**

7630 x .023 = 175.49

175.49 + 28 = **$203.49**

**Answer:**

mb bn nn b

**Step-by-step explanation:**

bn nm m n bn

was the amount of his withdrawal, w, if his ending balance was $922.

O 982 - w = 922

O W - 982 = 922

O 922 - W = 982

**Answer:**

Try 60

**Step-by-step explanation:**

982-922=60

**Answer:**

7=60

6=60

5=120

4=120

2=60

1=120

**Answer:**

angle 4 and angle 5 is = 120degree

**Step-by-step explanation:**

**Answer:**

13

**Step-by-step explanation:**

9/(2/3) = 27/2 = 13.5

**Answer: n=-5**

**Step-by-step explanation:**

**Answer:**

N=-5

**Step-by-step explanation:**

N - 4 = 3n + 6

Add 4 to both sides

n-4+4=3n+6+4

Simplify

n=3n+10

subtract 3n from both sides

n-3n=3n+10-3n

Simplify

-2n=10

Divide -2 from both sides

-2n/-2=10/-2

Simplify

n=-5