The cost of manufacturing three pianos on a given day using the cost function C ( x ) of manufacturing x pianos in one day, where the fixed cost and a marginal cost of a piano manufacturer is $ 1000 and $ 1500 per piano respectively.
The cost of manufacturing three pianos on a given day using the cost function C ( x ) of manufacturing x pianos in one day, where the fixed cost and a marginal cost of a piano manufacturer is $ 1000 and $ 1500 per piano respectively.
Solution Summary: The author explains how to calculate the cost of manufacturing three pianos on a given day.
To calculate: The cost of manufacturing three pianos on a given day using the cost function C(x) of manufacturing x pianos in one day, where the fixed cost and a marginal cost of a piano manufacturer is $1000 and $1500 per piano respectively.
(b)
To determine
To calculate: The cost of manufacturing third pianos on that day using the cost function C(x) of manufacturing x pianos in one day, where the fixed cost and a marginal cost of a piano manufacturer is $1000 and $1500 per piano respectively.
(c)
To determine
To calculate: The cost of manufacturing 11th piano on that day using the cost function C(x) of manufacturing x pianos in one day, where the fixed cost and a marginal cost of a piano manufacturer is $1000 and $1500 per piano respectively.
(d)
To determine
To calculate: The variable cost, the fixed cost and the marginal cost using the cost function C(x) of manufacturing x pianos in one day, where the fixed cost and a marginal cost of a piano manufacturer is $1000 and $1500 per piano respectively.
(e)
To determine
To graph: The sketch of the cost function C(x) of manufacturing x pianos in one day, where the fixed cost and a marginal cost of a piano manufacturer is $1000 and $1500 per piano respectively.
2. [-/4 Points]
DETAILS
MY NOTES
SESSCALCET2 7.3.002.
Let S be the solid obtained by rotating the region shown in the figure about the y-axis. (Assume a = 6 and b = 2.)
ASK YOUR TEACHER
0
y = a sin(bx²)
Sketch a typical approximating shell.
y
6
4
2
x
π/b
y
2
1
x
0.5
1.0
1.5
0.2
0.4
0.6
0.8
1.0
-2
-1
-4
The graph of f', the derivative of f, is shown in the graph below. If f(-9) = -5, what is the value of f(-1)?
y
87 19
6
LO
5
4
3
1
Graph of f'
x
-10 -9 -8 -7 -6 -5 -4 -3 -2 -1
1
2
3
4 5
6
7 8 9 10
-1
-2
-3
-4
-5
-6
-7
-8
564%