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QUESTION 26 5 points A rectangular box with square base and no top is to have...
SORU 1 Determine convergence or divergence of the alternating series. Co 6n+2 [(-1)"In 5n+1 n=1 O...
SORU 1 Determine convergence or divergence of the alternating series. Co 6n+2 [(-1)"In 5n+1 n=1 O A Converges O B. Diverges SORU 2 5 points A rectangular box with square base and no top is to have a volume of 32m². What is the least amount of material required? 36m2 OB. 38m² 42m2 OD. 38m2 ОЕ 48m2
1200 2of material in available to smake a rectangular box with ae se and open top, And the dimensions of the bos of largest ohar 2. A rectangular box with square base and closed top is to have a...
1200 2of material in available to smake a rectangular box with ae se and open top, And the dimensions of the bos of largest ohar 2. A rectangular box with square base and closed top is to have a volume of 1000 in. Find the dimensions of the box with the smallest amount of material used. 3. Use I'Hopital's rule to find 2 cos z-2+2
1200 2of material in available to smake a rectangular box with ae se and open...
Minimizing Packaging Costs A rectangular box is to have a square base and a volume of...
Minimizing Packaging Costs A rectangular box is to have a square base and a volume of 54 ft3. If the material for the base costs $0.22/ft2, the material for the sides costs $0.09/ft2, and the material for the top costs $0.14/ft2, determine the dimensions (in ft) of the box that can be constructed at minimum cost. (Refer to the figure below.) A closed rectangular box has a length of x, a width of x, and a height of y. x=?...
5) A rectangular box with no top is to have a surface area of 16 square...
5) A rectangular box with no top is to have a surface area of 16 square meters. Find the dimensions that maximize the volume.
A box with a square base and open top must have a volume of 4,000 cm.
A box with a square base and open top must have a volume of 4,000 cm. Find the dimensions of the box that minimize the amount of material used.
A rectangular tank with a square base and no top is to have a volume of...
A rectangular tank with a square base and no top is to have a volume of 10 m3 . Material for the bottom of the tank costs $15/m2 and material for the sides costs $6/m2 a. Find the dimensions of the cheapest such tank that can be constructed. b. How much would the tank in part a. cost to build?
10. DETAILS SCALC8 3.7.014. A box with a square base and open top must have a...
10. DETAILS SCALC8 3.7.014. A box with a square base and open top must have a volume of 13,500 cm. Find the dimensions of the box that minimize the amount of material used. sides of base height cm cm Submit Answer
A rectangular box, open at the top, is to have a volume of 1,728 cubic inches. Find the dimension...
A rectangular box, open at the top, is to have a volume of 1,728 cubic inches. Find the dimensions of the box that will minimize the cost of the box if the material of the bottom costs 16 cents per square inch, and the material of the sides costs 1 cent per square inch.
A rectangular box, open at the top, is to have a volume of 1,728 cubic inches. Find the dimensions of the box that will minimize the...
A box with a square base and open top must have a volume of 296352 cm....
A box with a square base and open top must have a volume of 296352 cm. We wish to find the dimensions of the box that minimize the amount of material used. First, find a formula for the surface area of the box in terms of only x, the length of one side of the square base. A(x) = Next, find the derivative, A'(x). A'(x) = The critical value is 3 = The function is decreasing ✓ until the critical...
a box with a square base .6 4. Compute x + 3x4 + 2x3 + 1...
a box with a square base
.6 4. Compute x + 3x4 + 2x3 + 1 -da. 24 일 5. Let F(x) = tet-2+tº +1 dt, find F'(2). tt +3 0 -. A box with a square base and open top must have a volume of 500 cm. Find the dimensions of the box which minimize the amount of material to be used. 2. Draw the graph of f(x) = x ln(1x) - (x - 4) In(x - 41).
SORU 1 Determine convergence or divergence of the alternating series. Co 6n+2 [(-1)"In 5n+1 n=1 O A Converges O B. Diverges SORU 2 5 points A rectangular box with square base and no top is to have a volume of 32m². What is the least amount of material required? 36m2 OB. 38m² 42m2 OD. 38m2 ОЕ 48m2
1200 2of material in available to smake a rectangular box with ae se and open top, And the dimensions of the bos of largest ohar 2. A rectangular box with square base and closed top is to have a volume of 1000 in. Find the dimensions of the box with the smallest amount of material used. 3. Use I'Hopital's rule to find 2 cos z-2+2
1200 2of material in available to smake a rectangular box with ae se and open...
5) A rectangular box with no top is to have a surface area of 16 square meters. Find the dimensions that maximize the volume.
10. DETAILS SCALC8 3.7.014. A box with a square base and open top must have a volume of 13,500 cm. Find the dimensions of the box that minimize the amount of material used. sides of base height cm cm Submit Answer
A rectangular box, open at the top, is to have a volume of 1,728 cubic inches. Find the dimensions of the box that will minimize the cost of the box if the material of the bottom costs 16 cents per square inch, and the material of the sides costs 1 cent per square inch.
A rectangular box, open at the top, is to have a volume of 1,728 cubic inches. Find the dimensions of the box that will minimize the...
A box with a square base and open top must have a volume of 296352 cm. We wish to find the dimensions of the box that minimize the amount of material used. First, find a formula for the surface area of the box in terms of only x, the length of one side of the square base. A(x) = Next, find the derivative, A'(x). A'(x) = The critical value is 3 = The function is decreasing ✓ until the critical...
a box with a square base
.6 4. Compute x + 3x4 + 2x3 + 1 -da. 24 일 5. Let F(x) = tet-2+tº +1 dt, find F'(2). tt +3 0 -. A box with a square base and open top must have a volume of 500 cm. Find the dimensions of the box which minimize the amount of material to be used. 2. Draw the graph of f(x) = x ln(1x) - (x - 4) In(x - 41).
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