can hold. volume of box 1: 3x5 volume of box 2: 4x5 – x4 if celine decides The volume of Box 1 is (3*2^{5} = 96) and the volume of Box 2 is (4*2^{5}-2^{4} = 112).', 'From this, we can see that when x = 2, the volume of Box 2 is greater than the volume of Box 1. .
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0 · suppose céline wants to choose a box that maximizes the
1 · suppose celine wants to choose a box that maximizes the
2 · suppose celine wants to choose a box that maximizes
3 · Suppose Celine wants to choose a box that maximizes the
4 · Solved: Suppose Celine wants to choose a box that maximizes
5 · Solved: Suppose Celine wants to choose a box that Which did
6 · SOLVED: Suppose Celine wants to choose a box that maximizes
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suppose céline wants to choose a box that maximizes the
If a box has a greater volume, it can hold more cereal. Volume of Box 1: 3x^5 Volume of Box 2: 4x^5-x^4 Box 2 can hold more cereal. Although the value of x is unknown, it represents a .
Volume of Box 2: 4x5-x4 Box 2 can hold more cereal. Although the value of x is unknown, it represents a fength, so it must be greater than zero. For any x>1, If Celine decides the width .We are given the volume formulas for two different boxes. Box 1 has a volume of 3x^5, and Box 2 has a volume of 4x^5 - x^4. We are also told that the width of the cereal boxes will be greater than 1.Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. Volume of Box 1: 3x5 Volume of Box 2: 4x5 – x4 If Celine decides the width of the cereal boxes will .
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suppose celine wants to choose a box that maximizes the
Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. Volume of Box 1: 3x^6 Volume of Box 2: 4x^6-x^4 If Celine decides the width of the cereal boxes will .
The volume of Box 1 is (3*2^{5} = 96) and the volume of Box 2 is (4*2^{5}-2^{4} = 112).', 'From this, we can see that when x = 2, the volume of Box 2 is greater than the volume of Box 1. .Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. Volume of Box 1: 3x5 Volume of Box 2: 4x5 _ x4 If Celine decides the width of the cereal boxes will .Volume of Box 1: 3x^(5) Volume of Box 2: 4x^(5)-x^(4) If Celine decides the width of the cereal boxes will be greater than 1 , which box will hold more cereal? Explain. Show MoreExplanation: To determine which cereal box holds more, we need to compare the volumes of the two boxes. For Box 1, the volume is 3 x 5, which simplifies to 15, considering the width x is .
For different values of greater than 1, the volume of Box 2 is consistently greater than the volume of Box 1. For example, let's check a few values: - For : Here, . - For : Again, . 4. Conclusion: - For , the volume of Box 2 ( ) is always greater than the volume of Box 1 ( ). - Therefore, if Celine wants to choose the box that maximizes the .
- Volume of Box 1: - Volume of Box 2: We are asked to find which box holds more cereal when the width of the cereal boxes is greater than 1, so let's consider a value , which is greater than 1, to make our comparison. 1. Calculate the volume of Box 1 when : 2. Calculate the volume of Box 2 when : 3. Now that we have the volumes for : - Box 1 .Which did you include in your response? Option 1: If a box has a greater volume, it can hold more cereal. Option 2: Box 2 can hold more cereal. Option 3: Although the value of x is unknown, it represents a length, so it must be greater than zero. Option 4: For any x > 1, the volume of box 2 is greater than the volume of box 1.First, let's substitute (since it's a value greater than 1) into the volume expressions and see which volume comes out larger. For Box 1, the volume is: For Box 2, the volume is: Now we compare the volumes: - Volume of Box 1: 96 - Volume of Box 2: 112 Since 112 (volume of Box 2) is greater than 96 (volume of Box 1), Box 2 can hold more cereal .
Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. Volume of Box 1: 3x5 Volume of Box 2: 4x5 – x4 If Celine decides the width of the cereal boxes will be greater than 1, which box will hold more cereal? Explain.- For Box 2: 4. Compare the Volumes: - Volume of Box 1 = 96 - Volume of Box 2 = 112 Since 112 is greater than 96, Box 2 can hold more cereal than Box 1 for this given width greater than 1. 5. Conclusion: Therefore, if Celine wants to maximize the amount of cereal her box can hold and the width is greater than 1, Box 2 will be the better choice .Since the difference is positive for , it means that the volume of Box 2 is greater than the volume of Box 1 for these values of . Therefore, for , Box 2 will hold more cereal than Box 1. Celine should choose Box 2 if she wants to maximize the amount of cereal the box can hold when the width is greater than 1.
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Which did you include in your response? Option 1: If a box has a greater volume, it can hold more cereal. Option 2: Box 2 can hold more cereal. Option 3: Although the value of x is unknown, it represents a length, so it must be greater than zero. Option 4: For any x > 1, the volume of box 2 is greater than the volume of box 1.
- Volume of Box 2: ### For : - Volume of Box 1: - Volume of Box 2: Now let's compare the volumes for each width : - For : Box 1 holds 96, Box 2 holds 112 - For : Box 1 holds 729, Box 2 holds 891 - For : Box 1 holds 3072, Box 2 holds 3840 - For : Box 1 holds 9375, Box 2 holds 11875 In each case, Box 2 holds more cereal than Box 1. Thus, Celine .
- Volume of Box 2: - Substitute into the volume formula for Box 2: 4. Compare the Volumes: After evaluating the above calculations: - Volume of Box 1 is approximately . - Volume of Box 2 is approximately . Since the volume of Box 2 is greater than the volume of Box 1 (), Box 2 can hold more cereal when the width is greater than 1. Therefore .
To determine which box holds more cereal, we need to compare the volumes of the two boxes by considering a value of greater than 1, since the width of the boxes needs to be greater than 1. 1. Volume of Box 1: The volume is given by the expression . 2. Volume of Box 2: The volume is given by the expression . Let's evaluate these volumes using a value slightly greater than 1 for .Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. The length and width of box 1 is 3 and 5, respectively, and the length and width of box 2 is 4 and 5, respectively. If Celine decides the width of the cereal boxes will be greater than 1, which box will hold more cereal? Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. Volume of Box 1: 3x5 Volume of Box 2: 4x5 – x4 If Celine decides the width of the cereal boxes will be greater than 1, which box will hold more cereal? Explain. Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. Volume of Box 1: 3x5 Volume of Box 2: 4x5 – x4 If Celine decides the width of the cereal boxes will be greater than 1, which box will hold more cereal? Explain.
- A positive value for means that Volume of Box 2 is greater than Volume of Box 1. - Thus, for , Box 2 will hold more cereal than Box 1. So, if Celine wants to choose a box that maximizes the amount of cereal it can hold when the width is greater than 1, she should choose Box 2.So, there is no value of greater than 1 that satisfies . 6. Conclusion: Since cannot be less than 1 for volumes to work as required under , we conclude that under the condition : - Volume of Box 1 will always be less than Volume of Box 2 (). Therefore, Celine should choose Box 2 as it will hold more cereal when the width of the cereal boxes is .
Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. Volume of Box 1: 3x5 Volume of Box 2: 4x5 – x4 If Celine decides the width of the cereal boxes will be greater than 1, which box will hold more cereal? Explain. 00:52. Packaging. The amount of cardboard needed to make the cereal box shown below can be found .Given the equation for the box's dimension as (4x-1)(x)(x^3), the degrees for length, width, and height would be 1,1, and 3 respectively. Length's degree: the term in the length with the highest degree is (4x-1) which is a degree of 1. Width's degree: The width is . Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. Volume of Box 1: 3x5 Volume of Box 2: 4x5 – x4 If Celine decides the width of the cereal boxes will be greater than 1, which box will hold more cereal? Explain.
Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. Volume of Box 1: 3x5 Volume of Box 2: 4x5 – x4 If Celine decides the width of the cereal boxes will be greater than 1, which box will hold more cereal? Explain. 01:40. FOOD Most cereals are packaged in cardboard boxes. If a box of cereal is 14 inches high, 6 . Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. Volume of Box 1: 3x5 Volume of Box 2: 4x5 – x4 If Celine decides the width of the cereal boxes will be greater than 1, which box will hold more cereal? Explain.Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. Volume of Box 1: 3x5 Volume of Box 2: 4x5 – x4 If Celine decides the width of the cereal boxes will be greater than 1, which box will hold more cereal? Explain. 01:41. A company sells cereal in 2 different-sized boxes. DIMENSIONS FOR SMALLER CEREAL BOX .Suppose Celine wants to choose a box that maximizes the amount of cereal it can hold. Volume of Box 1: 3x^6 Volume of Box 2: 4x^6-x^4 If Celine decides the width of the cereal boxes will be greater than 1, which box will hold more cereal? Explain. Intro
Option B is correct: "Box 2 can hold more cereal. Although the value of x is unknown, it represents a length, so it must be greater than 0. For any x > 1, the volume of Box 2 is greater than the volume of Box 1." To determine which box can hold more cereal, let's compare the volumes of Box 1 and Box 2 step by step: Volume of Box 1: Volume of Box 2:Volume of Box 1: 3x^5 Volume of Box 2: 4x^5-x^4 Box 2 can hold more cereal. Although the value of x is unknown, it represents a length, If Celine decides the width of the cereal boxes will so it must be greater than zero. For any x> be greater than 1, which box will hold more 1, the volume of Box 2 is greater than the cereal? Explain. volume of .
Which expression represents the volume of this can? d. Use FOIL to explain how to find the product of(a + b)(a − b). . Celine's Cereal Company is launching a new brand of cereal and she is considering two different sizes for the base of the boxes. . Box 2: The length is 1 less than 4 times the width. The dimensions of the base of Box 1 .
- The coefficient of in Box 1 is 3. - The coefficient of in Box 2 is 4. Since 4 is greater than 3, the polynomial for Box 2 will grow faster than that for Box 1 as increases when . 4. Conclusion: - Therefore, for any value of greater than 1, Box 2 will hold more cereal than Box 1. Thus, Celine should choose Box 2 to maximize the amount of .
suppose celine wants to choose a box that maximizes
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can hold. volume of box 1: 3x5 volume of box 2: 4x5 – x4 if celine decides|Solved: Suppose Celine wants to choose a box that maximizes