The Length, In Inches, Of A Box Is 3 Inches Less Than Twice Its Width, In Inches. Which Of The Following Gives The Length, { L $}$ Inches, In Terms Of The Width, { W $}$ Inches, Of The Box?A. { L = \frac{1}{2}w + 3 $}$

Understanding the Relationship Between Length and Width

In geometry, the dimensions of a box are crucial in determining its overall shape and size. The length, width, and height of a box are essential parameters that help us understand its properties. In this article, we will explore the relationship between the length and width of a box, and how to express the length in terms of the width.

Given Information

The length of a box is 3 inches less than twice its width. This means that if we know the width of the box, we can calculate its length using a specific formula.

Expressing Length in Terms of Width

Let's denote the width of the box as { w $}$ inches. We are given that the length of the box is 3 inches less than twice its width. To express the length in terms of the width, we can use the following formula:

{ l = 2w - 3 $}$

This formula states that the length of the box is equal to twice its width minus 3 inches.

Alternative Formulas

However, the given formula is not the only way to express the length in terms of the width. We can also use the following formula:

{ l = \frac{1}{2}w + 3 $}$

This formula states that the length of the box is equal to half its width plus 3 inches.

Which Formula is Correct?

To determine which formula is correct, let's analyze the given information. We are told that the length of the box is 3 inches less than twice its width. This means that we can start with the width of the box and multiply it by 2, then subtract 3 inches to get the length.

Using this approach, we can see that the correct formula is:

{ l = 2w - 3 $}$

This formula accurately represents the relationship between the length and width of the box.

Why is the Alternative Formula Incorrect?

The alternative formula, { l = \frac{1}{2}w + 3 $}$, is incorrect because it does not accurately represent the relationship between the length and width of the box. This formula states that the length of the box is equal to half its width plus 3 inches, which is not consistent with the given information.

Conclusion

In conclusion, the correct formula for expressing the length of a box in terms of its width is:

{ l = 2w - 3 $}$

This formula accurately represents the relationship between the length and width of the box, and it is consistent with the given information.

Key Takeaways

• The length of a box is 3 inches less than twice its width.
• The correct formula for expressing the length in terms of the width is { l = 2w - 3 $}$.
• The alternative formula, { l = \frac{1}{2}w + 3 $}$, is incorrect because it does not accurately represent the relationship between the length and width of the box.

Final Thoughts

Understanding the Relationship Between Length and Width

In our previous article, we explored the relationship between the length and width of a box, and how to express the length in terms of the width. In this article, we will answer some frequently asked questions related to this topic.

Q: What is the formula for expressing the length of a box in terms of its width?

A: The correct formula for expressing the length of a box in terms of its width is:

{ l = 2w - 3 $}$

This formula states that the length of the box is equal to twice its width minus 3 inches.

Q: Why is the alternative formula, { l = \frac{1}{2}w + 3 $}$, incorrect?

A: The alternative formula is incorrect because it does not accurately represent the relationship between the length and width of the box. This formula states that the length of the box is equal to half its width plus 3 inches, which is not consistent with the given information.

Q: Can I use the alternative formula to calculate the length of a box?

A: No, you should not use the alternative formula to calculate the length of a box. The alternative formula is incorrect and will give you an incorrect result. Instead, use the correct formula:

{ l = 2w - 3 $}$

Q: What if I want to express the width of a box in terms of its length?

A: If you want to express the width of a box in terms of its length, you can use the following formula:

{ w = \frac{l + 3}{2} $}$

This formula states that the width of the box is equal to half its length plus 1.5 inches.

Q: Can I use the formula { w = \frac{l + 3}{2} $}$ to calculate the width of a box?

A: Yes, you can use the formula { w = \frac{l + 3}{2} $}$ to calculate the width of a box. This formula is correct and will give you the correct result.

Q: What if I want to find the length of a box when the width is 5 inches?

A: If you want to find the length of a box when the width is 5 inches, you can use the correct formula:

{ l = 2w - 3 $}$

Substituting w = 5 into the formula, you get:

{ l = 2(5) - 3 $}$${$ l = 10 - 3 $}$${$ l = 7 $}$

So, the length of the box is 7 inches.

Q: What if I want to find the width of a box when the length is 10 inches?

A: If you want to find the width of a box when the length is 10 inches, you can use the formula:

{ w = \frac{l + 3}{2} $}$

Substituting l = 10 into the formula, you get:

{ w = \frac{10 + 3}{2} $}$${$ w = \frac{13}{2} $}$${$ w = 6.5 $}$

So, the width of the box is 6.5 inches.

Conclusion

In conclusion, understanding the relationship between the length and width of a box is crucial in geometry and mathematics. By using the correct formulas, you can calculate the length and width of a box and gain a deeper understanding of its properties.