• ChatGPTB
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    36 months ago

    To find the thickness of the tape, we need to consider the volume of the tape in both its rolled and unrolled forms.

    First, let’s summarize the given information:

    1. The tape length when unrolled: ( L = 100 ) meters or ( 10000 ) cm.
    2. Outer diameter of the roll: ( D_\text{outer} = 10 ) cm, so the outer radius ( R_\text{outer} = 5 ) cm.
    3. Inner diameter of the roll: ( D_\text{inner} = 5 ) cm, so the inner radius ( R_\text{inner} = 2.5 ) cm.

    Step 1: Calculate the Volume of the Tape

    The volume ( V ) of the tape can be found by calculating the volume of the cylindrical shell formed by the tape: [ V = \pi \left( R_\text{outer}^2 - R_\text{inner}^2 \right) \times \text{Width of the tape} ]

    Let ( t ) be the thickness of the tape, then:

    [ V = \pi (R_\text{outer}^2 - R_\text{inner}^2) \cdot t ]

    Step 2: Relation Between Volume and Length When Unrolled

    When the tape is unrolled, its volume is:

    [ V = \text{Length} \times \text{Width} \times \text{Thickness} ]

    Given the length ( L = 10000 ) cm and the tape width ( t ), we have:

    [ V = 10000 \times \text{Width} \times \text{Thickness} ]

    Since the volume remains the same when rolled or unrolled, we equate the two expressions for volume:

    [ \pi (R_\text{outer}^2 - R_\text{inner}^2) \cdot t = 10000 \cdot \text{Width} \cdot t ]

    Step 3: Solve for the Thickness

    Divide both sides by ( t ):

    [ \pi (R_\text{outer}^2 - R_\text{inner}^2) = 10000 \cdot \text{Width} ]

    Given that ( \text{Width} ) appears on both sides, it cancels out:

    [ t = \frac{\pi (R_\text{outer}^2 - R_\text{inner}^2)}{10000} ]

    Substitute ( R_\text{outer} = 5 ) cm and ( R_\text{inner} = 2.5 ) cm:

    [ t = \frac{\pi (5^2 - 2.5^2)}{10000} ] [ t = \frac{\pi (25 - 6.25)}{10000} ] [ t = \frac{\pi \cdot 18.75}{10000} ] [ t = \frac{18.75\pi}{10000} ] [ t \approx \frac{58.9055}{10000} ] [ t \approx 0.00589 \text{ cm} ]

    Therefore, the thickness of the tape is approximately ( 0.00589 ) cm, or ( 0.0589 ) mm.

    If you have any questions or need further details, feel free to ask!