Question

A box in the shape of a rectangular prism has the dimensions shown. What is the length of the interior diagonal of the box? Round to the nearest tenth. Enter your answer in the box. A rectangular prism 60 centimeters wide, 80 centimeters long, and 100 centimeters tall. A diagonal d is drawn from the upper right rear corner to the lowest left front corner.

Answers

  1. It is to be noted that the length of the interior diagonal of the box whose dimensions are Height 100cm, Lenght, 80 cm, and width 60 cm, is 140.4cm.

    What is the formula for the length of a right rectangular prism?

    Recall that the formula for the diagonal length of a right rectangular prism is calculated as √(l² + w² + h²) units. So, the formula for the length of a right rectangular prism’s diagonal is √(l²+w²+h²), where l is the length, b is the breadth, and h is the height.
    Plugging in the values we have:

    d² = 60² + 80² + 100²

    Solving for d, we get:
    d = √(660² + 80² + 100²)
    = √(3600 + 6400 + 10000)
    = √(20000)
    = 140.4 cm
    Thus, the length of the interior diagonal of the box is 140.4 cm.
    Learn more about interior diagonal:
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