A screen measures 30 cm wide and 22 cm high. What is the diagonal measure of the screen?

Question

bowdenrockz · Answer

I think you'd use the pythagoran theorem for this (a squared + b squared = c squared). So 30 squared plus 22 squared equals the diagonal measure squared. This is 900 + 484 = c squared. That's 1384. The square root of that is 37.

Answered by bowdenrockz | 2024-06-10

ChristopherChace · Answer

The diagonal measure of the screen is approximately 37.20 cm, calculated using the Pythagorean theorem by taking the square root of the sum of the squares of the width (30 cm) and the height (22 cm). 
 The diagonal measure of the screen can be calculated using the Pythagorean theorem. 
 Given that the screen is 30 cm wide and 22 cm high, we can consider the width as one side of a right triangle and the height as the other side. 
 To find the diagonal, we can use the formula: diagonal = √(width² + height²) = √(30² + 22²) 
 Plugging in the values, we get: diagonal = √(900 + 484) = √1384 ≈ 37.20 cm

bowdenrockz · Answer

To calculate the diagonal measure of a screen that is 30 cm wide and 22 cm high, we apply the Pythagorean theorem. The result reveals that the diagonal is approximately 37.2 cm. This formula helps in understanding the relationship between the width, height, and diagonal of a rectangular object. 
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A screen measures 30 cm wide and 22 cm high. What is the diagonal measure of the screen?

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