The real-world problem that is most likely to involve irrational numbers is finding the side length of a square based on the area. This is because, when calculating the side length \( s \) of a square from its area \( A \), you use the formula \( s = \sqrt{A} \). If the area is not a perfect square (for example, if \( A = 2 \)), the result for \( s \) will be an irrational number (in this case, \( \sqrt{2} \)).
Which real-world problem is most likely to involve irrational numbers?(1 point)Responsesfinding the total cost of filling up a car's tank based on the price per gallonfinding the total cost of filling up a car's tank based on the price per gallonfinding the side length of a square based on the areafinding the side length of a square based on the areafinding the width of a rectangle based on the area and the lengthfinding the width of a rectangle based on the area and the lengthfinding the diameter of a circle based on the radius
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