Person A decided to research the laws of falling objects and their history. Read the following passage and select the most appropriate number from the options that follow for each question.
“The ancient Greek 1 was a great 3 who lived more than 2 years ago. He believed that when objects fall, ‘the heavier 4 falls faster.’ This theory was widely accepted for a long time, but 6, who was active in the 5th century, exposed the contradiction in this theory through a thought experiment.
Suppose a heavy object and a light object are 7 together with a string. If the old theory were correct, the slower-falling 8 would hold the entire system back, so the two connected objects should fall at 9. However, since connecting the two objects increases the total mass by 10 compared to the original heavy object alone, according to the old theory, the connected objects should fall at 11.
Thus, two contradictory conclusions are derived from the same premises. Therefore, we can conclude that the original theory is 12. In reality, if 13 is a 14 space, then all objects are 15.
1: Isaac Newton 2: Galileo Galilei 3: Aristotle 4: Archimedes
1: 500 2: 1100 3: 1700 4: 2300
1: Physicist 2: Philosopher 3: Astronomer 4: Alchemist
1: Heavy 2: Light 3: Large in volume
1: 4 2: 12 3: 16 4: 20
1: Isaac Newton 2: Galileo Galilei 3: René Descartes 4: Copernicus
1: Tied 2: Collided 3: Rubbed together
1: Heavy object 2: Light object 3: The string itself
1: A speed faster than that of a single heavy object 2: A speed between that of a heavy object and a light object 3: A speed slower than that of a light object alone
1: Heavy 2: Light 3: Unchanged
1: It must fall as slowly as possible 2: It must fall as fast as possible 3: It must come to a stop partway down
1: Completely correct 2: Incorrect 3: It’s hard to say
1: Air resistance 2: Gravitational force 3: Electrostatic force
1: If present (exists) 2: If absent (can be ignored)
1: They fall simultaneously regardless of weight 2: They fall sequentially at speeds proportional to their weight 3: They fall at speeds inversely proportional to their volume
Let Sodd=A1+A3+A5+A7+A9+A11+A13+A15 be the sum of the answers to the odd-numbered subproblems. Let Seven=A2+A4+A6+A8+A10+A12+A14 be the sum of the answers to the even-numbered subproblems. Find the value of the product Sodd×Seven and enter that natural number.