Final answer:
Using the direct variation relationship and setting up a ratio, it was determined that a weight of 12 ounces will stretch the spring to 15 centimeters, which is option A.
Step-by-step explanation:
The phenomenon being described is an example of direct variation, where one quantity depends directly on another. In this case, the amount a spring stretches is directly proportional to the weight attached to it.
Given that 8 ounces stretches the spring 10 centimeters, we can set up a ratio to find out how much weight will stretch it to 15 centimeters. If 8 ounces corresponds to 10 cm, then 'x' ounces (the weight we are trying to find) will correspond to 15 cm. The ratio is therefore:
8 ounces / 10 cm = x ounces / 15 cm
By cross-multiplying, we get:
8 ounces × 15 cm = 10 cm × x ounces
120 = 10x
Now, we solve for 'x' by dividing both sides by 10:
x = 120 / 10
x = 12 ounces
Therefore, it will take 12 ounces to stretch the spring to 15 centimeters, which corresponds to option A.