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kuartus4
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Let's say that we have a guy who is 6 feet tall and weighs 190 lb. If we were to make him 60 feet tall with the same proportions as before, how much would the man weigh? How much would he weigh if we make him 50 feet tall?
kuartus4 said:Let's say that we have a guy who is 6 feet tall and weighs 190 lb. If we were to make him 60 feet tall with the same proportions as before, how much would the man weigh? How much would he weigh if we make him 50 feet tall?
economicsnerd said:"Same proportions"...
- So he scales the same amount in all 3 dimensions?
- So he weighs the same per cubic centimeter as he did before?
That might be a good start.
kuartus4 said:Let's say that we have a guy who is 6 feet tall and weighs 190 lb. If we were to make him 60 feet tall with the same proportions as before, how much would the man weigh? How much would he weigh if we make him 50 feet tall?
economicsnerd said:"Same proportions"...
- So he scales the same amount in all 3 dimensions?
- So he weighs the same per cubic centimeter as he did before?
That might be a good start.
kuartus4 said:Both.
berkeman said:Please show some effort on your part in answering this question. You have been given good hints -- you should be able to solve the question fairly easily now. Please show some work.
And is this question for your schoolwork?
kuartus4 said:The guys initial volume is 6 cubic feet?
His mass is 86 kg.
So his density is mass/volume.
8600g/169,901cm cubed.
So .5g/1 cm cubed.
.5=x/6000
So the sixty foot giant weighs 6,613.8 lbs.
The scaling problem is related to weight because it involves determining how much an object or person would weigh if they were a different size or scale. This can also refer to the difficulty of accurately measuring or predicting the weight of an object or person that is significantly different in size.
It is important to consider the scaling problem when weighing objects or people because weight is not solely determined by size or mass. Other factors such as density and composition can also affect weight, making it difficult to accurately estimate or calculate without taking scaling into account.
No, the scaling problem cannot be solved using a simple mathematical equation because it involves multiple variables and factors that cannot be accurately represented by a single equation. It requires careful analysis and consideration of various factors to arrive at a reasonable estimate of weight.
Scientists approach the scaling problem by conducting experiments and collecting data to understand how weight is affected by size and other variables. They also use mathematical models and simulations to help predict and estimate weight in different scenarios. Additionally, they may also compare their findings to existing theories and principles in physics to gain a better understanding of the scaling problem.
The scaling problem has a significant impact on real-life situations, especially in fields like engineering, medicine, and sports. In engineering, accurate weight measurements are crucial for designing and building structures that can withstand different loads. In medicine, understanding the scaling problem is essential for determining proper dosages of medication and designing medical devices. In sports, the scaling problem affects athletes' performance and training, as their weight can impact their speed, agility, and strength.