A generation is about one-third of a lifetime.

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Bijackar
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Homework Statement



A generation is about one-third of a lifetime. Approximately how
many generations have passed since the year 0 AD?

Let me first say that this is my first time taking physics and this is all new to me so I appreciate all the help.

Homework Equations



here is the answer I found by googleing but I don't quite understand it. I was wondering if someone could explain it to me.

history x (10^11s / history) × (1 generation / 1/3 lifetime) × (0.5 lifetime / 10^9s) = 150

The Attempt at a Solution



How I approached this problem was that I chose 70 to be an average person's lifetime then I divided that by 3 to find what a generation is and then divide 2015 by that number which is not what the answer says. I think I just don't get the question.
 
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Bijackar said:

Homework Statement



A generation is about one-third of a lifetime. Approximately how
many generations have passed since the year 0 AD?

Let me first say that this is my first time taking physics and this is all new to me so I appreciate all the help.


Homework Equations



here is the answer I found by googleing but I don't quite understand it. I was wondering if someone could explain it to me.

history x (10^11s / history) × (1 generation / 1/3 lifetime) × (0.5 lifetime / 10^9s) = 150


The Attempt at a Solution



How I approached this problem was that I chose 70 to be an average person's lifetime then I divided that by 3 to find what a generation is and then divide 2015 by that number which is not what the answer says. I think I just don't get the question.
Looking at that "Googled" solution:

What time interval are they assuming for the "history" of whatever?

What time interval are they assuming for a "lifetime" ?
 
Look at their expression.

(1011s / history) is a conversion factor for units of "history" to seconds.

How many years are there in 1011 seconds?


Similarly, (0.5 lifetime / 109s) is a conversion from seconds to a "half a life(time)".

How many years are in 109 seconds?
 
A "Generation" is commonly 25 years. The Question is asking how much (unknown variable) multiplied by 25 gives 2015?
 
Bijackar said:
...

How I approached this problem was that I chose 70 to be an average person's lifetime then I divided that by 3 to find what a generation is and then divide 2015 by that number which is not what the answer says. I think I just don't get the question.
By the way, I should have said:

Welcome to PF!


AND --

Your method is perfectly reasonable.

I was merely trying to get you to understand some of the quantities in that expression you found elsewhere.