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The age of the universe is around 100,000,000,000,000,000s. A top quark has a lifetime of roughly 0.000000000000000000000001s. Writing numbers out with all these zeros is not very convenient. Such quantities are usually written as powers of 10. The age of the universe can be written as 1017s and the lifetime of a top quark as 10−24s.Note that1017 means the number you would get by multiplying 10 times 10 times 10... a total of 17 times. This number, as you can see above, would be a one followed by seventeen zeros. Similarly, 10−24 is the result of multiplying 0.1 (or 1/10) times itself 24 times. As seen above, this is written as 23 zeros after the decimal point followed by a one.***How many top quark lifetimes have there been in the history of the universe (i.e., what is the age of the universe divided by the lifetime of a top quark)? Note that these powers of 10 follow the same rules that any exponents would follow.

User Resonance
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1 Answer

5 votes

Answer:


10^(41)

Step-by-step explanation:

Age of the universe =
100,000,000,000,000,000=10^(17)\ s

Lifetime of a top quark =
0.000000000000000000000001=10^(-24)

Top quark life would be given by


t=\frac{\text{Age of the universe}}{\text{Lifetime of a top quark}}\\\Rightarrow t=(10^(17))/(10^(-24))\\\Rightarrow t=10^(17+24)\\\Rightarrow t=10^(41)\ s

Hence, the answer is
10^(41)\ s

User Manigandan
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