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The number of days would the stack be long enough to reach a star that is about 3 × 10¹³ km away is 64 days
Since from the question, we see that the number of pennies double with each day. It forms a geoemetric progression with
Since the number of pennies after n days equals N = 2ⁿ
Let
So, after n days, the length of the stack of pennies is the geoemetric progression D = 2ⁿ × L
Making n subject of the formula, we have
n = ㏒(D/L)/㏒2
Substituting the values of the variables into the equation, we have
n = ㏒(D/L)/㏒2
n = ㏒(3 × 10¹⁶ m/1.5 × 10⁻³ m)/㏒2
n = ㏒(3/1.5 × 10¹⁹)/㏒2
n = ㏒(2 × 10¹⁹)/㏒2
n = ㏒2 + ㏒10¹⁹/㏒2
n = (19㏒10 + ㏒2)/㏒2
n = (19 + 0.3010)/0.3010
n = 19.3010/0.3010
n = 64.1
n ≅ 64 days
So, the number of days would the stack be long enough to reach a star that is about 3 × 10¹³ km away is 64 days
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