What is the number whose logarithm to base 10 is \(\bar{3}.4771\)?
a
3.0
b
0.3
c
0.03
d
0.003
e
0.0003
Explanation
Correct Option
dNo explanation available
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Ann_e
1 year ago
We are given:
log_{10}(x) =bar{3}.4771
The bar over the 3 means the characteristic is negative and the mantissa is positive, so:
log{10}(x) = -3 + 0.4771 = -2.5229
Now, to find the number:
x = 10^{-2.5229}
Break it up:
x = 10^{-3 + 0.4771} = 10^{-3}* 10^{0.4771}
But we know:
10^{0.4771} \approx= 3
=> xapprox= 10^{-3}* 3 = 0.001* 3 = 0.003
Final Answer:
D.{0.003}
