Solve for x : log(10)x = -2....

Solve for `x : log_(10)x = -2`.

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The correct Answer is:

0.01

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ICSE-LOGARITHMS -EXERCISE 8(A)

Express each of the following in logarithmic form : (i) 5^(3) = 125 ...
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Express each of the following in exponential form : (i) log(8) 0.125...
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Solve for x : log(10)x = -2.
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Find the logarithm of : (i) 100 to the base 10 (ii) 0.1 to the bas...
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State, true or false : (i) If log(10)x = a, then 10^(x) = a (ii) I...
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Find x, if : (i) log(3) x = 0 (ii) log(x) 2 = -1 (iii) log(9) 24...
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Evaluate : (i) log(10) 0.01 (ii) log(2) (1 div 8) (iii) log(5)1 ...
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If log(a)m = n, express a^(n-1) in terms of a and m.
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Given log(2)x = m and log(5) y = n (i) Express 2^(m-3) in terms of x...
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If log(2) x = a and log(3) y = a, write 72^(@) in terms of x and y.
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Solve for x : log(x - 1) + log(x + 1) = log(2)1.
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If log(x^(2) - 21) = 2, show that x = + 11.
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