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ARIHANT SSC-LOGARITHM -INTRODUCTORY EXERCISE- 16.1
- The value of ""(25)^(-1//4 log(5)(25)) is:
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- (log(10) 500000- log(10)5) is equal to:
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- If log(5)[log(3)(log(2)x)]=1, then x is:
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- If log(2) log(10)4x=1, then the value of x is:
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- If log(7)x = 4/3, then the value of x is:
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- if log(x)(4/9)=-1/2, then the value of x is:
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- If log(100) x=-4, then the value of x is:
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- If log(100)x =-1/2, then the value of x is:
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- If log(x)(0.2) =-1/4, then the value of x is:
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- The value of x satisfying log(243) x=0.8 is:
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- if log(e)(x-1) + log(e)(x) + log(e)(x+1)=0, then
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- The value of log(3) 5 xx log(25)9 is
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- The value of log (14/3) + log (11/5) - log (22/15) is:
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- The value of [3 log (81/80) + 5 log (25/24) + 7 log (16/15)] is:
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- (log (a^(3)/(bc)) + log (b^(3)/(ac)) + log (c^(3)/(ab))) is equal to :
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- (1/(log(a)bc+1) + 1/(log(b) ac +1) + 1/(log(c)ab+1)+1) is equal to:
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- 1/(log(ab)abc) + 1/(log(bc) abc) + 1/(log(ca)abc) is equal to:
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- The value of (1/(log(5)210) + 1/(log(6) 210) + 1/(log(7)210)) is:
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- The value of [1/(log(a//b)x) + 1/(log(b//c)x) + 1/(log(c//a) x)] is:
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- If log(10)2 = 0.3010, then log(2) 10 is:
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