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प्रश्न
If log102 = a and log103 = b; express each of the following in terms of 'a' and 'b' : log `3 1/8`
उत्तर
log `3 1/8`
= `log_10( 25/8 xx 4/4 )`
= `log_10( 100/32 )`
= `log_10 100 - log_10 32 ...[ log_a(m/n) = log_a m - log_a n ]`
= `log_10 100 - log_10 2^5 `
= 2 - log1025 ...[ ∵ log10100 = 2 ]
= 2 - 5log102 ...[ logamn = nlogam ]
= 2 - 5a ...[ ∵ log102 = a ]
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संबंधित प्रश्न
Express in terms of log 2 and log 3 : log 36
Express in terms of log 2 and log 3 :
`"log"75/16 - 2"log"5/9 + "log"32/243`
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2 log x - log y = 1
Express the following in a form free from logarithm:
2 log x + 3 log y = log a
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log108 + log1025 + 2 log103 - log1018
Express log102 + 1 in the form of log10x .
Solve for x : log10 (x - 10) = 1
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Solve for x : log (x + 5) + log (x - 5) = 4 log 2 + 2 log 3
If log102 = a and log103 = b ; express each of the following in terms of 'a' and 'b' : log 5.4
