By using the formula log(a)x^(n)=nlog(a)...

By using the formula `log_(a)x^(n)=nlog_(a)x,` convert the following. (iv) `log 1024`

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By using the formula log_(a)x^(n)=nlog_(a)x, convert the following. (iii) log5^(23)

By using the formula log_(a)x^(n)=nlog_(a)x, convert the following. (i) log_(2)7^(25)

By using the formula log_(a)x^(n)=nlog_(a)x, convert the following. (ii) log_(5)8^(50)

Using log_ax^n = n log_a x , expand the following : log_2^7^25 .

Prove that log_(a)xy=log_(a)x+log_(a)y.

Determine the values of the following. (iv) log_(7)1

log ( x )^(n) = n .log x is true for n .

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Find the derivative of y = log_()(log x)

Note : log x = log_10 x : log 1024

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