Question

How do you solve `\log _{4}x^{3}+\log _{2}\sqrt{x}=8`?

Answer 1

`x = 16`.

Explanation:

The first step is always to rewrite in a common base, using the rules `log_a n = logn/loga` and `logn^a = alogn`.

`logx^3/log4 + logsqrt(x)/log2 = 8`

`logx^3/(log2^2) + logsqrt(x)/(log2^1) = 8`

`(3logx)/(2log2) + (logx^(1/2))/(1log2) = 8`

`(3logx)/(2log2) + (1/2logx)/(log2) = 8`

Put on a common denominator.

`(3logx)/(2log2) + (2(1/2logx))/(2log2) = 8`

`(3logx)/(2log2) + (logx)/(2log2) = 8`

`(3logx)/(log4) + logx/(log4) = 8`

`3log_4x + log_4x = 8`

`log_4 x^3 + log_4 x = 8`

Now use `log_a n + log_a m = log_a(n xx m)`.

`log_4 (x^3x) = 8`

`log_4 x^4 = 8`

Convert to exponential form. If `log_a b = n`, then `a^n = b`.

`x^4 = 4^8`

`x^4 = (4^2)^4`

`x^4 = 16^4`

It is now clear that `x = 16`. The last step is to check whether the answer we just found is actually valid.

`log_4 (16)^3 + log_2 sqrt(16) =^? 8`

`3log_4(16) + log_2 4 =^? 8`

`3(2) + 2 = 8 color(green)(√)`

Hopefully this helps!