Answer:
[tex]\displaystyle E=26log2-24log3+8log 5[/tex]
Step-by-step explanation:
Logarithms
There are certain properties of the logarithms we'll need to recall in order to simplify the expression given in the question. We'll list them below
[tex]log(x.y)=logx+logy\\log(x/y)=logx-logy\\logx^y=y.logx[/tex]
We'll also need to factor the following numbers into their prime factors:
[tex]20=2^2\cdot 5[/tex]
[tex]16=2^4[/tex]
[tex]15=3\cdot 5[/tex]
[tex]25=5^2[/tex]
[tex]24=2^3\cdot 3[/tex]
[tex]81=3^4[/tex]
[tex]80=2^4\cdot 5[/tex]
The original expression is
[tex]\displaystyle E=log20+16log\frac{16}{15}+12log\frac{25}{24}+log\frac{81}{80}[/tex]
Plugging in the factored values
[tex]\displaystyle E=log(2^2\cdot 5)+16log\frac{2^4}{3\cdot 5}+12log\frac{5^2}{2^3\cdot 3}+log\frac{3^4}{2^4\cdot 5}[/tex]
Applying the properties we have
[tex]\displaystyle E=log2^2+log 5+16(log2^4-log3-log 5)+12(log5^2-log2^3-log 3)+log3^4-log2^4-log 5[/tex]
[tex]\displaystyle E=2log2+log 5+16log2^4-16log3-16log 5+12log5^2-12log2^3-12log 3+log3^4-log2^4-log 5[/tex]
[tex]\displaystyle E=2log2+log 5+64log2-16log3-16log 5+24log5-36log2-12log 3+4log3-4log2-log 5[/tex]
Simplifying
[tex]\boxed{\displaystyle E=26log2-24log3+8log 5}[/tex]
