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Let 3 to the power of a = 4 to the power of B = 36, can we get the result of 2 / A + 1 / b? If so, what is it?
3^a=36
lg3^a=lg6^2
alg3=2lg6=2lg2+2lg3
a=2lg2/lg3+2
4^b=36
lg4^b=lg6^2
lg2^2b=2lg6
2blg2=2lg2+2lg3
b=1+lg3/lg2
2/a+1/b
=(2b+a)/ab
=[2*(1+lg3/lg2)+lg2/lg3+2]/[(1+lg3/lg2)(lg2/lg3+2)]
=(2+2lg3/lg2+lg2/lg3+2)/(lg2/lg3+2+1+2lg3/lg2)
=(4+2lg3/lg2+lg2/lg3)/(3+2lg3/lg2+lg2/lg3)
=(4lg2lg3+3(lg3)^2+(lg2)^2)/(3lg2lg3+2(lg3)^2+(lg2)^2)
=(3lg3+lg2)(lg3+lg2)/(2lg3+lg2)(lg3+lg2)
=(3lg3+lg2)/(2lg3+lg2)
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