Evaluate log3 108 + log3 100 - 2log3 20

Using the properties of logarithms, we can simplify the expression as follows:

log3 108 + log3 100 - 2log3 20
= log3 (108 * 100 / 20^2) (using the product and quotient rules of logarithms)
= log3 (108 * 100 / 400)
= log3 (27)
= 3 (since 3^3 = 27)

Therefore, log3 108 + log3 100 - 2log3 20 = 3.

Evaluate log4 (4 7/17) - log4 (3 21/68) + log4 48

We can begin by rewriting the mixed numbers as improper fractions:

log4 (4 7/17) = log4 ((4*17+7)/17) = log4 (71/17)
log4 (3 21/68) = log4 ((3*68+21)/68) = log4 (237/68)

Substituting these values into the original expression, we get:

log4 (71/17) - log4 (237/68) + log4 48

Next, we can simplify the first two logarithms using the quotient rule of logarithms:

log4 (71/17 ÷ 237/68) + log4 48

Simplifying the fraction inside the first logarithm by multiplying by the reciprocal, we get:

log4 [(71/17) * (68/237)] + log4 48

Simplifying the expression inside the first logarithm using arithmetic, we get:

log4 (12) + log4 48

Using the product rule of logarithms, we can combine these two logarithms:

log4 (12 * 48)

Simplifying the product, we get:

log4 576

Finally, using the definition of logarithms, we see that:

log4 576 = x if and only if 4^x = 576

Multiplying 4 by itself repeatedly, we find that 4^3 = 64 and 4^4 = 256, so 4^3 * 4^3 = 4^6 = 4096. This means that:

4^4 < 576 < 4^5

Taking the logarithm base 4 of both sides of this inequality, we get:

4 < log4 576 < 5

Therefore, log4 576 is between 4 and 5, so it must be approximately 4.292. Therefore:

log4 (4 7/17) - log4 (3 21/68) + log4 48 ≈ 4.292.

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