Question

To solve the logarithmic equation, we can combine the logarithms using the properties of logarithms.

2 log 4 – log 3 + 2 log x – 4 = 0

Using the quotient rule of logarithms (log a - log b = log(a/b)), we can combine the first two terms:
log(4^2/3) + 2 log x – 4 = 0

Simplifying the exponent of 4^2/3:
log(16/3) + 2 log x – 4 = 0

Using the product rule of logarithms (log a + log b = log(ab)), we can combine the second and third terms:
log(16/3) + log(x^2) – 4 = 0

Applying the power rule of logarithms:
log(16/3) + log(x^2) – log(10^4) = 0

Using the product rule again:
log[(16/3) * x^2 / 10^4] = 0

Setting the inside of the logarithm equal to 1:
(16/3) * x^2 / 10^4 = 1

Multiplying both sides by 10^4 to eliminate the fraction:
(16/3) * x^2 = 10^4

Dividing both sides by (16/3):
x^2 = (10^4)(3/16)

Taking the square root of both sides:
x = sqrt((10^4)(3/16))

Calculating the value of x using a calculator:
x ≈ 43.3013

Rounding to the nearest ten-thousandth:
x ≈ 43.3013

Therefore, the correct answer is B) 43.3013.