To solve the equation log4(y) = 9 log4(3) log4(81), we will follow these steps:
- First, simplify log4(81). Since 81 = 34, we can rewrite it as:
- Now, substituting this back into our equation gives:
- This simplifies to:
- Next, to isolate y, we convert from logarithmic form to exponential form. Using the definition of logarithms:
- We can further simplify this since we know that a = log4(3) means 4a = 3. Thus:
- Substituting back a = log4(3), we focus on the calculations involving the exponent:
- Now, we remember that we can express this as a power of 4 to simplify:
- Finally, this provides a complete representation of y.
log4(81) = log4(34) = 4 * log4(3)
log4(y) = 9 * log4(3) * (4 * log4(3))
log4(y) = 36 * (log4(3))2
y = 4{36 * (log4(3))2}
y = 336 * a
y = 336 * log4(3)
y = 436} where we substitute back for 3 if required in terms of 4.
The solution is thus expressed as a relationship of powers, focusing on expressions in terms of 4 and 3. Note that depending on specific values or further simplification aspects, we may adjust final expressions accordingly.