Evaluate log5(\( y^2x^5 ÷ 125b½) \)
a
2 log5y + 5log5 y2 − 3
b
log5 y2 + 5log5 x + 3
c
25logy 5 + 3
d
2log5y + 5log5x − ½ log5b −3
Explanation
Correct Option
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Mrnoah
1 year ago
To evaluate this expression, we'll use logarithmic properties:
log₅(y²x⁵ ÷ 125b½)
First, rewrite 125 as 5³:
log₅(y²x⁵ ÷ 5³b½)
Now, apply logarithmic properties:
log₅(y²) + log₅(x⁵) - log₅(5³) - log₅(b½)
Using the power rule:
2log₅(y) + 5log₅(x) - 3 - (1/2)log₅(b)
This is the simplified expression. Without specific values for x, y, and b, we can't further simplify.
